TSTP Solution File: ALG194+1 by ePrincess---1.0
View Problem
- Process Solution
%------------------------------------------------------------------------------
% File : ePrincess---1.0
% Problem : ALG194+1 : TPTP v8.1.0. Released v2.7.0.
% Transfm : none
% Format : tptp:raw
% Command : ePrincess-casc -timeout=%d %s
% Computer : n024.cluster.edu
% Model : x86_64 x86_64
% CPU : Intel(R) Xeon(R) CPU E5-2620 v4 2.10GHz
% Memory : 8042.1875MB
% OS : Linux 3.10.0-693.el7.x86_64
% CPULimit : 300s
% WCLimit : 600s
% DateTime : Thu Jul 14 15:37:28 EDT 2022
% Result : Theorem 6.19s 1.96s
% Output : Proof 9.77s
% Verified :
% SZS Type : -
% Comments :
%------------------------------------------------------------------------------
%----WARNING: Could not form TPTP format derivation
%------------------------------------------------------------------------------
%----ORIGINAL SYSTEM OUTPUT
% 0.03/0.12 % Problem : ALG194+1 : TPTP v8.1.0. Released v2.7.0.
% 0.03/0.12 % Command : ePrincess-casc -timeout=%d %s
% 0.12/0.33 % Computer : n024.cluster.edu
% 0.12/0.33 % Model : x86_64 x86_64
% 0.12/0.33 % CPU : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz
% 0.12/0.33 % Memory : 8042.1875MB
% 0.12/0.33 % OS : Linux 3.10.0-693.el7.x86_64
% 0.12/0.33 % CPULimit : 300
% 0.12/0.33 % WCLimit : 600
% 0.12/0.33 % DateTime : Wed Jun 8 03:35:19 EDT 2022
% 0.12/0.33 % CPUTime :
% 0.53/0.57 ____ _
% 0.53/0.57 ___ / __ \_____(_)___ ________ __________
% 0.53/0.57 / _ \/ /_/ / ___/ / __ \/ ___/ _ \/ ___/ ___/
% 0.53/0.57 / __/ ____/ / / / / / / /__/ __(__ |__ )
% 0.53/0.57 \___/_/ /_/ /_/_/ /_/\___/\___/____/____/
% 0.53/0.57
% 0.53/0.57 A Theorem Prover for First-Order Logic
% 0.53/0.57 (ePrincess v.1.0)
% 0.53/0.57
% 0.53/0.57 (c) Philipp Rümmer, 2009-2015
% 0.53/0.57 (c) Peter Backeman, 2014-2015
% 0.53/0.57 (contributions by Angelo Brillout, Peter Baumgartner)
% 0.53/0.57 Free software under GNU Lesser General Public License (LGPL).
% 0.53/0.57 Bug reports to peter@backeman.se
% 0.53/0.57
% 0.53/0.57 For more information, visit http://user.uu.se/~petba168/breu/
% 0.53/0.57
% 0.53/0.57 Loading /export/starexec/sandbox2/benchmark/theBenchmark.p ...
% 0.53/0.62 Prover 0: Options: -triggersInConjecture -genTotalityAxioms -tightFunctionScopes -clausifier=simple -reverseFunctionalityPropagation +boolFunsAsPreds -triggerStrategy=allMaximal -resolutionMethod=nonUnifying +ignoreQuantifiers -generateTriggers=all
% 2.82/1.23 Prover 0: Preprocessing ...
% 5.10/1.73 Prover 0: Constructing countermodel ...
% 6.19/1.96 Prover 0: proved (1339ms)
% 6.19/1.96
% 6.19/1.96 No countermodel exists, formula is valid
% 6.19/1.96 % SZS status Theorem for theBenchmark
% 6.19/1.96
% 6.19/1.96 Generating proof ... found it (size 45)
% 9.11/2.62
% 9.11/2.62 % SZS output start Proof for theBenchmark
% 9.11/2.62 Assumed formulas after preprocessing and simplification:
% 9.11/2.62 | (0) ? [v0] : ? [v1] : ? [v2] : ? [v3] : ? [v4] : ? [v5] : ? [v6] : ? [v7] : ? [v8] : ? [v9] : ? [v10] : ? [v11] : ? [v12] : ? [v13] : ? [v14] : ? [v15] : ? [v16] : ? [v17] : ? [v18] : ? [v19] : ? [v20] : ? [v21] : ? [v22] : ? [v23] : ? [v24] : ? [v25] : ? [v26] : ? [v27] : ? [v28] : ? [v29] : ? [v30] : ? [v31] : ? [v32] : ? [v33] : ? [v34] : ? [v35] : ? [v36] : ? [v37] : ? [v38] : ? [v39] : ? [v40] : ? [v41] : ? [v42] : ? [v43] : ? [v44] : ? [v45] : ? [v46] : ? [v47] : ? [v48] : ? [v49] : ? [v50] : ? [v51] : ? [v52] : ? [v53] : ? [v54] : ? [v55] : ? [v56] : ? [v57] : ? [v58] : ? [v59] : ? [v60] : ? [v61] : ? [v62] : ? [v63] : ? [v64] : ? [v65] : ? [v66] : ? [v67] : ? [v68] : ? [v69] : ? [v70] : ? [v71] : ? [v72] : ? [v73] : ? [v74] : ? [v75] : ? [v76] : ? [v77] : ? [v78] : ? [v79] : ? [v80] : ? [v81] : ? [v82] : ? [v83] : ? [v84] : ? [v85] : ? [v86] : ? [v87] : ? [v88] : ? [v89] : ? [v90] : ? [v91] : ? [v92] : ? [v93] : ? [v94] : ? [v95] : ? [v96] : ? [v97] : ( ~ (v48 = v47) & ~ (v48 = v46) & ~ (v48 = v45) & ~ (v48 = v44) & ~ (v48 = v43) & ~ (v48 = v42) & ~ (v48 = v41) & ~ (v48 = v34) & ~ (v48 = v27) & ~ (v48 = v20) & ~ (v48 = v13) & ~ (v48 = v6) & ~ (v47 = v46) & ~ (v47 = v45) & ~ (v47 = v44) & ~ (v47 = v43) & ~ (v47 = v42) & ~ (v47 = v40) & ~ (v47 = v33) & ~ (v47 = v26) & ~ (v47 = v19) & ~ (v47 = v12) & ~ (v47 = v5) & ~ (v46 = v45) & ~ (v46 = v44) & ~ (v46 = v43) & ~ (v46 = v42) & ~ (v46 = v39) & ~ (v46 = v32) & ~ (v46 = v25) & ~ (v46 = v18) & ~ (v46 = v11) & ~ (v46 = v4) & ~ (v45 = v44) & ~ (v45 = v43) & ~ (v45 = v42) & ~ (v45 = v38) & ~ (v45 = v31) & ~ (v45 = v24) & ~ (v45 = v17) & ~ (v45 = v10) & ~ (v45 = v3) & ~ (v44 = v43) & ~ (v44 = v42) & ~ (v44 = v37) & ~ (v44 = v30) & ~ (v44 = v23) & ~ (v44 = v16) & ~ (v44 = v9) & ~ (v44 = v2) & ~ (v43 = v42) & ~ (v43 = v36) & ~ (v43 = v29) & ~ (v43 = v22) & ~ (v43 = v15) & ~ (v43 = v8) & ~ (v43 = v1) & ~ (v42 = v35) & ~ (v42 = v28) & ~ (v42 = v21) & ~ (v42 = v14) & ~ (v42 = v7) & ~ (v42 = v0) & ~ (v41 = v40) & ~ (v41 = v39) & ~ (v41 = v38) & ~ (v41 = v37) & ~ (v41 = v36) & ~ (v41 = v35) & ~ (v41 = v34) & ~ (v41 = v27) & ~ (v41 = v20) & ~ (v41 = v13) & ~ (v41 = v6) & ~ (v40 = v39) & ~ (v40 = v38) & ~ (v40 = v37) & ~ (v40 = v36) & ~ (v40 = v35) & ~ (v40 = v33) & ~ (v40 = v26) & ~ (v40 = v19) & ~ (v40 = v12) & ~ (v40 = v5) & ~ (v39 = v38) & ~ (v39 = v37) & ~ (v39 = v36) & ~ (v39 = v35) & ~ (v39 = v32) & ~ (v39 = v25) & ~ (v39 = v18) & ~ (v39 = v11) & ~ (v39 = v4) & ~ (v38 = v37) & ~ (v38 = v36) & ~ (v38 = v35) & ~ (v38 = v31) & ~ (v38 = v24) & ~ (v38 = v17) & ~ (v38 = v10) & ~ (v38 = v3) & ~ (v37 = v36) & ~ (v37 = v35) & ~ (v37 = v30) & ~ (v37 = v23) & ~ (v37 = v16) & ~ (v37 = v9) & ~ (v37 = v2) & ~ (v36 = v35) & ~ (v36 = v29) & ~ (v36 = v22) & ~ (v36 = v15) & ~ (v36 = v8) & ~ (v36 = v1) & ~ (v35 = v28) & ~ (v35 = v21) & ~ (v35 = v14) & ~ (v35 = v7) & ~ (v35 = v0) & ~ (v34 = v33) & ~ (v34 = v32) & ~ (v34 = v31) & ~ (v34 = v30) & ~ (v34 = v29) & ~ (v34 = v28) & ~ (v34 = v27) & ~ (v34 = v20) & ~ (v34 = v13) & ~ (v34 = v6) & ~ (v33 = v32) & ~ (v33 = v31) & ~ (v33 = v30) & ~ (v33 = v29) & ~ (v33 = v28) & ~ (v33 = v26) & ~ (v33 = v19) & ~ (v33 = v12) & ~ (v33 = v5) & ~ (v32 = v31) & ~ (v32 = v30) & ~ (v32 = v29) & ~ (v32 = v28) & ~ (v32 = v25) & ~ (v32 = v18) & ~ (v32 = v11) & ~ (v32 = v4) & ~ (v31 = v30) & ~ (v31 = v29) & ~ (v31 = v28) & ~ (v31 = v24) & ~ (v31 = v17) & ~ (v31 = v10) & ~ (v31 = v3) & ~ (v30 = v29) & ~ (v30 = v28) & ~ (v30 = v23) & ~ (v30 = v16) & ~ (v30 = v9) & ~ (v30 = v2) & ~ (v29 = v28) & ~ (v29 = v22) & ~ (v29 = v15) & ~ (v29 = v8) & ~ (v29 = v1) & ~ (v28 = v21) & ~ (v28 = v14) & ~ (v28 = v7) & ~ (v28 = v0) & ~ (v27 = v26) & ~ (v27 = v25) & ~ (v27 = v24) & ~ (v27 = v23) & ~ (v27 = v22) & ~ (v27 = v21) & ~ (v27 = v20) & ~ (v27 = v13) & ~ (v27 = v6) & ~ (v26 = v25) & ~ (v26 = v24) & ~ (v26 = v23) & ~ (v26 = v22) & ~ (v26 = v21) & ~ (v26 = v19) & ~ (v26 = v12) & ~ (v26 = v5) & ~ (v25 = v24) & ~ (v25 = v23) & ~ (v25 = v22) & ~ (v25 = v21) & ~ (v25 = v18) & ~ (v25 = v11) & ~ (v25 = v4) & ~ (v24 = v23) & ~ (v24 = v22) & ~ (v24 = v21) & ~ (v24 = v17) & ~ (v24 = v10) & ~ (v24 = v3) & ~ (v23 = v22) & ~ (v23 = v21) & ~ (v23 = v16) & ~ (v23 = v9) & ~ (v23 = v2) & ~ (v22 = v21) & ~ (v22 = v15) & ~ (v22 = v8) & ~ (v22 = v1) & ~ (v21 = v14) & ~ (v21 = v7) & ~ (v21 = v0) & ~ (v20 = v19) & ~ (v20 = v18) & ~ (v20 = v17) & ~ (v20 = v16) & ~ (v20 = v15) & ~ (v20 = v14) & ~ (v20 = v13) & ~ (v20 = v6) & ~ (v19 = v18) & ~ (v19 = v17) & ~ (v19 = v16) & ~ (v19 = v15) & ~ (v19 = v14) & ~ (v19 = v12) & ~ (v19 = v5) & ~ (v18 = v17) & ~ (v18 = v16) & ~ (v18 = v15) & ~ (v18 = v14) & ~ (v18 = v11) & ~ (v18 = v4) & ~ (v17 = v16) & ~ (v17 = v15) & ~ (v17 = v14) & ~ (v17 = v10) & ~ (v17 = v3) & ~ (v16 = v15) & ~ (v16 = v14) & ~ (v16 = v9) & ~ (v16 = v2) & ~ (v15 = v14) & ~ (v15 = v8) & ~ (v15 = v1) & ~ (v14 = v7) & ~ (v14 = v0) & ~ (v13 = v12) & ~ (v13 = v11) & ~ (v13 = v10) & ~ (v13 = v9) & ~ (v13 = v8) & ~ (v13 = v7) & ~ (v13 = v6) & ~ (v12 = v11) & ~ (v12 = v10) & ~ (v12 = v9) & ~ (v12 = v8) & ~ (v12 = v7) & ~ (v12 = v5) & ~ (v11 = v10) & ~ (v11 = v9) & ~ (v11 = v8) & ~ (v11 = v7) & ~ (v11 = v4) & ~ (v10 = v9) & ~ (v10 = v8) & ~ (v10 = v7) & ~ (v10 = v3) & ~ (v9 = v8) & ~ (v9 = v7) & ~ (v9 = v2) & ~ (v8 = v7) & ~ (v8 = v1) & ~ (v7 = v0) & ~ (v6 = v5) & ~ (v6 = v4) & ~ (v6 = v3) & ~ (v6 = v2) & ~ (v6 = v1) & ~ (v6 = v0) & ~ (v5 = v4) & ~ (v5 = v3) & ~ (v5 = v2) & ~ (v5 = v1) & ~ (v5 = v0) & ~ (v4 = v3) & ~ (v4 = v2) & ~ (v4 = v1) & ~ (v4 = v0) & ~ (v3 = v2) & ~ (v3 = v1) & ~ (v3 = v0) & ~ (v2 = v1) & ~ (v2 = v0) & ~ (v1 = v0) & ~ (e6 = e5) & ~ (e6 = e4) & ~ (e6 = e3) & ~ (e6 = e2) & ~ (e6 = e1) & ~ (e6 = e0) & ~ (e5 = e4) & ~ (e5 = e3) & ~ (e5 = e2) & ~ (e5 = e1) & ~ (e5 = e0) & ~ (e4 = e3) & ~ (e4 = e2) & ~ (e4 = e1) & ~ (e4 = e0) & ~ (e3 = e2) & ~ (e3 = e1) & ~ (e3 = e0) & ~ (e2 = e1) & ~ (e2 = e0) & ~ (e1 = e0) & op(v97, e6) = e6 & op(v96, e5) = e6 & op(v95, e4) = e6 & op(v94, e3) = e6 & op(v93, e2) = e6 & op(v92, e1) = e6 & op(v91, e0) = e6 & op(v90, e6) = e5 & op(v89, e5) = e5 & op(v88, e4) = e5 & op(v87, e3) = e5 & op(v86, e2) = e5 & op(v85, e1) = e5 & op(v84, e0) = e5 & op(v83, e6) = e4 & op(v82, e5) = e4 & op(v81, e4) = e4 & op(v80, e3) = e4 & op(v79, e2) = e4 & op(v78, e1) = e4 & op(v77, e0) = e4 & op(v76, e6) = e3 & op(v75, e5) = e3 & op(v74, e4) = e3 & op(v73, e3) = e3 & op(v72, e2) = e3 & op(v71, e1) = e3 & op(v70, e0) = e3 & op(v69, e6) = e2 & op(v68, e5) = e2 & op(v67, e4) = e2 & op(v66, e3) = e2 & op(v65, e2) = e2 & op(v64, e1) = e2 & op(v63, e0) = e2 & op(v62, e6) = e1 & op(v61, e5) = e1 & op(v60, e4) = e1 & op(v59, e3) = e1 & op(v58, e2) = e1 & op(v57, e1) = e1 & op(v56, e0) = e1 & op(v55, e6) = e0 & op(v54, e5) = e0 & op(v53, e4) = e0 & op(v52, e3) = e0 & op(v51, e2) = e0 & op(v50, e1) = e0 & op(v49, e0) = e0 & op(v48, e6) = v97 & op(v47, e6) = v90 & op(v46, e6) = v83 & op(v45, e6) = v76 & op(v44, e6) = v69 & op(v43, e6) = v62 & op(v42, e6) = v55 & op(v41, e5) = v96 & op(v40, e5) = v89 & op(v39, e5) = v82 & op(v38, e5) = v75 & op(v37, e5) = v68 & op(v36, e5) = v61 & op(v35, e5) = v54 & op(v34, e4) = v95 & op(v33, e4) = v88 & op(v32, e4) = v81 & op(v31, e4) = v74 & op(v30, e4) = v67 & op(v29, e4) = v60 & op(v28, e4) = v53 & op(v27, e3) = v94 & op(v26, e3) = v87 & op(v25, e3) = v80 & op(v24, e3) = v73 & op(v23, e3) = v66 & op(v22, e3) = v59 & op(v21, e3) = v52 & op(v20, e2) = v93 & op(v19, e2) = v86 & op(v18, e2) = v79 & op(v17, e2) = v72 & op(v16, e2) = v65 & op(v15, e2) = v58 & op(v14, e2) = v51 & op(v13, e1) = v92 & op(v12, e1) = v85 & op(v11, e1) = v78 & op(v10, e1) = v71 & op(v9, e1) = v64 & op(v8, e1) = v57 & op(v7, e1) = v50 & op(v6, e0) = v91 & op(v5, e0) = v84 & op(v4, e0) = v77 & op(v3, e0) = v70 & op(v2, e0) = v63 & op(v1, e0) = v56 & op(v0, e0) = v49 & op(e6, e6) = v48 & op(e6, e5) = v47 & op(e6, e4) = v46 & op(e6, e3) = v45 & op(e6, e2) = v44 & op(e6, e1) = v43 & op(e6, e0) = v42 & op(e5, e6) = v41 & op(e5, e5) = v40 & op(e5, e4) = v39 & op(e5, e3) = v38 & op(e5, e2) = v37 & op(e5, e1) = v36 & op(e5, e0) = v35 & op(e4, e6) = v34 & op(e4, e5) = v33 & op(e4, e4) = v32 & op(e4, e3) = v31 & op(e4, e2) = v30 & op(e4, e1) = v29 & op(e4, e0) = v28 & op(e3, e6) = v27 & op(e3, e5) = v26 & op(e3, e4) = v25 & op(e3, e3) = v24 & op(e3, e2) = v23 & op(e3, e1) = v22 & op(e3, e0) = v21 & op(e2, e6) = v20 & op(e2, e5) = v19 & op(e2, e4) = v18 & op(e2, e3) = v17 & op(e2, e2) = v16 & op(e2, e1) = v15 & op(e2, e0) = v14 & op(e1, e6) = v13 & op(e1, e5) = v12 & op(e1, e4) = v11 & op(e1, e3) = v10 & op(e1, e2) = v9 & op(e1, e1) = v8 & op(e1, e0) = v7 & op(e0, e6) = v6 & op(e0, e5) = v5 & op(e0, e4) = v4 & op(e0, e3) = v3 & op(e0, e2) = v2 & op(e0, e1) = v1 & op(e0, e0) = v0 & ! [v98] : ! [v99] : ! [v100] : ! [v101] : (v99 = v98 | ~ (op(v101, v100) = v99) | ~ (op(v101, v100) = v98)) & ( ~ (v48 = e6) | ~ (v40 = e5) | ~ (v32 = e4) | ~ (v24 = e3) | ~ (v16 = e2) | ~ (v8 = e1) | ~ (v0 = e0)) & (v48 = e6 | v48 = e5 | v48 = e4 | v48 = e3 | v48 = e2 | v48 = e1 | v48 = e0) & (v48 = e6 | v47 = e6 | v46 = e6 | v45 = e6 | v44 = e6 | v43 = e6 | v42 = e6) & (v48 = e6 | v41 = e6 | v34 = e6 | v27 = e6 | v20 = e6 | v13 = e6 | v6 = e6) & (v48 = e6 | v40 = e5 | v32 = e4 | v24 = e3 | v16 = e2 | v8 = e1 | v0 = e0) & (v48 = e5 | v47 = e5 | v46 = e5 | v45 = e5 | v44 = e5 | v43 = e5 | v42 = e5) & (v48 = e5 | v41 = e5 | v34 = e5 | v27 = e5 | v20 = e5 | v13 = e5 | v6 = e5) & (v48 = e4 | v47 = e4 | v46 = e4 | v45 = e4 | v44 = e4 | v43 = e4 | v42 = e4) & (v48 = e4 | v41 = e4 | v34 = e4 | v27 = e4 | v20 = e4 | v13 = e4 | v6 = e4) & (v48 = e3 | v47 = e3 | v46 = e3 | v45 = e3 | v44 = e3 | v43 = e3 | v42 = e3) & (v48 = e3 | v41 = e3 | v34 = e3 | v27 = e3 | v20 = e3 | v13 = e3 | v6 = e3) & (v48 = e2 | v47 = e2 | v46 = e2 | v45 = e2 | v44 = e2 | v43 = e2 | v42 = e2) & (v48 = e2 | v41 = e2 | v34 = e2 | v27 = e2 | v20 = e2 | v13 = e2 | v6 = e2) & (v48 = e1 | v47 = e1 | v46 = e1 | v45 = e1 | v44 = e1 | v43 = e1 | v42 = e1) & (v48 = e1 | v41 = e1 | v34 = e1 | v27 = e1 | v20 = e1 | v13 = e1 | v6 = e1) & (v48 = e0 | v47 = e0 | v46 = e0 | v45 = e0 | v44 = e0 | v43 = e0 | v42 = e0) & (v48 = e0 | v41 = e0 | v34 = e0 | v27 = e0 | v20 = e0 | v13 = e0 | v6 = e0) & (v47 = e6 | v47 = e5 | v47 = e4 | v47 = e3 | v47 = e2 | v47 = e1 | v47 = e0) & (v47 = e6 | v40 = e6 | v33 = e6 | v26 = e6 | v19 = e6 | v12 = e6 | v5 = e6) & (v47 = e5 | v40 = e5 | v33 = e5 | v26 = e5 | v19 = e5 | v12 = e5 | v5 = e5) & (v47 = e4 | v40 = e4 | v33 = e4 | v26 = e4 | v19 = e4 | v12 = e4 | v5 = e4) & (v47 = e3 | v40 = e3 | v33 = e3 | v26 = e3 | v19 = e3 | v12 = e3 | v5 = e3) & (v47 = e2 | v40 = e2 | v33 = e2 | v26 = e2 | v19 = e2 | v12 = e2 | v5 = e2) & (v47 = e1 | v40 = e1 | v33 = e1 | v26 = e1 | v19 = e1 | v12 = e1 | v5 = e1) & (v47 = e0 | v40 = e0 | v33 = e0 | v26 = e0 | v19 = e0 | v12 = e0 | v5 = e0) & (v46 = e6 | v46 = e5 | v46 = e4 | v46 = e3 | v46 = e2 | v46 = e1 | v46 = e0) & (v46 = e6 | v39 = e6 | v32 = e6 | v25 = e6 | v18 = e6 | v11 = e6 | v4 = e6) & (v46 = e5 | v39 = e5 | v32 = e5 | v25 = e5 | v18 = e5 | v11 = e5 | v4 = e5) & (v46 = e4 | v39 = e4 | v32 = e4 | v25 = e4 | v18 = e4 | v11 = e4 | v4 = e4) & (v46 = e3 | v39 = e3 | v32 = e3 | v25 = e3 | v18 = e3 | v11 = e3 | v4 = e3) & (v46 = e2 | v39 = e2 | v32 = e2 | v25 = e2 | v18 = e2 | v11 = e2 | v4 = e2) & (v46 = e1 | v39 = e1 | v32 = e1 | v25 = e1 | v18 = e1 | v11 = e1 | v4 = e1) & (v46 = e0 | v39 = e0 | v32 = e0 | v25 = e0 | v18 = e0 | v11 = e0 | v4 = e0) & (v45 = e6 | v45 = e5 | v45 = e4 | v45 = e3 | v45 = e2 | v45 = e1 | v45 = e0) & (v45 = e6 | v38 = e6 | v31 = e6 | v24 = e6 | v17 = e6 | v10 = e6 | v3 = e6) & (v45 = e5 | v38 = e5 | v31 = e5 | v24 = e5 | v17 = e5 | v10 = e5 | v3 = e5) & (v45 = e4 | v38 = e4 | v31 = e4 | v24 = e4 | v17 = e4 | v10 = e4 | v3 = e4) & (v45 = e3 | v38 = e3 | v31 = e3 | v24 = e3 | v17 = e3 | v10 = e3 | v3 = e3) & (v45 = e2 | v38 = e2 | v31 = e2 | v24 = e2 | v17 = e2 | v10 = e2 | v3 = e2) & (v45 = e1 | v38 = e1 | v31 = e1 | v24 = e1 | v17 = e1 | v10 = e1 | v3 = e1) & (v45 = e0 | v38 = e0 | v31 = e0 | v24 = e0 | v17 = e0 | v10 = e0 | v3 = e0) & (v44 = e6 | v44 = e5 | v44 = e4 | v44 = e3 | v44 = e2 | v44 = e1 | v44 = e0) & (v44 = e6 | v37 = e6 | v30 = e6 | v23 = e6 | v16 = e6 | v9 = e6 | v2 = e6) & (v44 = e5 | v37 = e5 | v30 = e5 | v23 = e5 | v16 = e5 | v9 = e5 | v2 = e5) & (v44 = e4 | v37 = e4 | v30 = e4 | v23 = e4 | v16 = e4 | v9 = e4 | v2 = e4) & (v44 = e3 | v37 = e3 | v30 = e3 | v23 = e3 | v16 = e3 | v9 = e3 | v2 = e3) & (v44 = e2 | v37 = e2 | v30 = e2 | v23 = e2 | v16 = e2 | v9 = e2 | v2 = e2) & (v44 = e1 | v37 = e1 | v30 = e1 | v23 = e1 | v16 = e1 | v9 = e1 | v2 = e1) & (v44 = e0 | v37 = e0 | v30 = e0 | v23 = e0 | v16 = e0 | v9 = e0 | v2 = e0) & (v43 = e6 | v43 = e5 | v43 = e4 | v43 = e3 | v43 = e2 | v43 = e1 | v43 = e0) & (v43 = e6 | v36 = e6 | v29 = e6 | v22 = e6 | v15 = e6 | v8 = e6 | v1 = e6) & (v43 = e5 | v36 = e5 | v29 = e5 | v22 = e5 | v15 = e5 | v8 = e5 | v1 = e5) & (v43 = e4 | v36 = e4 | v29 = e4 | v22 = e4 | v15 = e4 | v8 = e4 | v1 = e4) & (v43 = e3 | v36 = e3 | v29 = e3 | v22 = e3 | v15 = e3 | v8 = e3 | v1 = e3) & (v43 = e2 | v36 = e2 | v29 = e2 | v22 = e2 | v15 = e2 | v8 = e2 | v1 = e2) & (v43 = e1 | v36 = e1 | v29 = e1 | v22 = e1 | v15 = e1 | v8 = e1 | v1 = e1) & (v43 = e0 | v36 = e0 | v29 = e0 | v22 = e0 | v15 = e0 | v8 = e0 | v1 = e0) & (v42 = e6 | v42 = e5 | v42 = e4 | v42 = e3 | v42 = e2 | v42 = e1 | v42 = e0) & (v42 = e6 | v35 = e6 | v28 = e6 | v21 = e6 | v14 = e6 | v7 = e6 | v0 = e6) & (v42 = e5 | v35 = e5 | v28 = e5 | v21 = e5 | v14 = e5 | v7 = e5 | v0 = e5) & (v42 = e4 | v35 = e4 | v28 = e4 | v21 = e4 | v14 = e4 | v7 = e4 | v0 = e4) & (v42 = e3 | v35 = e3 | v28 = e3 | v21 = e3 | v14 = e3 | v7 = e3 | v0 = e3) & (v42 = e2 | v35 = e2 | v28 = e2 | v21 = e2 | v14 = e2 | v7 = e2 | v0 = e2) & (v42 = e1 | v35 = e1 | v28 = e1 | v21 = e1 | v14 = e1 | v7 = e1 | v0 = e1) & (v42 = e0 | v35 = e0 | v28 = e0 | v21 = e0 | v14 = e0 | v7 = e0 | v0 = e0) & (v41 = e6 | v41 = e5 | v41 = e4 | v41 = e3 | v41 = e2 | v41 = e1 | v41 = e0) & (v41 = e6 | v40 = e6 | v39 = e6 | v38 = e6 | v37 = e6 | v36 = e6 | v35 = e6) & (v41 = e5 | v40 = e5 | v39 = e5 | v38 = e5 | v37 = e5 | v36 = e5 | v35 = e5) & (v41 = e4 | v40 = e4 | v39 = e4 | v38 = e4 | v37 = e4 | v36 = e4 | v35 = e4) & (v41 = e3 | v40 = e3 | v39 = e3 | v38 = e3 | v37 = e3 | v36 = e3 | v35 = e3) & (v41 = e2 | v40 = e2 | v39 = e2 | v38 = e2 | v37 = e2 | v36 = e2 | v35 = e2) & (v41 = e1 | v40 = e1 | v39 = e1 | v38 = e1 | v37 = e1 | v36 = e1 | v35 = e1) & (v41 = e0 | v40 = e0 | v39 = e0 | v38 = e0 | v37 = e0 | v36 = e0 | v35 = e0) & (v40 = e6 | v40 = e5 | v40 = e4 | v40 = e3 | v40 = e2 | v40 = e1 | v40 = e0) & (v39 = e6 | v39 = e5 | v39 = e4 | v39 = e3 | v39 = e2 | v39 = e1 | v39 = e0) & (v38 = e6 | v38 = e5 | v38 = e4 | v38 = e3 | v38 = e2 | v38 = e1 | v38 = e0) & (v37 = e6 | v37 = e5 | v37 = e4 | v37 = e3 | v37 = e2 | v37 = e1 | v37 = e0) & (v36 = e6 | v36 = e5 | v36 = e4 | v36 = e3 | v36 = e2 | v36 = e1 | v36 = e0) & (v35 = e6 | v35 = e5 | v35 = e4 | v35 = e3 | v35 = e2 | v35 = e1 | v35 = e0) & (v34 = e6 | v34 = e5 | v34 = e4 | v34 = e3 | v34 = e2 | v34 = e1 | v34 = e0) & (v34 = e6 | v33 = e6 | v32 = e6 | v31 = e6 | v30 = e6 | v29 = e6 | v28 = e6) & (v34 = e5 | v33 = e5 | v32 = e5 | v31 = e5 | v30 = e5 | v29 = e5 | v28 = e5) & (v34 = e4 | v33 = e4 | v32 = e4 | v31 = e4 | v30 = e4 | v29 = e4 | v28 = e4) & (v34 = e3 | v33 = e3 | v32 = e3 | v31 = e3 | v30 = e3 | v29 = e3 | v28 = e3) & (v34 = e2 | v33 = e2 | v32 = e2 | v31 = e2 | v30 = e2 | v29 = e2 | v28 = e2) & (v34 = e1 | v33 = e1 | v32 = e1 | v31 = e1 | v30 = e1 | v29 = e1 | v28 = e1) & (v34 = e0 | v33 = e0 | v32 = e0 | v31 = e0 | v30 = e0 | v29 = e0 | v28 = e0) & (v33 = e6 | v33 = e5 | v33 = e4 | v33 = e3 | v33 = e2 | v33 = e1 | v33 = e0) & (v32 = e6 | v32 = e5 | v32 = e4 | v32 = e3 | v32 = e2 | v32 = e1 | v32 = e0) & (v31 = e6 | v31 = e5 | v31 = e4 | v31 = e3 | v31 = e2 | v31 = e1 | v31 = e0) & (v30 = e6 | v30 = e5 | v30 = e4 | v30 = e3 | v30 = e2 | v30 = e1 | v30 = e0) & (v29 = e6 | v29 = e5 | v29 = e4 | v29 = e3 | v29 = e2 | v29 = e1 | v29 = e0) & (v28 = e6 | v28 = e5 | v28 = e4 | v28 = e3 | v28 = e2 | v28 = e1 | v28 = e0) & (v27 = e6 | v27 = e5 | v27 = e4 | v27 = e3 | v27 = e2 | v27 = e1 | v27 = e0) & (v27 = e6 | v26 = e6 | v25 = e6 | v24 = e6 | v23 = e6 | v22 = e6 | v21 = e6) & (v27 = e5 | v26 = e5 | v25 = e5 | v24 = e5 | v23 = e5 | v22 = e5 | v21 = e5) & (v27 = e4 | v26 = e4 | v25 = e4 | v24 = e4 | v23 = e4 | v22 = e4 | v21 = e4) & (v27 = e3 | v26 = e3 | v25 = e3 | v24 = e3 | v23 = e3 | v22 = e3 | v21 = e3) & (v27 = e2 | v26 = e2 | v25 = e2 | v24 = e2 | v23 = e2 | v22 = e2 | v21 = e2) & (v27 = e1 | v26 = e1 | v25 = e1 | v24 = e1 | v23 = e1 | v22 = e1 | v21 = e1) & (v27 = e0 | v26 = e0 | v25 = e0 | v24 = e0 | v23 = e0 | v22 = e0 | v21 = e0) & (v26 = e6 | v26 = e5 | v26 = e4 | v26 = e3 | v26 = e2 | v26 = e1 | v26 = e0) & (v25 = e6 | v25 = e5 | v25 = e4 | v25 = e3 | v25 = e2 | v25 = e1 | v25 = e0) & (v24 = e6 | v24 = e5 | v24 = e4 | v24 = e3 | v24 = e2 | v24 = e1 | v24 = e0) & (v23 = e6 | v23 = e5 | v23 = e4 | v23 = e3 | v23 = e2 | v23 = e1 | v23 = e0) & (v22 = e6 | v22 = e5 | v22 = e4 | v22 = e3 | v22 = e2 | v22 = e1 | v22 = e0) & (v21 = e6 | v21 = e5 | v21 = e4 | v21 = e3 | v21 = e2 | v21 = e1 | v21 = e0) & (v20 = e6 | v20 = e5 | v20 = e4 | v20 = e3 | v20 = e2 | v20 = e1 | v20 = e0) & (v20 = e6 | v19 = e6 | v18 = e6 | v17 = e6 | v16 = e6 | v15 = e6 | v14 = e6) & (v20 = e5 | v19 = e5 | v18 = e5 | v17 = e5 | v16 = e5 | v15 = e5 | v14 = e5) & (v20 = e4 | v19 = e4 | v18 = e4 | v17 = e4 | v16 = e4 | v15 = e4 | v14 = e4) & (v20 = e3 | v19 = e3 | v18 = e3 | v17 = e3 | v16 = e3 | v15 = e3 | v14 = e3) & (v20 = e2 | v19 = e2 | v18 = e2 | v17 = e2 | v16 = e2 | v15 = e2 | v14 = e2) & (v20 = e1 | v19 = e1 | v18 = e1 | v17 = e1 | v16 = e1 | v15 = e1 | v14 = e1) & (v20 = e0 | v19 = e0 | v18 = e0 | v17 = e0 | v16 = e0 | v15 = e0 | v14 = e0) & (v19 = e6 | v19 = e5 | v19 = e4 | v19 = e3 | v19 = e2 | v19 = e1 | v19 = e0) & (v18 = e6 | v18 = e5 | v18 = e4 | v18 = e3 | v18 = e2 | v18 = e1 | v18 = e0) & (v17 = e6 | v17 = e5 | v17 = e4 | v17 = e3 | v17 = e2 | v17 = e1 | v17 = e0) & (v16 = e6 | v16 = e5 | v16 = e4 | v16 = e3 | v16 = e2 | v16 = e1 | v16 = e0) & (v15 = e6 | v15 = e5 | v15 = e4 | v15 = e3 | v15 = e2 | v15 = e1 | v15 = e0) & (v14 = e6 | v14 = e5 | v14 = e4 | v14 = e3 | v14 = e2 | v14 = e1 | v14 = e0) & (v13 = e6 | v13 = e5 | v13 = e4 | v13 = e3 | v13 = e2 | v13 = e1 | v13 = e0) & (v13 = e6 | v12 = e6 | v11 = e6 | v10 = e6 | v9 = e6 | v8 = e6 | v7 = e6) & (v13 = e5 | v12 = e5 | v11 = e5 | v10 = e5 | v9 = e5 | v8 = e5 | v7 = e5) & (v13 = e4 | v12 = e4 | v11 = e4 | v10 = e4 | v9 = e4 | v8 = e4 | v7 = e4) & (v13 = e3 | v12 = e3 | v11 = e3 | v10 = e3 | v9 = e3 | v8 = e3 | v7 = e3) & (v13 = e2 | v12 = e2 | v11 = e2 | v10 = e2 | v9 = e2 | v8 = e2 | v7 = e2) & (v13 = e1 | v12 = e1 | v11 = e1 | v10 = e1 | v9 = e1 | v8 = e1 | v7 = e1) & (v13 = e0 | v12 = e0 | v11 = e0 | v10 = e0 | v9 = e0 | v8 = e0 | v7 = e0) & (v12 = e6 | v12 = e5 | v12 = e4 | v12 = e3 | v12 = e2 | v12 = e1 | v12 = e0) & (v11 = e6 | v11 = e5 | v11 = e4 | v11 = e3 | v11 = e2 | v11 = e1 | v11 = e0) & (v10 = e6 | v10 = e5 | v10 = e4 | v10 = e3 | v10 = e2 | v10 = e1 | v10 = e0) & (v9 = e6 | v9 = e5 | v9 = e4 | v9 = e3 | v9 = e2 | v9 = e1 | v9 = e0) & (v8 = e6 | v8 = e5 | v8 = e4 | v8 = e3 | v8 = e2 | v8 = e1 | v8 = e0) & (v7 = e6 | v7 = e5 | v7 = e4 | v7 = e3 | v7 = e2 | v7 = e1 | v7 = e0) & (v6 = e6 | v6 = e5 | v6 = e4 | v6 = e3 | v6 = e2 | v6 = e1 | v6 = e0) & (v6 = e6 | v5 = e6 | v4 = e6 | v3 = e6 | v2 = e6 | v1 = e6 | v0 = e6) & (v6 = e5 | v5 = e5 | v4 = e5 | v3 = e5 | v2 = e5 | v1 = e5 | v0 = e5) & (v6 = e4 | v5 = e4 | v4 = e4 | v3 = e4 | v2 = e4 | v1 = e4 | v0 = e4) & (v6 = e3 | v5 = e3 | v4 = e3 | v3 = e3 | v2 = e3 | v1 = e3 | v0 = e3) & (v6 = e2 | v5 = e2 | v4 = e2 | v3 = e2 | v2 = e2 | v1 = e2 | v0 = e2) & (v6 = e1 | v5 = e1 | v4 = e1 | v3 = e1 | v2 = e1 | v1 = e1 | v0 = e1) & (v6 = e0 | v5 = e0 | v4 = e0 | v3 = e0 | v2 = e0 | v1 = e0 | v0 = e0) & (v5 = e6 | v5 = e5 | v5 = e4 | v5 = e3 | v5 = e2 | v5 = e1 | v5 = e0) & (v4 = e6 | v4 = e5 | v4 = e4 | v4 = e3 | v4 = e2 | v4 = e1 | v4 = e0) & (v3 = e6 | v3 = e5 | v3 = e4 | v3 = e3 | v3 = e2 | v3 = e1 | v3 = e0) & (v2 = e6 | v2 = e5 | v2 = e4 | v2 = e3 | v2 = e2 | v2 = e1 | v2 = e0) & (v1 = e6 | v1 = e5 | v1 = e4 | v1 = e3 | v1 = e2 | v1 = e1 | v1 = e0) & (v0 = e6 | v0 = e5 | v0 = e4 | v0 = e3 | v0 = e2 | v0 = e1 | v0 = e0) & ((v48 = e6 & v40 = e5 & v32 = e4 & v24 = e3 & v16 = e2 & v8 = e1 & v0 = e0) | ( ~ (v48 = e6) & ~ (v40 = e5) & ~ (v32 = e4) & ~ (v24 = e3) & ~ (v16 = e2) & ~ (v8 = e1) & ~ (v0 = e0))))
% 9.35/2.69 | Instantiating (0) with all_0_0_0, all_0_1_1, all_0_2_2, all_0_3_3, all_0_4_4, all_0_5_5, all_0_6_6, all_0_7_7, all_0_8_8, all_0_9_9, all_0_10_10, all_0_11_11, all_0_12_12, all_0_13_13, all_0_14_14, all_0_15_15, all_0_16_16, all_0_17_17, all_0_18_18, all_0_19_19, all_0_20_20, all_0_21_21, all_0_22_22, all_0_23_23, all_0_24_24, all_0_25_25, all_0_26_26, all_0_27_27, all_0_28_28, all_0_29_29, all_0_30_30, all_0_31_31, all_0_32_32, all_0_33_33, all_0_34_34, all_0_35_35, all_0_36_36, all_0_37_37, all_0_38_38, all_0_39_39, all_0_40_40, all_0_41_41, all_0_42_42, all_0_43_43, all_0_44_44, all_0_45_45, all_0_46_46, all_0_47_47, all_0_48_48, all_0_49_49, all_0_50_50, all_0_51_51, all_0_52_52, all_0_53_53, all_0_54_54, all_0_55_55, all_0_56_56, all_0_57_57, all_0_58_58, all_0_59_59, all_0_60_60, all_0_61_61, all_0_62_62, all_0_63_63, all_0_64_64, all_0_65_65, all_0_66_66, all_0_67_67, all_0_68_68, all_0_69_69, all_0_70_70, all_0_71_71, all_0_72_72, all_0_73_73, all_0_74_74, all_0_75_75, all_0_76_76, all_0_77_77, all_0_78_78, all_0_79_79, all_0_80_80, all_0_81_81, all_0_82_82, all_0_83_83, all_0_84_84, all_0_85_85, all_0_86_86, all_0_87_87, all_0_88_88, all_0_89_89, all_0_90_90, all_0_91_91, all_0_92_92, all_0_93_93, all_0_94_94, all_0_95_95, all_0_96_96, all_0_97_97 yields:
% 9.35/2.69 | (1) ~ (all_0_49_49 = all_0_50_50) & ~ (all_0_49_49 = all_0_51_51) & ~ (all_0_49_49 = all_0_52_52) & ~ (all_0_49_49 = all_0_53_53) & ~ (all_0_49_49 = all_0_54_54) & ~ (all_0_49_49 = all_0_55_55) & ~ (all_0_49_49 = all_0_56_56) & ~ (all_0_49_49 = all_0_63_63) & ~ (all_0_49_49 = all_0_70_70) & ~ (all_0_49_49 = all_0_77_77) & ~ (all_0_49_49 = all_0_84_84) & ~ (all_0_49_49 = all_0_91_91) & ~ (all_0_50_50 = all_0_51_51) & ~ (all_0_50_50 = all_0_52_52) & ~ (all_0_50_50 = all_0_53_53) & ~ (all_0_50_50 = all_0_54_54) & ~ (all_0_50_50 = all_0_55_55) & ~ (all_0_50_50 = all_0_57_57) & ~ (all_0_50_50 = all_0_64_64) & ~ (all_0_50_50 = all_0_71_71) & ~ (all_0_50_50 = all_0_78_78) & ~ (all_0_50_50 = all_0_85_85) & ~ (all_0_50_50 = all_0_92_92) & ~ (all_0_51_51 = all_0_52_52) & ~ (all_0_51_51 = all_0_53_53) & ~ (all_0_51_51 = all_0_54_54) & ~ (all_0_51_51 = all_0_55_55) & ~ (all_0_51_51 = all_0_58_58) & ~ (all_0_51_51 = all_0_65_65) & ~ (all_0_51_51 = all_0_72_72) & ~ (all_0_51_51 = all_0_79_79) & ~ (all_0_51_51 = all_0_86_86) & ~ (all_0_51_51 = all_0_93_93) & ~ (all_0_52_52 = all_0_53_53) & ~ (all_0_52_52 = all_0_54_54) & ~ (all_0_52_52 = all_0_55_55) & ~ (all_0_52_52 = all_0_59_59) & ~ (all_0_52_52 = all_0_66_66) & ~ (all_0_52_52 = all_0_73_73) & ~ (all_0_52_52 = all_0_80_80) & ~ (all_0_52_52 = all_0_87_87) & ~ (all_0_52_52 = all_0_94_94) & ~ (all_0_53_53 = all_0_54_54) & ~ (all_0_53_53 = all_0_55_55) & ~ (all_0_53_53 = all_0_60_60) & ~ (all_0_53_53 = all_0_67_67) & ~ (all_0_53_53 = all_0_74_74) & ~ (all_0_53_53 = all_0_81_81) & ~ (all_0_53_53 = all_0_88_88) & ~ (all_0_53_53 = all_0_95_95) & ~ (all_0_54_54 = all_0_55_55) & ~ (all_0_54_54 = all_0_61_61) & ~ (all_0_54_54 = all_0_68_68) & ~ (all_0_54_54 = all_0_75_75) & ~ (all_0_54_54 = all_0_82_82) & ~ (all_0_54_54 = all_0_89_89) & ~ (all_0_54_54 = all_0_96_96) & ~ (all_0_55_55 = all_0_62_62) & ~ (all_0_55_55 = all_0_69_69) & ~ (all_0_55_55 = all_0_76_76) & ~ (all_0_55_55 = all_0_83_83) & ~ (all_0_55_55 = all_0_90_90) & ~ (all_0_55_55 = all_0_97_97) & ~ (all_0_56_56 = all_0_57_57) & ~ (all_0_56_56 = all_0_58_58) & ~ (all_0_56_56 = all_0_59_59) & ~ (all_0_56_56 = all_0_60_60) & ~ (all_0_56_56 = all_0_61_61) & ~ (all_0_56_56 = all_0_62_62) & ~ (all_0_56_56 = all_0_63_63) & ~ (all_0_56_56 = all_0_70_70) & ~ (all_0_56_56 = all_0_77_77) & ~ (all_0_56_56 = all_0_84_84) & ~ (all_0_56_56 = all_0_91_91) & ~ (all_0_57_57 = all_0_58_58) & ~ (all_0_57_57 = all_0_59_59) & ~ (all_0_57_57 = all_0_60_60) & ~ (all_0_57_57 = all_0_61_61) & ~ (all_0_57_57 = all_0_62_62) & ~ (all_0_57_57 = all_0_64_64) & ~ (all_0_57_57 = all_0_71_71) & ~ (all_0_57_57 = all_0_78_78) & ~ (all_0_57_57 = all_0_85_85) & ~ (all_0_57_57 = all_0_92_92) & ~ (all_0_58_58 = all_0_59_59) & ~ (all_0_58_58 = all_0_60_60) & ~ (all_0_58_58 = all_0_61_61) & ~ (all_0_58_58 = all_0_62_62) & ~ (all_0_58_58 = all_0_65_65) & ~ (all_0_58_58 = all_0_72_72) & ~ (all_0_58_58 = all_0_79_79) & ~ (all_0_58_58 = all_0_86_86) & ~ (all_0_58_58 = all_0_93_93) & ~ (all_0_59_59 = all_0_60_60) & ~ (all_0_59_59 = all_0_61_61) & ~ (all_0_59_59 = all_0_62_62) & ~ (all_0_59_59 = all_0_66_66) & ~ (all_0_59_59 = all_0_73_73) & ~ (all_0_59_59 = all_0_80_80) & ~ (all_0_59_59 = all_0_87_87) & ~ (all_0_59_59 = all_0_94_94) & ~ (all_0_60_60 = all_0_61_61) & ~ (all_0_60_60 = all_0_62_62) & ~ (all_0_60_60 = all_0_67_67) & ~ (all_0_60_60 = all_0_74_74) & ~ (all_0_60_60 = all_0_81_81) & ~ (all_0_60_60 = all_0_88_88) & ~ (all_0_60_60 = all_0_95_95) & ~ (all_0_61_61 = all_0_62_62) & ~ (all_0_61_61 = all_0_68_68) & ~ (all_0_61_61 = all_0_75_75) & ~ (all_0_61_61 = all_0_82_82) & ~ (all_0_61_61 = all_0_89_89) & ~ (all_0_61_61 = all_0_96_96) & ~ (all_0_62_62 = all_0_69_69) & ~ (all_0_62_62 = all_0_76_76) & ~ (all_0_62_62 = all_0_83_83) & ~ (all_0_62_62 = all_0_90_90) & ~ (all_0_62_62 = all_0_97_97) & ~ (all_0_63_63 = all_0_64_64) & ~ (all_0_63_63 = all_0_65_65) & ~ (all_0_63_63 = all_0_66_66) & ~ (all_0_63_63 = all_0_67_67) & ~ (all_0_63_63 = all_0_68_68) & ~ (all_0_63_63 = all_0_69_69) & ~ (all_0_63_63 = all_0_70_70) & ~ (all_0_63_63 = all_0_77_77) & ~ (all_0_63_63 = all_0_84_84) & ~ (all_0_63_63 = all_0_91_91) & ~ (all_0_64_64 = all_0_65_65) & ~ (all_0_64_64 = all_0_66_66) & ~ (all_0_64_64 = all_0_67_67) & ~ (all_0_64_64 = all_0_68_68) & ~ (all_0_64_64 = all_0_69_69) & ~ (all_0_64_64 = all_0_71_71) & ~ (all_0_64_64 = all_0_78_78) & ~ (all_0_64_64 = all_0_85_85) & ~ (all_0_64_64 = all_0_92_92) & ~ (all_0_65_65 = all_0_66_66) & ~ (all_0_65_65 = all_0_67_67) & ~ (all_0_65_65 = all_0_68_68) & ~ (all_0_65_65 = all_0_69_69) & ~ (all_0_65_65 = all_0_72_72) & ~ (all_0_65_65 = all_0_79_79) & ~ (all_0_65_65 = all_0_86_86) & ~ (all_0_65_65 = all_0_93_93) & ~ (all_0_66_66 = all_0_67_67) & ~ (all_0_66_66 = all_0_68_68) & ~ (all_0_66_66 = all_0_69_69) & ~ (all_0_66_66 = all_0_73_73) & ~ (all_0_66_66 = all_0_80_80) & ~ (all_0_66_66 = all_0_87_87) & ~ (all_0_66_66 = all_0_94_94) & ~ (all_0_67_67 = all_0_68_68) & ~ (all_0_67_67 = all_0_69_69) & ~ (all_0_67_67 = all_0_74_74) & ~ (all_0_67_67 = all_0_81_81) & ~ (all_0_67_67 = all_0_88_88) & ~ (all_0_67_67 = all_0_95_95) & ~ (all_0_68_68 = all_0_69_69) & ~ (all_0_68_68 = all_0_75_75) & ~ (all_0_68_68 = all_0_82_82) & ~ (all_0_68_68 = all_0_89_89) & ~ (all_0_68_68 = all_0_96_96) & ~ (all_0_69_69 = all_0_76_76) & ~ (all_0_69_69 = all_0_83_83) & ~ (all_0_69_69 = all_0_90_90) & ~ (all_0_69_69 = all_0_97_97) & ~ (all_0_70_70 = all_0_71_71) & ~ (all_0_70_70 = all_0_72_72) & ~ (all_0_70_70 = all_0_73_73) & ~ (all_0_70_70 = all_0_74_74) & ~ (all_0_70_70 = all_0_75_75) & ~ (all_0_70_70 = all_0_76_76) & ~ (all_0_70_70 = all_0_77_77) & ~ (all_0_70_70 = all_0_84_84) & ~ (all_0_70_70 = all_0_91_91) & ~ (all_0_71_71 = all_0_72_72) & ~ (all_0_71_71 = all_0_73_73) & ~ (all_0_71_71 = all_0_74_74) & ~ (all_0_71_71 = all_0_75_75) & ~ (all_0_71_71 = all_0_76_76) & ~ (all_0_71_71 = all_0_78_78) & ~ (all_0_71_71 = all_0_85_85) & ~ (all_0_71_71 = all_0_92_92) & ~ (all_0_72_72 = all_0_73_73) & ~ (all_0_72_72 = all_0_74_74) & ~ (all_0_72_72 = all_0_75_75) & ~ (all_0_72_72 = all_0_76_76) & ~ (all_0_72_72 = all_0_79_79) & ~ (all_0_72_72 = all_0_86_86) & ~ (all_0_72_72 = all_0_93_93) & ~ (all_0_73_73 = all_0_74_74) & ~ (all_0_73_73 = all_0_75_75) & ~ (all_0_73_73 = all_0_76_76) & ~ (all_0_73_73 = all_0_80_80) & ~ (all_0_73_73 = all_0_87_87) & ~ (all_0_73_73 = all_0_94_94) & ~ (all_0_74_74 = all_0_75_75) & ~ (all_0_74_74 = all_0_76_76) & ~ (all_0_74_74 = all_0_81_81) & ~ (all_0_74_74 = all_0_88_88) & ~ (all_0_74_74 = all_0_95_95) & ~ (all_0_75_75 = all_0_76_76) & ~ (all_0_75_75 = all_0_82_82) & ~ (all_0_75_75 = all_0_89_89) & ~ (all_0_75_75 = all_0_96_96) & ~ (all_0_76_76 = all_0_83_83) & ~ (all_0_76_76 = all_0_90_90) & ~ (all_0_76_76 = all_0_97_97) & ~ (all_0_77_77 = all_0_78_78) & ~ (all_0_77_77 = all_0_79_79) & ~ (all_0_77_77 = all_0_80_80) & ~ (all_0_77_77 = all_0_81_81) & ~ (all_0_77_77 = all_0_82_82) & ~ (all_0_77_77 = all_0_83_83) & ~ (all_0_77_77 = all_0_84_84) & ~ (all_0_77_77 = all_0_91_91) & ~ (all_0_78_78 = all_0_79_79) & ~ (all_0_78_78 = all_0_80_80) & ~ (all_0_78_78 = all_0_81_81) & ~ (all_0_78_78 = all_0_82_82) & ~ (all_0_78_78 = all_0_83_83) & ~ (all_0_78_78 = all_0_85_85) & ~ (all_0_78_78 = all_0_92_92) & ~ (all_0_79_79 = all_0_80_80) & ~ (all_0_79_79 = all_0_81_81) & ~ (all_0_79_79 = all_0_82_82) & ~ (all_0_79_79 = all_0_83_83) & ~ (all_0_79_79 = all_0_86_86) & ~ (all_0_79_79 = all_0_93_93) & ~ (all_0_80_80 = all_0_81_81) & ~ (all_0_80_80 = all_0_82_82) & ~ (all_0_80_80 = all_0_83_83) & ~ (all_0_80_80 = all_0_87_87) & ~ (all_0_80_80 = all_0_94_94) & ~ (all_0_81_81 = all_0_82_82) & ~ (all_0_81_81 = all_0_83_83) & ~ (all_0_81_81 = all_0_88_88) & ~ (all_0_81_81 = all_0_95_95) & ~ (all_0_82_82 = all_0_83_83) & ~ (all_0_82_82 = all_0_89_89) & ~ (all_0_82_82 = all_0_96_96) & ~ (all_0_83_83 = all_0_90_90) & ~ (all_0_83_83 = all_0_97_97) & ~ (all_0_84_84 = all_0_85_85) & ~ (all_0_84_84 = all_0_86_86) & ~ (all_0_84_84 = all_0_87_87) & ~ (all_0_84_84 = all_0_88_88) & ~ (all_0_84_84 = all_0_89_89) & ~ (all_0_84_84 = all_0_90_90) & ~ (all_0_84_84 = all_0_91_91) & ~ (all_0_85_85 = all_0_86_86) & ~ (all_0_85_85 = all_0_87_87) & ~ (all_0_85_85 = all_0_88_88) & ~ (all_0_85_85 = all_0_89_89) & ~ (all_0_85_85 = all_0_90_90) & ~ (all_0_85_85 = all_0_92_92) & ~ (all_0_86_86 = all_0_87_87) & ~ (all_0_86_86 = all_0_88_88) & ~ (all_0_86_86 = all_0_89_89) & ~ (all_0_86_86 = all_0_90_90) & ~ (all_0_86_86 = all_0_93_93) & ~ (all_0_87_87 = all_0_88_88) & ~ (all_0_87_87 = all_0_89_89) & ~ (all_0_87_87 = all_0_90_90) & ~ (all_0_87_87 = all_0_94_94) & ~ (all_0_88_88 = all_0_89_89) & ~ (all_0_88_88 = all_0_90_90) & ~ (all_0_88_88 = all_0_95_95) & ~ (all_0_89_89 = all_0_90_90) & ~ (all_0_89_89 = all_0_96_96) & ~ (all_0_90_90 = all_0_97_97) & ~ (all_0_91_91 = all_0_92_92) & ~ (all_0_91_91 = all_0_93_93) & ~ (all_0_91_91 = all_0_94_94) & ~ (all_0_91_91 = all_0_95_95) & ~ (all_0_91_91 = all_0_96_96) & ~ (all_0_91_91 = all_0_97_97) & ~ (all_0_92_92 = all_0_93_93) & ~ (all_0_92_92 = all_0_94_94) & ~ (all_0_92_92 = all_0_95_95) & ~ (all_0_92_92 = all_0_96_96) & ~ (all_0_92_92 = all_0_97_97) & ~ (all_0_93_93 = all_0_94_94) & ~ (all_0_93_93 = all_0_95_95) & ~ (all_0_93_93 = all_0_96_96) & ~ (all_0_93_93 = all_0_97_97) & ~ (all_0_94_94 = all_0_95_95) & ~ (all_0_94_94 = all_0_96_96) & ~ (all_0_94_94 = all_0_97_97) & ~ (all_0_95_95 = all_0_96_96) & ~ (all_0_95_95 = all_0_97_97) & ~ (all_0_96_96 = all_0_97_97) & ~ (e6 = e5) & ~ (e6 = e4) & ~ (e6 = e3) & ~ (e6 = e2) & ~ (e6 = e1) & ~ (e6 = e0) & ~ (e5 = e4) & ~ (e5 = e3) & ~ (e5 = e2) & ~ (e5 = e1) & ~ (e5 = e0) & ~ (e4 = e3) & ~ (e4 = e2) & ~ (e4 = e1) & ~ (e4 = e0) & ~ (e3 = e2) & ~ (e3 = e1) & ~ (e3 = e0) & ~ (e2 = e1) & ~ (e2 = e0) & ~ (e1 = e0) & op(all_0_0_0, e6) = e6 & op(all_0_1_1, e5) = e6 & op(all_0_2_2, e4) = e6 & op(all_0_3_3, e3) = e6 & op(all_0_4_4, e2) = e6 & op(all_0_5_5, e1) = e6 & op(all_0_6_6, e0) = e6 & op(all_0_7_7, e6) = e5 & op(all_0_8_8, e5) = e5 & op(all_0_9_9, e4) = e5 & op(all_0_10_10, e3) = e5 & op(all_0_11_11, e2) = e5 & op(all_0_12_12, e1) = e5 & op(all_0_13_13, e0) = e5 & op(all_0_14_14, e6) = e4 & op(all_0_15_15, e5) = e4 & op(all_0_16_16, e4) = e4 & op(all_0_17_17, e3) = e4 & op(all_0_18_18, e2) = e4 & op(all_0_19_19, e1) = e4 & op(all_0_20_20, e0) = e4 & op(all_0_21_21, e6) = e3 & op(all_0_22_22, e5) = e3 & op(all_0_23_23, e4) = e3 & op(all_0_24_24, e3) = e3 & op(all_0_25_25, e2) = e3 & op(all_0_26_26, e1) = e3 & op(all_0_27_27, e0) = e3 & op(all_0_28_28, e6) = e2 & op(all_0_29_29, e5) = e2 & op(all_0_30_30, e4) = e2 & op(all_0_31_31, e3) = e2 & op(all_0_32_32, e2) = e2 & op(all_0_33_33, e1) = e2 & op(all_0_34_34, e0) = e2 & op(all_0_35_35, e6) = e1 & op(all_0_36_36, e5) = e1 & op(all_0_37_37, e4) = e1 & op(all_0_38_38, e3) = e1 & op(all_0_39_39, e2) = e1 & op(all_0_40_40, e1) = e1 & op(all_0_41_41, e0) = e1 & op(all_0_42_42, e6) = e0 & op(all_0_43_43, e5) = e0 & op(all_0_44_44, e4) = e0 & op(all_0_45_45, e3) = e0 & op(all_0_46_46, e2) = e0 & op(all_0_47_47, e1) = e0 & op(all_0_48_48, e0) = e0 & op(all_0_49_49, e6) = all_0_0_0 & op(all_0_50_50, e6) = all_0_7_7 & op(all_0_51_51, e6) = all_0_14_14 & op(all_0_52_52, e6) = all_0_21_21 & op(all_0_53_53, e6) = all_0_28_28 & op(all_0_54_54, e6) = all_0_35_35 & op(all_0_55_55, e6) = all_0_42_42 & op(all_0_56_56, e5) = all_0_1_1 & op(all_0_57_57, e5) = all_0_8_8 & op(all_0_58_58, e5) = all_0_15_15 & op(all_0_59_59, e5) = all_0_22_22 & op(all_0_60_60, e5) = all_0_29_29 & op(all_0_61_61, e5) = all_0_36_36 & op(all_0_62_62, e5) = all_0_43_43 & op(all_0_63_63, e4) = all_0_2_2 & op(all_0_64_64, e4) = all_0_9_9 & op(all_0_65_65, e4) = all_0_16_16 & op(all_0_66_66, e4) = all_0_23_23 & op(all_0_67_67, e4) = all_0_30_30 & op(all_0_68_68, e4) = all_0_37_37 & op(all_0_69_69, e4) = all_0_44_44 & op(all_0_70_70, e3) = all_0_3_3 & op(all_0_71_71, e3) = all_0_10_10 & op(all_0_72_72, e3) = all_0_17_17 & op(all_0_73_73, e3) = all_0_24_24 & op(all_0_74_74, e3) = all_0_31_31 & op(all_0_75_75, e3) = all_0_38_38 & op(all_0_76_76, e3) = all_0_45_45 & op(all_0_77_77, e2) = all_0_4_4 & op(all_0_78_78, e2) = all_0_11_11 & op(all_0_79_79, e2) = all_0_18_18 & op(all_0_80_80, e2) = all_0_25_25 & op(all_0_81_81, e2) = all_0_32_32 & op(all_0_82_82, e2) = all_0_39_39 & op(all_0_83_83, e2) = all_0_46_46 & op(all_0_84_84, e1) = all_0_5_5 & op(all_0_85_85, e1) = all_0_12_12 & op(all_0_86_86, e1) = all_0_19_19 & op(all_0_87_87, e1) = all_0_26_26 & op(all_0_88_88, e1) = all_0_33_33 & op(all_0_89_89, e1) = all_0_40_40 & op(all_0_90_90, e1) = all_0_47_47 & op(all_0_91_91, e0) = all_0_6_6 & op(all_0_92_92, e0) = all_0_13_13 & op(all_0_93_93, e0) = all_0_20_20 & op(all_0_94_94, e0) = all_0_27_27 & op(all_0_95_95, e0) = all_0_34_34 & op(all_0_96_96, e0) = all_0_41_41 & op(all_0_97_97, e0) = all_0_48_48 & op(e6, e6) = all_0_49_49 & op(e6, e5) = all_0_50_50 & op(e6, e4) = all_0_51_51 & op(e6, e3) = all_0_52_52 & op(e6, e2) = all_0_53_53 & op(e6, e1) = all_0_54_54 & op(e6, e0) = all_0_55_55 & op(e5, e6) = all_0_56_56 & op(e5, e5) = all_0_57_57 & op(e5, e4) = all_0_58_58 & op(e5, e3) = all_0_59_59 & op(e5, e2) = all_0_60_60 & op(e5, e1) = all_0_61_61 & op(e5, e0) = all_0_62_62 & op(e4, e6) = all_0_63_63 & op(e4, e5) = all_0_64_64 & op(e4, e4) = all_0_65_65 & op(e4, e3) = all_0_66_66 & op(e4, e2) = all_0_67_67 & op(e4, e1) = all_0_68_68 & op(e4, e0) = all_0_69_69 & op(e3, e6) = all_0_70_70 & op(e3, e5) = all_0_71_71 & op(e3, e4) = all_0_72_72 & op(e3, e3) = all_0_73_73 & op(e3, e2) = all_0_74_74 & op(e3, e1) = all_0_75_75 & op(e3, e0) = all_0_76_76 & op(e2, e6) = all_0_77_77 & op(e2, e5) = all_0_78_78 & op(e2, e4) = all_0_79_79 & op(e2, e3) = all_0_80_80 & op(e2, e2) = all_0_81_81 & op(e2, e1) = all_0_82_82 & op(e2, e0) = all_0_83_83 & op(e1, e6) = all_0_84_84 & op(e1, e5) = all_0_85_85 & op(e1, e4) = all_0_86_86 & op(e1, e3) = all_0_87_87 & op(e1, e2) = all_0_88_88 & op(e1, e1) = all_0_89_89 & op(e1, e0) = all_0_90_90 & op(e0, e6) = all_0_91_91 & op(e0, e5) = all_0_92_92 & op(e0, e4) = all_0_93_93 & op(e0, e3) = all_0_94_94 & op(e0, e2) = all_0_95_95 & op(e0, e1) = all_0_96_96 & op(e0, e0) = all_0_97_97 & ! [v0] : ! [v1] : ! [v2] : ! [v3] : (v1 = v0 | ~ (op(v3, v2) = v1) | ~ (op(v3, v2) = v0)) & ( ~ (all_0_49_49 = e6) | ~ (all_0_57_57 = e5) | ~ (all_0_65_65 = e4) | ~ (all_0_73_73 = e3) | ~ (all_0_81_81 = e2) | ~ (all_0_89_89 = e1) | ~ (all_0_97_97 = e0)) & (all_0_49_49 = e6 | all_0_49_49 = e5 | all_0_49_49 = e4 | all_0_49_49 = e3 | all_0_49_49 = e2 | all_0_49_49 = e1 | all_0_49_49 = e0) & (all_0_49_49 = e6 | all_0_50_50 = e6 | all_0_51_51 = e6 | all_0_52_52 = e6 | all_0_53_53 = e6 | all_0_54_54 = e6 | all_0_55_55 = e6) & (all_0_49_49 = e6 | all_0_56_56 = e6 | all_0_63_63 = e6 | all_0_70_70 = e6 | all_0_77_77 = e6 | all_0_84_84 = e6 | all_0_91_91 = e6) & (all_0_49_49 = e6 | all_0_57_57 = e5 | all_0_65_65 = e4 | all_0_73_73 = e3 | all_0_81_81 = e2 | all_0_89_89 = e1 | all_0_97_97 = e0) & (all_0_49_49 = e5 | all_0_50_50 = e5 | all_0_51_51 = e5 | all_0_52_52 = e5 | all_0_53_53 = e5 | all_0_54_54 = e5 | all_0_55_55 = e5) & (all_0_49_49 = e5 | all_0_56_56 = e5 | all_0_63_63 = e5 | all_0_70_70 = e5 | all_0_77_77 = e5 | all_0_84_84 = e5 | all_0_91_91 = e5) & (all_0_49_49 = e4 | all_0_50_50 = e4 | all_0_51_51 = e4 | all_0_52_52 = e4 | all_0_53_53 = e4 | all_0_54_54 = e4 | all_0_55_55 = e4) & (all_0_49_49 = e4 | all_0_56_56 = e4 | all_0_63_63 = e4 | all_0_70_70 = e4 | all_0_77_77 = e4 | all_0_84_84 = e4 | all_0_91_91 = e4) & (all_0_49_49 = e3 | all_0_50_50 = e3 | all_0_51_51 = e3 | all_0_52_52 = e3 | all_0_53_53 = e3 | all_0_54_54 = e3 | all_0_55_55 = e3) & (all_0_49_49 = e3 | all_0_56_56 = e3 | all_0_63_63 = e3 | all_0_70_70 = e3 | all_0_77_77 = e3 | all_0_84_84 = e3 | all_0_91_91 = e3) & (all_0_49_49 = e2 | all_0_50_50 = e2 | all_0_51_51 = e2 | all_0_52_52 = e2 | all_0_53_53 = e2 | all_0_54_54 = e2 | all_0_55_55 = e2) & (all_0_49_49 = e2 | all_0_56_56 = e2 | all_0_63_63 = e2 | all_0_70_70 = e2 | all_0_77_77 = e2 | all_0_84_84 = e2 | all_0_91_91 = e2) & (all_0_49_49 = e1 | all_0_50_50 = e1 | all_0_51_51 = e1 | all_0_52_52 = e1 | all_0_53_53 = e1 | all_0_54_54 = e1 | all_0_55_55 = e1) & (all_0_49_49 = e1 | all_0_56_56 = e1 | all_0_63_63 = e1 | all_0_70_70 = e1 | all_0_77_77 = e1 | all_0_84_84 = e1 | all_0_91_91 = e1) & (all_0_49_49 = e0 | all_0_50_50 = e0 | all_0_51_51 = e0 | all_0_52_52 = e0 | all_0_53_53 = e0 | all_0_54_54 = e0 | all_0_55_55 = e0) & (all_0_49_49 = e0 | all_0_56_56 = e0 | all_0_63_63 = e0 | all_0_70_70 = e0 | all_0_77_77 = e0 | all_0_84_84 = e0 | all_0_91_91 = e0) & (all_0_50_50 = e6 | all_0_50_50 = e5 | all_0_50_50 = e4 | all_0_50_50 = e3 | all_0_50_50 = e2 | all_0_50_50 = e1 | all_0_50_50 = e0) & (all_0_50_50 = e6 | all_0_57_57 = e6 | all_0_64_64 = e6 | all_0_71_71 = e6 | all_0_78_78 = e6 | all_0_85_85 = e6 | all_0_92_92 = e6) & (all_0_50_50 = e5 | all_0_57_57 = e5 | all_0_64_64 = e5 | all_0_71_71 = e5 | all_0_78_78 = e5 | all_0_85_85 = e5 | all_0_92_92 = e5) & (all_0_50_50 = e4 | all_0_57_57 = e4 | all_0_64_64 = e4 | all_0_71_71 = e4 | all_0_78_78 = e4 | all_0_85_85 = e4 | all_0_92_92 = e4) & (all_0_50_50 = e3 | all_0_57_57 = e3 | all_0_64_64 = e3 | all_0_71_71 = e3 | all_0_78_78 = e3 | all_0_85_85 = e3 | all_0_92_92 = e3) & (all_0_50_50 = e2 | all_0_57_57 = e2 | all_0_64_64 = e2 | all_0_71_71 = e2 | all_0_78_78 = e2 | all_0_85_85 = e2 | all_0_92_92 = e2) & (all_0_50_50 = e1 | all_0_57_57 = e1 | all_0_64_64 = e1 | all_0_71_71 = e1 | all_0_78_78 = e1 | all_0_85_85 = e1 | all_0_92_92 = e1) & (all_0_50_50 = e0 | all_0_57_57 = e0 | all_0_64_64 = e0 | all_0_71_71 = e0 | all_0_78_78 = e0 | all_0_85_85 = e0 | all_0_92_92 = e0) & (all_0_51_51 = e6 | all_0_51_51 = e5 | all_0_51_51 = e4 | all_0_51_51 = e3 | all_0_51_51 = e2 | all_0_51_51 = e1 | all_0_51_51 = e0) & (all_0_51_51 = e6 | all_0_58_58 = e6 | all_0_65_65 = e6 | all_0_72_72 = e6 | all_0_79_79 = e6 | all_0_86_86 = e6 | all_0_93_93 = e6) & (all_0_51_51 = e5 | all_0_58_58 = e5 | all_0_65_65 = e5 | all_0_72_72 = e5 | all_0_79_79 = e5 | all_0_86_86 = e5 | all_0_93_93 = e5) & (all_0_51_51 = e4 | all_0_58_58 = e4 | all_0_65_65 = e4 | all_0_72_72 = e4 | all_0_79_79 = e4 | all_0_86_86 = e4 | all_0_93_93 = e4) & (all_0_51_51 = e3 | all_0_58_58 = e3 | all_0_65_65 = e3 | all_0_72_72 = e3 | all_0_79_79 = e3 | all_0_86_86 = e3 | all_0_93_93 = e3) & (all_0_51_51 = e2 | all_0_58_58 = e2 | all_0_65_65 = e2 | all_0_72_72 = e2 | all_0_79_79 = e2 | all_0_86_86 = e2 | all_0_93_93 = e2) & (all_0_51_51 = e1 | all_0_58_58 = e1 | all_0_65_65 = e1 | all_0_72_72 = e1 | all_0_79_79 = e1 | all_0_86_86 = e1 | all_0_93_93 = e1) & (all_0_51_51 = e0 | all_0_58_58 = e0 | all_0_65_65 = e0 | all_0_72_72 = e0 | all_0_79_79 = e0 | all_0_86_86 = e0 | all_0_93_93 = e0) & (all_0_52_52 = e6 | all_0_52_52 = e5 | all_0_52_52 = e4 | all_0_52_52 = e3 | all_0_52_52 = e2 | all_0_52_52 = e1 | all_0_52_52 = e0) & (all_0_52_52 = e6 | all_0_59_59 = e6 | all_0_66_66 = e6 | all_0_73_73 = e6 | all_0_80_80 = e6 | all_0_87_87 = e6 | all_0_94_94 = e6) & (all_0_52_52 = e5 | all_0_59_59 = e5 | all_0_66_66 = e5 | all_0_73_73 = e5 | all_0_80_80 = e5 | all_0_87_87 = e5 | all_0_94_94 = e5) & (all_0_52_52 = e4 | all_0_59_59 = e4 | all_0_66_66 = e4 | all_0_73_73 = e4 | all_0_80_80 = e4 | all_0_87_87 = e4 | all_0_94_94 = e4) & (all_0_52_52 = e3 | all_0_59_59 = e3 | all_0_66_66 = e3 | all_0_73_73 = e3 | all_0_80_80 = e3 | all_0_87_87 = e3 | all_0_94_94 = e3) & (all_0_52_52 = e2 | all_0_59_59 = e2 | all_0_66_66 = e2 | all_0_73_73 = e2 | all_0_80_80 = e2 | all_0_87_87 = e2 | all_0_94_94 = e2) & (all_0_52_52 = e1 | all_0_59_59 = e1 | all_0_66_66 = e1 | all_0_73_73 = e1 | all_0_80_80 = e1 | all_0_87_87 = e1 | all_0_94_94 = e1) & (all_0_52_52 = e0 | all_0_59_59 = e0 | all_0_66_66 = e0 | all_0_73_73 = e0 | all_0_80_80 = e0 | all_0_87_87 = e0 | all_0_94_94 = e0) & (all_0_53_53 = e6 | all_0_53_53 = e5 | all_0_53_53 = e4 | all_0_53_53 = e3 | all_0_53_53 = e2 | all_0_53_53 = e1 | all_0_53_53 = e0) & (all_0_53_53 = e6 | all_0_60_60 = e6 | all_0_67_67 = e6 | all_0_74_74 = e6 | all_0_81_81 = e6 | all_0_88_88 = e6 | all_0_95_95 = e6) & (all_0_53_53 = e5 | all_0_60_60 = e5 | all_0_67_67 = e5 | all_0_74_74 = e5 | all_0_81_81 = e5 | all_0_88_88 = e5 | all_0_95_95 = e5) & (all_0_53_53 = e4 | all_0_60_60 = e4 | all_0_67_67 = e4 | all_0_74_74 = e4 | all_0_81_81 = e4 | all_0_88_88 = e4 | all_0_95_95 = e4) & (all_0_53_53 = e3 | all_0_60_60 = e3 | all_0_67_67 = e3 | all_0_74_74 = e3 | all_0_81_81 = e3 | all_0_88_88 = e3 | all_0_95_95 = e3) & (all_0_53_53 = e2 | all_0_60_60 = e2 | all_0_67_67 = e2 | all_0_74_74 = e2 | all_0_81_81 = e2 | all_0_88_88 = e2 | all_0_95_95 = e2) & (all_0_53_53 = e1 | all_0_60_60 = e1 | all_0_67_67 = e1 | all_0_74_74 = e1 | all_0_81_81 = e1 | all_0_88_88 = e1 | all_0_95_95 = e1) & (all_0_53_53 = e0 | all_0_60_60 = e0 | all_0_67_67 = e0 | all_0_74_74 = e0 | all_0_81_81 = e0 | all_0_88_88 = e0 | all_0_95_95 = e0) & (all_0_54_54 = e6 | all_0_54_54 = e5 | all_0_54_54 = e4 | all_0_54_54 = e3 | all_0_54_54 = e2 | all_0_54_54 = e1 | all_0_54_54 = e0) & (all_0_54_54 = e6 | all_0_61_61 = e6 | all_0_68_68 = e6 | all_0_75_75 = e6 | all_0_82_82 = e6 | all_0_89_89 = e6 | all_0_96_96 = e6) & (all_0_54_54 = e5 | all_0_61_61 = e5 | all_0_68_68 = e5 | all_0_75_75 = e5 | all_0_82_82 = e5 | all_0_89_89 = e5 | all_0_96_96 = e5) & (all_0_54_54 = e4 | all_0_61_61 = e4 | all_0_68_68 = e4 | all_0_75_75 = e4 | all_0_82_82 = e4 | all_0_89_89 = e4 | all_0_96_96 = e4) & (all_0_54_54 = e3 | all_0_61_61 = e3 | all_0_68_68 = e3 | all_0_75_75 = e3 | all_0_82_82 = e3 | all_0_89_89 = e3 | all_0_96_96 = e3) & (all_0_54_54 = e2 | all_0_61_61 = e2 | all_0_68_68 = e2 | all_0_75_75 = e2 | all_0_82_82 = e2 | all_0_89_89 = e2 | all_0_96_96 = e2) & (all_0_54_54 = e1 | all_0_61_61 = e1 | all_0_68_68 = e1 | all_0_75_75 = e1 | all_0_82_82 = e1 | all_0_89_89 = e1 | all_0_96_96 = e1) & (all_0_54_54 = e0 | all_0_61_61 = e0 | all_0_68_68 = e0 | all_0_75_75 = e0 | all_0_82_82 = e0 | all_0_89_89 = e0 | all_0_96_96 = e0) & (all_0_55_55 = e6 | all_0_55_55 = e5 | all_0_55_55 = e4 | all_0_55_55 = e3 | all_0_55_55 = e2 | all_0_55_55 = e1 | all_0_55_55 = e0) & (all_0_55_55 = e6 | all_0_62_62 = e6 | all_0_69_69 = e6 | all_0_76_76 = e6 | all_0_83_83 = e6 | all_0_90_90 = e6 | all_0_97_97 = e6) & (all_0_55_55 = e5 | all_0_62_62 = e5 | all_0_69_69 = e5 | all_0_76_76 = e5 | all_0_83_83 = e5 | all_0_90_90 = e5 | all_0_97_97 = e5) & (all_0_55_55 = e4 | all_0_62_62 = e4 | all_0_69_69 = e4 | all_0_76_76 = e4 | all_0_83_83 = e4 | all_0_90_90 = e4 | all_0_97_97 = e4) & (all_0_55_55 = e3 | all_0_62_62 = e3 | all_0_69_69 = e3 | all_0_76_76 = e3 | all_0_83_83 = e3 | all_0_90_90 = e3 | all_0_97_97 = e3) & (all_0_55_55 = e2 | all_0_62_62 = e2 | all_0_69_69 = e2 | all_0_76_76 = e2 | all_0_83_83 = e2 | all_0_90_90 = e2 | all_0_97_97 = e2) & (all_0_55_55 = e1 | all_0_62_62 = e1 | all_0_69_69 = e1 | all_0_76_76 = e1 | all_0_83_83 = e1 | all_0_90_90 = e1 | all_0_97_97 = e1) & (all_0_55_55 = e0 | all_0_62_62 = e0 | all_0_69_69 = e0 | all_0_76_76 = e0 | all_0_83_83 = e0 | all_0_90_90 = e0 | all_0_97_97 = e0) & (all_0_56_56 = e6 | all_0_56_56 = e5 | all_0_56_56 = e4 | all_0_56_56 = e3 | all_0_56_56 = e2 | all_0_56_56 = e1 | all_0_56_56 = e0) & (all_0_56_56 = e6 | all_0_57_57 = e6 | all_0_58_58 = e6 | all_0_59_59 = e6 | all_0_60_60 = e6 | all_0_61_61 = e6 | all_0_62_62 = e6) & (all_0_56_56 = e5 | all_0_57_57 = e5 | all_0_58_58 = e5 | all_0_59_59 = e5 | all_0_60_60 = e5 | all_0_61_61 = e5 | all_0_62_62 = e5) & (all_0_56_56 = e4 | all_0_57_57 = e4 | all_0_58_58 = e4 | all_0_59_59 = e4 | all_0_60_60 = e4 | all_0_61_61 = e4 | all_0_62_62 = e4) & (all_0_56_56 = e3 | all_0_57_57 = e3 | all_0_58_58 = e3 | all_0_59_59 = e3 | all_0_60_60 = e3 | all_0_61_61 = e3 | all_0_62_62 = e3) & (all_0_56_56 = e2 | all_0_57_57 = e2 | all_0_58_58 = e2 | all_0_59_59 = e2 | all_0_60_60 = e2 | all_0_61_61 = e2 | all_0_62_62 = e2) & (all_0_56_56 = e1 | all_0_57_57 = e1 | all_0_58_58 = e1 | all_0_59_59 = e1 | all_0_60_60 = e1 | all_0_61_61 = e1 | all_0_62_62 = e1) & (all_0_56_56 = e0 | all_0_57_57 = e0 | all_0_58_58 = e0 | all_0_59_59 = e0 | all_0_60_60 = e0 | all_0_61_61 = e0 | all_0_62_62 = e0) & (all_0_57_57 = e6 | all_0_57_57 = e5 | all_0_57_57 = e4 | all_0_57_57 = e3 | all_0_57_57 = e2 | all_0_57_57 = e1 | all_0_57_57 = e0) & (all_0_58_58 = e6 | all_0_58_58 = e5 | all_0_58_58 = e4 | all_0_58_58 = e3 | all_0_58_58 = e2 | all_0_58_58 = e1 | all_0_58_58 = e0) & (all_0_59_59 = e6 | all_0_59_59 = e5 | all_0_59_59 = e4 | all_0_59_59 = e3 | all_0_59_59 = e2 | all_0_59_59 = e1 | all_0_59_59 = e0) & (all_0_60_60 = e6 | all_0_60_60 = e5 | all_0_60_60 = e4 | all_0_60_60 = e3 | all_0_60_60 = e2 | all_0_60_60 = e1 | all_0_60_60 = e0) & (all_0_61_61 = e6 | all_0_61_61 = e5 | all_0_61_61 = e4 | all_0_61_61 = e3 | all_0_61_61 = e2 | all_0_61_61 = e1 | all_0_61_61 = e0) & (all_0_62_62 = e6 | all_0_62_62 = e5 | all_0_62_62 = e4 | all_0_62_62 = e3 | all_0_62_62 = e2 | all_0_62_62 = e1 | all_0_62_62 = e0) & (all_0_63_63 = e6 | all_0_63_63 = e5 | all_0_63_63 = e4 | all_0_63_63 = e3 | all_0_63_63 = e2 | all_0_63_63 = e1 | all_0_63_63 = e0) & (all_0_63_63 = e6 | all_0_64_64 = e6 | all_0_65_65 = e6 | all_0_66_66 = e6 | all_0_67_67 = e6 | all_0_68_68 = e6 | all_0_69_69 = e6) & (all_0_63_63 = e5 | all_0_64_64 = e5 | all_0_65_65 = e5 | all_0_66_66 = e5 | all_0_67_67 = e5 | all_0_68_68 = e5 | all_0_69_69 = e5) & (all_0_63_63 = e4 | all_0_64_64 = e4 | all_0_65_65 = e4 | all_0_66_66 = e4 | all_0_67_67 = e4 | all_0_68_68 = e4 | all_0_69_69 = e4) & (all_0_63_63 = e3 | all_0_64_64 = e3 | all_0_65_65 = e3 | all_0_66_66 = e3 | all_0_67_67 = e3 | all_0_68_68 = e3 | all_0_69_69 = e3) & (all_0_63_63 = e2 | all_0_64_64 = e2 | all_0_65_65 = e2 | all_0_66_66 = e2 | all_0_67_67 = e2 | all_0_68_68 = e2 | all_0_69_69 = e2) & (all_0_63_63 = e1 | all_0_64_64 = e1 | all_0_65_65 = e1 | all_0_66_66 = e1 | all_0_67_67 = e1 | all_0_68_68 = e1 | all_0_69_69 = e1) & (all_0_63_63 = e0 | all_0_64_64 = e0 | all_0_65_65 = e0 | all_0_66_66 = e0 | all_0_67_67 = e0 | all_0_68_68 = e0 | all_0_69_69 = e0) & (all_0_64_64 = e6 | all_0_64_64 = e5 | all_0_64_64 = e4 | all_0_64_64 = e3 | all_0_64_64 = e2 | all_0_64_64 = e1 | all_0_64_64 = e0) & (all_0_65_65 = e6 | all_0_65_65 = e5 | all_0_65_65 = e4 | all_0_65_65 = e3 | all_0_65_65 = e2 | all_0_65_65 = e1 | all_0_65_65 = e0) & (all_0_66_66 = e6 | all_0_66_66 = e5 | all_0_66_66 = e4 | all_0_66_66 = e3 | all_0_66_66 = e2 | all_0_66_66 = e1 | all_0_66_66 = e0) & (all_0_67_67 = e6 | all_0_67_67 = e5 | all_0_67_67 = e4 | all_0_67_67 = e3 | all_0_67_67 = e2 | all_0_67_67 = e1 | all_0_67_67 = e0) & (all_0_68_68 = e6 | all_0_68_68 = e5 | all_0_68_68 = e4 | all_0_68_68 = e3 | all_0_68_68 = e2 | all_0_68_68 = e1 | all_0_68_68 = e0) & (all_0_69_69 = e6 | all_0_69_69 = e5 | all_0_69_69 = e4 | all_0_69_69 = e3 | all_0_69_69 = e2 | all_0_69_69 = e1 | all_0_69_69 = e0) & (all_0_70_70 = e6 | all_0_70_70 = e5 | all_0_70_70 = e4 | all_0_70_70 = e3 | all_0_70_70 = e2 | all_0_70_70 = e1 | all_0_70_70 = e0) & (all_0_70_70 = e6 | all_0_71_71 = e6 | all_0_72_72 = e6 | all_0_73_73 = e6 | all_0_74_74 = e6 | all_0_75_75 = e6 | all_0_76_76 = e6) & (all_0_70_70 = e5 | all_0_71_71 = e5 | all_0_72_72 = e5 | all_0_73_73 = e5 | all_0_74_74 = e5 | all_0_75_75 = e5 | all_0_76_76 = e5) & (all_0_70_70 = e4 | all_0_71_71 = e4 | all_0_72_72 = e4 | all_0_73_73 = e4 | all_0_74_74 = e4 | all_0_75_75 = e4 | all_0_76_76 = e4) & (all_0_70_70 = e3 | all_0_71_71 = e3 | all_0_72_72 = e3 | all_0_73_73 = e3 | all_0_74_74 = e3 | all_0_75_75 = e3 | all_0_76_76 = e3) & (all_0_70_70 = e2 | all_0_71_71 = e2 | all_0_72_72 = e2 | all_0_73_73 = e2 | all_0_74_74 = e2 | all_0_75_75 = e2 | all_0_76_76 = e2) & (all_0_70_70 = e1 | all_0_71_71 = e1 | all_0_72_72 = e1 | all_0_73_73 = e1 | all_0_74_74 = e1 | all_0_75_75 = e1 | all_0_76_76 = e1) & (all_0_70_70 = e0 | all_0_71_71 = e0 | all_0_72_72 = e0 | all_0_73_73 = e0 | all_0_74_74 = e0 | all_0_75_75 = e0 | all_0_76_76 = e0) & (all_0_71_71 = e6 | all_0_71_71 = e5 | all_0_71_71 = e4 | all_0_71_71 = e3 | all_0_71_71 = e2 | all_0_71_71 = e1 | all_0_71_71 = e0) & (all_0_72_72 = e6 | all_0_72_72 = e5 | all_0_72_72 = e4 | all_0_72_72 = e3 | all_0_72_72 = e2 | all_0_72_72 = e1 | all_0_72_72 = e0) & (all_0_73_73 = e6 | all_0_73_73 = e5 | all_0_73_73 = e4 | all_0_73_73 = e3 | all_0_73_73 = e2 | all_0_73_73 = e1 | all_0_73_73 = e0) & (all_0_74_74 = e6 | all_0_74_74 = e5 | all_0_74_74 = e4 | all_0_74_74 = e3 | all_0_74_74 = e2 | all_0_74_74 = e1 | all_0_74_74 = e0) & (all_0_75_75 = e6 | all_0_75_75 = e5 | all_0_75_75 = e4 | all_0_75_75 = e3 | all_0_75_75 = e2 | all_0_75_75 = e1 | all_0_75_75 = e0) & (all_0_76_76 = e6 | all_0_76_76 = e5 | all_0_76_76 = e4 | all_0_76_76 = e3 | all_0_76_76 = e2 | all_0_76_76 = e1 | all_0_76_76 = e0) & (all_0_77_77 = e6 | all_0_77_77 = e5 | all_0_77_77 = e4 | all_0_77_77 = e3 | all_0_77_77 = e2 | all_0_77_77 = e1 | all_0_77_77 = e0) & (all_0_77_77 = e6 | all_0_78_78 = e6 | all_0_79_79 = e6 | all_0_80_80 = e6 | all_0_81_81 = e6 | all_0_82_82 = e6 | all_0_83_83 = e6) & (all_0_77_77 = e5 | all_0_78_78 = e5 | all_0_79_79 = e5 | all_0_80_80 = e5 | all_0_81_81 = e5 | all_0_82_82 = e5 | all_0_83_83 = e5) & (all_0_77_77 = e4 | all_0_78_78 = e4 | all_0_79_79 = e4 | all_0_80_80 = e4 | all_0_81_81 = e4 | all_0_82_82 = e4 | all_0_83_83 = e4) & (all_0_77_77 = e3 | all_0_78_78 = e3 | all_0_79_79 = e3 | all_0_80_80 = e3 | all_0_81_81 = e3 | all_0_82_82 = e3 | all_0_83_83 = e3) & (all_0_77_77 = e2 | all_0_78_78 = e2 | all_0_79_79 = e2 | all_0_80_80 = e2 | all_0_81_81 = e2 | all_0_82_82 = e2 | all_0_83_83 = e2) & (all_0_77_77 = e1 | all_0_78_78 = e1 | all_0_79_79 = e1 | all_0_80_80 = e1 | all_0_81_81 = e1 | all_0_82_82 = e1 | all_0_83_83 = e1) & (all_0_77_77 = e0 | all_0_78_78 = e0 | all_0_79_79 = e0 | all_0_80_80 = e0 | all_0_81_81 = e0 | all_0_82_82 = e0 | all_0_83_83 = e0) & (all_0_78_78 = e6 | all_0_78_78 = e5 | all_0_78_78 = e4 | all_0_78_78 = e3 | all_0_78_78 = e2 | all_0_78_78 = e1 | all_0_78_78 = e0) & (all_0_79_79 = e6 | all_0_79_79 = e5 | all_0_79_79 = e4 | all_0_79_79 = e3 | all_0_79_79 = e2 | all_0_79_79 = e1 | all_0_79_79 = e0) & (all_0_80_80 = e6 | all_0_80_80 = e5 | all_0_80_80 = e4 | all_0_80_80 = e3 | all_0_80_80 = e2 | all_0_80_80 = e1 | all_0_80_80 = e0) & (all_0_81_81 = e6 | all_0_81_81 = e5 | all_0_81_81 = e4 | all_0_81_81 = e3 | all_0_81_81 = e2 | all_0_81_81 = e1 | all_0_81_81 = e0) & (all_0_82_82 = e6 | all_0_82_82 = e5 | all_0_82_82 = e4 | all_0_82_82 = e3 | all_0_82_82 = e2 | all_0_82_82 = e1 | all_0_82_82 = e0) & (all_0_83_83 = e6 | all_0_83_83 = e5 | all_0_83_83 = e4 | all_0_83_83 = e3 | all_0_83_83 = e2 | all_0_83_83 = e1 | all_0_83_83 = e0) & (all_0_84_84 = e6 | all_0_84_84 = e5 | all_0_84_84 = e4 | all_0_84_84 = e3 | all_0_84_84 = e2 | all_0_84_84 = e1 | all_0_84_84 = e0) & (all_0_84_84 = e6 | all_0_85_85 = e6 | all_0_86_86 = e6 | all_0_87_87 = e6 | all_0_88_88 = e6 | all_0_89_89 = e6 | all_0_90_90 = e6) & (all_0_84_84 = e5 | all_0_85_85 = e5 | all_0_86_86 = e5 | all_0_87_87 = e5 | all_0_88_88 = e5 | all_0_89_89 = e5 | all_0_90_90 = e5) & (all_0_84_84 = e4 | all_0_85_85 = e4 | all_0_86_86 = e4 | all_0_87_87 = e4 | all_0_88_88 = e4 | all_0_89_89 = e4 | all_0_90_90 = e4) & (all_0_84_84 = e3 | all_0_85_85 = e3 | all_0_86_86 = e3 | all_0_87_87 = e3 | all_0_88_88 = e3 | all_0_89_89 = e3 | all_0_90_90 = e3) & (all_0_84_84 = e2 | all_0_85_85 = e2 | all_0_86_86 = e2 | all_0_87_87 = e2 | all_0_88_88 = e2 | all_0_89_89 = e2 | all_0_90_90 = e2) & (all_0_84_84 = e1 | all_0_85_85 = e1 | all_0_86_86 = e1 | all_0_87_87 = e1 | all_0_88_88 = e1 | all_0_89_89 = e1 | all_0_90_90 = e1) & (all_0_84_84 = e0 | all_0_85_85 = e0 | all_0_86_86 = e0 | all_0_87_87 = e0 | all_0_88_88 = e0 | all_0_89_89 = e0 | all_0_90_90 = e0) & (all_0_85_85 = e6 | all_0_85_85 = e5 | all_0_85_85 = e4 | all_0_85_85 = e3 | all_0_85_85 = e2 | all_0_85_85 = e1 | all_0_85_85 = e0) & (all_0_86_86 = e6 | all_0_86_86 = e5 | all_0_86_86 = e4 | all_0_86_86 = e3 | all_0_86_86 = e2 | all_0_86_86 = e1 | all_0_86_86 = e0) & (all_0_87_87 = e6 | all_0_87_87 = e5 | all_0_87_87 = e4 | all_0_87_87 = e3 | all_0_87_87 = e2 | all_0_87_87 = e1 | all_0_87_87 = e0) & (all_0_88_88 = e6 | all_0_88_88 = e5 | all_0_88_88 = e4 | all_0_88_88 = e3 | all_0_88_88 = e2 | all_0_88_88 = e1 | all_0_88_88 = e0) & (all_0_89_89 = e6 | all_0_89_89 = e5 | all_0_89_89 = e4 | all_0_89_89 = e3 | all_0_89_89 = e2 | all_0_89_89 = e1 | all_0_89_89 = e0) & (all_0_90_90 = e6 | all_0_90_90 = e5 | all_0_90_90 = e4 | all_0_90_90 = e3 | all_0_90_90 = e2 | all_0_90_90 = e1 | all_0_90_90 = e0) & (all_0_91_91 = e6 | all_0_91_91 = e5 | all_0_91_91 = e4 | all_0_91_91 = e3 | all_0_91_91 = e2 | all_0_91_91 = e1 | all_0_91_91 = e0) & (all_0_91_91 = e6 | all_0_92_92 = e6 | all_0_93_93 = e6 | all_0_94_94 = e6 | all_0_95_95 = e6 | all_0_96_96 = e6 | all_0_97_97 = e6) & (all_0_91_91 = e5 | all_0_92_92 = e5 | all_0_93_93 = e5 | all_0_94_94 = e5 | all_0_95_95 = e5 | all_0_96_96 = e5 | all_0_97_97 = e5) & (all_0_91_91 = e4 | all_0_92_92 = e4 | all_0_93_93 = e4 | all_0_94_94 = e4 | all_0_95_95 = e4 | all_0_96_96 = e4 | all_0_97_97 = e4) & (all_0_91_91 = e3 | all_0_92_92 = e3 | all_0_93_93 = e3 | all_0_94_94 = e3 | all_0_95_95 = e3 | all_0_96_96 = e3 | all_0_97_97 = e3) & (all_0_91_91 = e2 | all_0_92_92 = e2 | all_0_93_93 = e2 | all_0_94_94 = e2 | all_0_95_95 = e2 | all_0_96_96 = e2 | all_0_97_97 = e2) & (all_0_91_91 = e1 | all_0_92_92 = e1 | all_0_93_93 = e1 | all_0_94_94 = e1 | all_0_95_95 = e1 | all_0_96_96 = e1 | all_0_97_97 = e1) & (all_0_91_91 = e0 | all_0_92_92 = e0 | all_0_93_93 = e0 | all_0_94_94 = e0 | all_0_95_95 = e0 | all_0_96_96 = e0 | all_0_97_97 = e0) & (all_0_92_92 = e6 | all_0_92_92 = e5 | all_0_92_92 = e4 | all_0_92_92 = e3 | all_0_92_92 = e2 | all_0_92_92 = e1 | all_0_92_92 = e0) & (all_0_93_93 = e6 | all_0_93_93 = e5 | all_0_93_93 = e4 | all_0_93_93 = e3 | all_0_93_93 = e2 | all_0_93_93 = e1 | all_0_93_93 = e0) & (all_0_94_94 = e6 | all_0_94_94 = e5 | all_0_94_94 = e4 | all_0_94_94 = e3 | all_0_94_94 = e2 | all_0_94_94 = e1 | all_0_94_94 = e0) & (all_0_95_95 = e6 | all_0_95_95 = e5 | all_0_95_95 = e4 | all_0_95_95 = e3 | all_0_95_95 = e2 | all_0_95_95 = e1 | all_0_95_95 = e0) & (all_0_96_96 = e6 | all_0_96_96 = e5 | all_0_96_96 = e4 | all_0_96_96 = e3 | all_0_96_96 = e2 | all_0_96_96 = e1 | all_0_96_96 = e0) & (all_0_97_97 = e6 | all_0_97_97 = e5 | all_0_97_97 = e4 | all_0_97_97 = e3 | all_0_97_97 = e2 | all_0_97_97 = e1 | all_0_97_97 = e0) & ((all_0_49_49 = e6 & all_0_57_57 = e5 & all_0_65_65 = e4 & all_0_73_73 = e3 & all_0_81_81 = e2 & all_0_89_89 = e1 & all_0_97_97 = e0) | ( ~ (all_0_49_49 = e6) & ~ (all_0_57_57 = e5) & ~ (all_0_65_65 = e4) & ~ (all_0_73_73 = e3) & ~ (all_0_81_81 = e2) & ~ (all_0_89_89 = e1) & ~ (all_0_97_97 = e0)))
% 9.35/2.71 |
% 9.35/2.71 | Applying alpha-rule on (1) yields:
% 9.35/2.71 | (2) ~ (all_0_50_50 = all_0_55_55)
% 9.35/2.71 | (3) ~ (all_0_51_51 = all_0_58_58)
% 9.35/2.71 | (4) ~ (all_0_81_81 = all_0_82_82)
% 9.35/2.71 | (5) all_0_55_55 = e5 | all_0_62_62 = e5 | all_0_69_69 = e5 | all_0_76_76 = e5 | all_0_83_83 = e5 | all_0_90_90 = e5 | all_0_97_97 = e5
% 9.35/2.71 | (6) op(all_0_27_27, e0) = e3
% 9.35/2.71 | (7) all_0_95_95 = e6 | all_0_95_95 = e5 | all_0_95_95 = e4 | all_0_95_95 = e3 | all_0_95_95 = e2 | all_0_95_95 = e1 | all_0_95_95 = e0
% 9.35/2.71 | (8) ~ (all_0_96_96 = all_0_97_97)
% 9.35/2.71 | (9) op(all_0_4_4, e2) = e6
% 9.35/2.71 | (10) all_0_54_54 = e1 | all_0_61_61 = e1 | all_0_68_68 = e1 | all_0_75_75 = e1 | all_0_82_82 = e1 | all_0_89_89 = e1 | all_0_96_96 = e1
% 9.35/2.71 | (11) op(e1, e3) = all_0_87_87
% 9.35/2.71 | (12) ~ (all_0_51_51 = all_0_53_53)
% 9.35/2.71 | (13) all_0_56_56 = e6 | all_0_57_57 = e6 | all_0_58_58 = e6 | all_0_59_59 = e6 | all_0_60_60 = e6 | all_0_61_61 = e6 | all_0_62_62 = e6
% 9.35/2.71 | (14) op(all_0_85_85, e1) = all_0_12_12
% 9.35/2.71 | (15) ~ (all_0_56_56 = all_0_58_58)
% 9.35/2.71 | (16) op(all_0_42_42, e6) = e0
% 9.35/2.71 | (17) op(all_0_90_90, e1) = all_0_47_47
% 9.35/2.71 | (18) ~ (e4 = e0)
% 9.35/2.71 | (19) all_0_49_49 = e6 | all_0_57_57 = e5 | all_0_65_65 = e4 | all_0_73_73 = e3 | all_0_81_81 = e2 | all_0_89_89 = e1 | all_0_97_97 = e0
% 9.35/2.71 | (20) all_0_51_51 = e5 | all_0_58_58 = e5 | all_0_65_65 = e5 | all_0_72_72 = e5 | all_0_79_79 = e5 | all_0_86_86 = e5 | all_0_93_93 = e5
% 9.35/2.71 | (21) ~ (all_0_84_84 = all_0_91_91)
% 9.35/2.71 | (22) all_0_63_63 = e1 | all_0_64_64 = e1 | all_0_65_65 = e1 | all_0_66_66 = e1 | all_0_67_67 = e1 | all_0_68_68 = e1 | all_0_69_69 = e1
% 9.35/2.71 | (23) op(all_0_13_13, e0) = e5
% 9.35/2.71 | (24) all_0_97_97 = e6 | all_0_97_97 = e5 | all_0_97_97 = e4 | all_0_97_97 = e3 | all_0_97_97 = e2 | all_0_97_97 = e1 | all_0_97_97 = e0
% 9.35/2.71 | (25) op(all_0_67_67, e4) = all_0_30_30
% 9.35/2.71 | (26) all_0_53_53 = e4 | all_0_60_60 = e4 | all_0_67_67 = e4 | all_0_74_74 = e4 | all_0_81_81 = e4 | all_0_88_88 = e4 | all_0_95_95 = e4
% 9.35/2.71 | (27) all_0_91_91 = e6 | all_0_91_91 = e5 | all_0_91_91 = e4 | all_0_91_91 = e3 | all_0_91_91 = e2 | all_0_91_91 = e1 | all_0_91_91 = e0
% 9.35/2.71 | (28) ~ (all_0_50_50 = all_0_64_64)
% 9.35/2.71 | (29) ~ (all_0_51_51 = all_0_79_79)
% 9.35/2.71 | (30) op(all_0_21_21, e6) = e3
% 9.35/2.71 | (31) ~ (all_0_49_49 = all_0_54_54)
% 9.35/2.71 | (32) ~ (all_0_57_57 = all_0_71_71)
% 9.35/2.71 | (33) all_0_50_50 = e0 | all_0_57_57 = e0 | all_0_64_64 = e0 | all_0_71_71 = e0 | all_0_78_78 = e0 | all_0_85_85 = e0 | all_0_92_92 = e0
% 9.35/2.71 | (34) ~ (all_0_67_67 = all_0_74_74)
% 9.35/2.71 | (35) all_0_85_85 = e6 | all_0_85_85 = e5 | all_0_85_85 = e4 | all_0_85_85 = e3 | all_0_85_85 = e2 | all_0_85_85 = e1 | all_0_85_85 = e0
% 9.35/2.71 | (36) ~ (all_0_54_54 = all_0_55_55)
% 9.35/2.71 | (37) ~ (all_0_62_62 = all_0_76_76)
% 9.35/2.71 | (38) ~ (all_0_77_77 = all_0_81_81)
% 9.35/2.71 | (39) ~ (all_0_75_75 = all_0_96_96)
% 9.35/2.71 | (40) op(all_0_15_15, e5) = e4
% 9.35/2.71 | (41) ~ (all_0_51_51 = all_0_52_52)
% 9.35/2.72 | (42) ~ (all_0_57_57 = all_0_78_78)
% 9.35/2.72 | (43) ~ (all_0_81_81 = all_0_83_83)
% 9.35/2.72 | (44) ~ (all_0_75_75 = all_0_89_89)
% 9.35/2.72 | (45) all_0_52_52 = e6 | all_0_52_52 = e5 | all_0_52_52 = e4 | all_0_52_52 = e3 | all_0_52_52 = e2 | all_0_52_52 = e1 | all_0_52_52 = e0
% 9.35/2.72 | (46) ~ (all_0_94_94 = all_0_97_97)
% 9.35/2.72 | (47) ~ (all_0_66_66 = all_0_69_69)
% 9.35/2.72 | (48) ~ (all_0_81_81 = all_0_88_88)
% 9.35/2.72 | (49) all_0_63_63 = e6 | all_0_64_64 = e6 | all_0_65_65 = e6 | all_0_66_66 = e6 | all_0_67_67 = e6 | all_0_68_68 = e6 | all_0_69_69 = e6
% 9.35/2.72 | (50) ~ (all_0_71_71 = all_0_76_76)
% 9.35/2.72 | (51) all_0_70_70 = e5 | all_0_71_71 = e5 | all_0_72_72 = e5 | all_0_73_73 = e5 | all_0_74_74 = e5 | all_0_75_75 = e5 | all_0_76_76 = e5
% 9.35/2.72 | (52) ~ (all_0_58_58 = all_0_62_62)
% 9.35/2.72 | (53) ~ (all_0_52_52 = all_0_66_66)
% 9.35/2.72 | (54) ~ (all_0_78_78 = all_0_83_83)
% 9.35/2.72 | (55) ~ (all_0_71_71 = all_0_78_78)
% 9.35/2.72 | (56) all_0_51_51 = e1 | all_0_58_58 = e1 | all_0_65_65 = e1 | all_0_72_72 = e1 | all_0_79_79 = e1 | all_0_86_86 = e1 | all_0_93_93 = e1
% 9.35/2.72 | (57) ~ (all_0_57_57 = all_0_61_61)
% 9.35/2.72 | (58) all_0_50_50 = e2 | all_0_57_57 = e2 | all_0_64_64 = e2 | all_0_71_71 = e2 | all_0_78_78 = e2 | all_0_85_85 = e2 | all_0_92_92 = e2
% 9.35/2.72 | (59) all_0_70_70 = e0 | all_0_71_71 = e0 | all_0_72_72 = e0 | all_0_73_73 = e0 | all_0_74_74 = e0 | all_0_75_75 = e0 | all_0_76_76 = e0
% 9.35/2.72 | (60) all_0_51_51 = e4 | all_0_58_58 = e4 | all_0_65_65 = e4 | all_0_72_72 = e4 | all_0_79_79 = e4 | all_0_86_86 = e4 | all_0_93_93 = e4
% 9.35/2.72 | (61) all_0_70_70 = e4 | all_0_71_71 = e4 | all_0_72_72 = e4 | all_0_73_73 = e4 | all_0_74_74 = e4 | all_0_75_75 = e4 | all_0_76_76 = e4
% 9.35/2.72 | (62) all_0_55_55 = e3 | all_0_62_62 = e3 | all_0_69_69 = e3 | all_0_76_76 = e3 | all_0_83_83 = e3 | all_0_90_90 = e3 | all_0_97_97 = e3
% 9.35/2.72 | (63) ~ (all_0_66_66 = all_0_87_87)
% 9.35/2.72 | (64) all_0_64_64 = e6 | all_0_64_64 = e5 | all_0_64_64 = e4 | all_0_64_64 = e3 | all_0_64_64 = e2 | all_0_64_64 = e1 | all_0_64_64 = e0
% 9.35/2.72 | (65) ~ (all_0_64_64 = all_0_78_78)
% 9.35/2.72 | (66) ~ (e6 = e4)
% 9.35/2.72 | (67) all_0_56_56 = e6 | all_0_56_56 = e5 | all_0_56_56 = e4 | all_0_56_56 = e3 | all_0_56_56 = e2 | all_0_56_56 = e1 | all_0_56_56 = e0
% 9.35/2.72 | (68) ~ (all_0_92_92 = all_0_97_97)
% 9.35/2.72 | (69) ~ (all_0_58_58 = all_0_72_72)
% 9.35/2.72 | (70) ~ (all_0_70_70 = all_0_71_71)
% 9.35/2.72 | (71) ~ (all_0_63_63 = all_0_70_70)
% 9.35/2.72 | (72) ~ (all_0_52_52 = all_0_59_59)
% 9.35/2.72 | (73) op(e6, e3) = all_0_52_52
% 9.35/2.72 | (74) op(all_0_36_36, e5) = e1
% 9.35/2.72 | (75) ~ (all_0_91_91 = all_0_92_92)
% 9.35/2.72 | (76) ~ (all_0_91_91 = all_0_97_97)
% 9.35/2.72 | (77) op(all_0_33_33, e1) = e2
% 9.35/2.72 | (78) ~ (e4 = e3)
% 9.35/2.72 | (79) ~ (all_0_84_84 = all_0_88_88)
% 9.35/2.72 | (80) all_0_49_49 = e3 | all_0_50_50 = e3 | all_0_51_51 = e3 | all_0_52_52 = e3 | all_0_53_53 = e3 | all_0_54_54 = e3 | all_0_55_55 = e3
% 9.35/2.72 | (81) all_0_81_81 = e6 | all_0_81_81 = e5 | all_0_81_81 = e4 | all_0_81_81 = e3 | all_0_81_81 = e2 | all_0_81_81 = e1 | all_0_81_81 = e0
% 9.35/2.72 | (82) ~ (all_0_65_65 = all_0_79_79)
% 9.35/2.72 | (83) op(e6, e4) = all_0_51_51
% 9.35/2.72 | (84) ~ (all_0_53_53 = all_0_81_81)
% 9.35/2.72 | (85) op(e4, e6) = all_0_63_63
% 9.35/2.72 | (86) ~ (all_0_57_57 = all_0_58_58)
% 9.35/2.72 | (87) ~ (all_0_88_88 = all_0_90_90)
% 9.35/2.72 | (88) ~ (all_0_78_78 = all_0_82_82)
% 9.35/2.72 | (89) ~ (all_0_58_58 = all_0_86_86)
% 9.35/2.72 | (90) all_0_78_78 = e6 | all_0_78_78 = e5 | all_0_78_78 = e4 | all_0_78_78 = e3 | all_0_78_78 = e2 | all_0_78_78 = e1 | all_0_78_78 = e0
% 9.35/2.72 | (91) all_0_71_71 = e6 | all_0_71_71 = e5 | all_0_71_71 = e4 | all_0_71_71 = e3 | all_0_71_71 = e2 | all_0_71_71 = e1 | all_0_71_71 = e0
% 9.35/2.72 | (92) ~ (all_0_58_58 = all_0_60_60)
% 9.35/2.72 | (93) ~ (all_0_64_64 = all_0_92_92)
% 9.35/2.72 | (94) all_0_96_96 = e6 | all_0_96_96 = e5 | all_0_96_96 = e4 | all_0_96_96 = e3 | all_0_96_96 = e2 | all_0_96_96 = e1 | all_0_96_96 = e0
% 9.35/2.72 | (95) ~ (all_0_49_49 = all_0_53_53)
% 9.35/2.72 | (96) ! [v0] : ! [v1] : ! [v2] : ! [v3] : (v1 = v0 | ~ (op(v3, v2) = v1) | ~ (op(v3, v2) = v0))
% 9.35/2.72 | (97) op(e1, e4) = all_0_86_86
% 9.35/2.72 | (98) ~ (all_0_49_49 = all_0_56_56)
% 9.35/2.72 | (99) op(all_0_48_48, e0) = e0
% 9.35/2.72 | (100) ~ (all_0_70_70 = all_0_72_72)
% 9.35/2.72 | (101) ~ (all_0_61_61 = all_0_82_82)
% 9.35/2.72 | (102) ~ (all_0_62_62 = all_0_69_69)
% 9.35/2.72 | (103) op(all_0_2_2, e4) = e6
% 9.35/2.72 | (104) ~ (all_0_70_70 = all_0_77_77)
% 9.35/2.72 | (105) ~ (all_0_84_84 = all_0_86_86)
% 9.35/2.72 | (106) ~ (all_0_95_95 = all_0_97_97)
% 9.35/2.72 | (107) op(e6, e6) = all_0_49_49
% 9.35/2.72 | (108) op(e4, e4) = all_0_65_65
% 9.35/2.72 | (109) ~ (all_0_60_60 = all_0_95_95)
% 9.35/2.72 | (110) ~ (all_0_70_70 = all_0_76_76)
% 9.35/2.72 | (111) ~ (all_0_63_63 = all_0_91_91)
% 9.35/2.72 | (112) ~ (all_0_50_50 = all_0_78_78)
% 9.35/2.72 | (113) ~ (all_0_82_82 = all_0_83_83)
% 9.35/2.72 | (114) ~ (all_0_73_73 = all_0_87_87)
% 9.35/2.72 | (115) ~ (all_0_49_49 = all_0_55_55)
% 9.35/2.72 | (116) op(e5, e0) = all_0_62_62
% 9.35/2.72 | (117) ~ (all_0_68_68 = all_0_75_75)
% 9.35/2.72 | (118) ~ (all_0_75_75 = all_0_76_76)
% 9.35/2.72 | (119) ~ (all_0_75_75 = all_0_82_82)
% 9.35/2.72 | (120) ~ (all_0_58_58 = all_0_59_59)
% 9.35/2.72 | (121) all_0_56_56 = e0 | all_0_57_57 = e0 | all_0_58_58 = e0 | all_0_59_59 = e0 | all_0_60_60 = e0 | all_0_61_61 = e0 | all_0_62_62 = e0
% 9.35/2.72 | (122) ~ (all_0_64_64 = all_0_67_67)
% 9.35/2.72 | (123) ~ (all_0_73_73 = all_0_76_76)
% 9.35/2.72 | (124) op(e6, e5) = all_0_50_50
% 9.35/2.72 | (125) ~ (all_0_63_63 = all_0_64_64)
% 9.35/2.72 | (126) ~ (all_0_91_91 = all_0_96_96)
% 9.35/2.72 | (127) all_0_52_52 = e2 | all_0_59_59 = e2 | all_0_66_66 = e2 | all_0_73_73 = e2 | all_0_80_80 = e2 | all_0_87_87 = e2 | all_0_94_94 = e2
% 9.35/2.72 | (128) op(all_0_54_54, e6) = all_0_35_35
% 9.35/2.72 | (129) op(e3, e6) = all_0_70_70
% 9.35/2.72 | (130) op(all_0_71_71, e3) = all_0_10_10
% 9.35/2.72 | (131) ~ (all_0_59_59 = all_0_87_87)
% 9.35/2.72 | (132) ~ (all_0_68_68 = all_0_82_82)
% 9.35/2.72 | (133) op(all_0_19_19, e1) = e4
% 9.35/2.72 | (134) ~ (all_0_67_67 = all_0_68_68)
% 9.35/2.72 | (135) op(all_0_49_49, e6) = all_0_0_0
% 9.35/2.72 | (136) all_0_67_67 = e6 | all_0_67_67 = e5 | all_0_67_67 = e4 | all_0_67_67 = e3 | all_0_67_67 = e2 | all_0_67_67 = e1 | all_0_67_67 = e0
% 9.35/2.72 | (137) ~ (all_0_91_91 = all_0_95_95)
% 9.35/2.72 | (138) ~ (all_0_72_72 = all_0_75_75)
% 9.35/2.72 | (139) ~ (all_0_67_67 = all_0_69_69)
% 9.35/2.72 | (140) op(e1, e5) = all_0_85_85
% 9.35/2.72 | (141) all_0_49_49 = e1 | all_0_50_50 = e1 | all_0_51_51 = e1 | all_0_52_52 = e1 | all_0_53_53 = e1 | all_0_54_54 = e1 | all_0_55_55 = e1
% 9.35/2.72 | (142) ~ (all_0_54_54 = all_0_89_89)
% 9.35/2.72 | (143) op(all_0_64_64, e4) = all_0_9_9
% 9.35/2.72 | (144) all_0_60_60 = e6 | all_0_60_60 = e5 | all_0_60_60 = e4 | all_0_60_60 = e3 | all_0_60_60 = e2 | all_0_60_60 = e1 | all_0_60_60 = e0
% 9.35/2.72 | (145) all_0_63_63 = e0 | all_0_64_64 = e0 | all_0_65_65 = e0 | all_0_66_66 = e0 | all_0_67_67 = e0 | all_0_68_68 = e0 | all_0_69_69 = e0
% 9.35/2.72 | (146) op(all_0_66_66, e4) = all_0_23_23
% 9.35/2.72 | (147) ~ (e2 = e0)
% 9.35/2.72 | (148) ~ (all_0_65_65 = all_0_86_86)
% 9.35/2.72 | (149) ~ (all_0_68_68 = all_0_89_89)
% 9.35/2.72 | (150) ~ (all_0_82_82 = all_0_89_89)
% 9.35/2.72 | (151) all_0_56_56 = e2 | all_0_57_57 = e2 | all_0_58_58 = e2 | all_0_59_59 = e2 | all_0_60_60 = e2 | all_0_61_61 = e2 | all_0_62_62 = e2
% 9.35/2.72 | (152) ~ (all_0_79_79 = all_0_80_80)
% 9.35/2.72 | (153) ~ (all_0_87_87 = all_0_89_89)
% 9.35/2.72 | (154) all_0_79_79 = e6 | all_0_79_79 = e5 | all_0_79_79 = e4 | all_0_79_79 = e3 | all_0_79_79 = e2 | all_0_79_79 = e1 | all_0_79_79 = e0
% 9.35/2.72 | (155) all_0_70_70 = e6 | all_0_71_71 = e6 | all_0_72_72 = e6 | all_0_73_73 = e6 | all_0_74_74 = e6 | all_0_75_75 = e6 | all_0_76_76 = e6
% 9.35/2.72 | (156) ~ (all_0_54_54 = all_0_82_82)
% 9.35/2.72 | (157) all_0_49_49 = e6 | all_0_50_50 = e6 | all_0_51_51 = e6 | all_0_52_52 = e6 | all_0_53_53 = e6 | all_0_54_54 = e6 | all_0_55_55 = e6
% 9.35/2.72 | (158) ~ (all_0_73_73 = all_0_94_94)
% 9.35/2.72 | (159) op(e2, e6) = all_0_77_77
% 9.35/2.72 | (160) op(all_0_81_81, e2) = all_0_32_32
% 9.35/2.72 | (161) ~ (all_0_93_93 = all_0_94_94)
% 9.35/2.72 | (162) op(all_0_34_34, e0) = e2
% 9.35/2.72 | (163) ~ (all_0_56_56 = all_0_61_61)
% 9.35/2.72 | (164) ~ (e5 = e1)
% 9.35/2.72 | (165) op(e3, e4) = all_0_72_72
% 9.35/2.73 | (166) all_0_52_52 = e3 | all_0_59_59 = e3 | all_0_66_66 = e3 | all_0_73_73 = e3 | all_0_80_80 = e3 | all_0_87_87 = e3 | all_0_94_94 = e3
% 9.35/2.73 | (167) ~ (all_0_64_64 = all_0_69_69)
% 9.35/2.73 | (168) op(all_0_78_78, e2) = all_0_11_11
% 9.35/2.73 | (169) all_0_87_87 = e6 | all_0_87_87 = e5 | all_0_87_87 = e4 | all_0_87_87 = e3 | all_0_87_87 = e2 | all_0_87_87 = e1 | all_0_87_87 = e0
% 9.35/2.73 | (170) ~ (all_0_84_84 = all_0_90_90)
% 9.35/2.73 | (171) ~ (all_0_86_86 = all_0_89_89)
% 9.35/2.73 | (172) ~ (e3 = e0)
% 9.35/2.73 | (173) op(e4, e3) = all_0_66_66
% 9.35/2.73 | (174) op(all_0_63_63, e4) = all_0_2_2
% 9.35/2.73 | (175) all_0_56_56 = e4 | all_0_57_57 = e4 | all_0_58_58 = e4 | all_0_59_59 = e4 | all_0_60_60 = e4 | all_0_61_61 = e4 | all_0_62_62 = e4
% 9.35/2.73 | (176) ~ (all_0_53_53 = all_0_60_60)
% 9.35/2.73 | (177) all_0_77_77 = e1 | all_0_78_78 = e1 | all_0_79_79 = e1 | all_0_80_80 = e1 | all_0_81_81 = e1 | all_0_82_82 = e1 | all_0_83_83 = e1
% 9.35/2.73 | (178) op(all_0_82_82, e2) = all_0_39_39
% 9.35/2.73 | (179) ~ (all_0_50_50 = all_0_92_92)
% 9.35/2.73 | (180) ~ (all_0_65_65 = all_0_68_68)
% 9.35/2.73 | (181) all_0_83_83 = e6 | all_0_83_83 = e5 | all_0_83_83 = e4 | all_0_83_83 = e3 | all_0_83_83 = e2 | all_0_83_83 = e1 | all_0_83_83 = e0
% 9.35/2.73 | (182) ~ (all_0_51_51 = all_0_72_72)
% 9.35/2.73 | (183) ~ (all_0_79_79 = all_0_83_83)
% 9.35/2.73 | (184) op(e5, e5) = all_0_57_57
% 9.35/2.73 | (185) all_0_77_77 = e0 | all_0_78_78 = e0 | all_0_79_79 = e0 | all_0_80_80 = e0 | all_0_81_81 = e0 | all_0_82_82 = e0 | all_0_83_83 = e0
% 9.35/2.73 | (186) ~ (all_0_85_85 = all_0_89_89)
% 9.35/2.73 | (187) ~ (all_0_54_54 = all_0_96_96)
% 9.35/2.73 | (188) op(all_0_62_62, e5) = all_0_43_43
% 9.35/2.73 | (189) ~ (all_0_80_80 = all_0_83_83)
% 9.35/2.73 | (190) op(all_0_12_12, e1) = e5
% 9.35/2.73 | (191) ~ (all_0_61_61 = all_0_96_96)
% 9.35/2.73 | (192) ~ (all_0_56_56 = all_0_57_57)
% 9.35/2.73 | (193) all_0_84_84 = e6 | all_0_84_84 = e5 | all_0_84_84 = e4 | all_0_84_84 = e3 | all_0_84_84 = e2 | all_0_84_84 = e1 | all_0_84_84 = e0
% 9.35/2.73 | (194) ~ (all_0_55_55 = all_0_62_62)
% 9.35/2.73 | (195) ~ (all_0_66_66 = all_0_68_68)
% 9.35/2.73 | (196) op(e0, e6) = all_0_91_91
% 9.35/2.73 | (197) all_0_62_62 = e6 | all_0_62_62 = e5 | all_0_62_62 = e4 | all_0_62_62 = e3 | all_0_62_62 = e2 | all_0_62_62 = e1 | all_0_62_62 = e0
% 9.35/2.73 | (198) ~ (all_0_52_52 = all_0_73_73)
% 9.35/2.73 | (199) ~ (all_0_70_70 = all_0_84_84)
% 9.35/2.73 | (200) op(all_0_74_74, e3) = all_0_31_31
% 9.35/2.73 | (201) ~ (all_0_92_92 = all_0_95_95)
% 9.35/2.73 | (202) ~ (all_0_77_77 = all_0_84_84)
% 9.35/2.73 | (203) op(all_0_28_28, e6) = e2
% 9.35/2.73 | (204) ~ (all_0_54_54 = all_0_61_61)
% 9.35/2.73 | (205) op(all_0_47_47, e1) = e0
% 9.35/2.73 | (206) ~ (all_0_88_88 = all_0_89_89)
% 9.35/2.73 | (207) ~ (all_0_49_49 = all_0_50_50)
% 9.35/2.73 | (208) ~ (all_0_62_62 = all_0_83_83)
% 9.35/2.73 | (209) op(all_0_92_92, e0) = all_0_13_13
% 9.35/2.73 | (210) ~ (all_0_92_92 = all_0_94_94)
% 9.35/2.73 | (211) ~ (all_0_66_66 = all_0_73_73)
% 9.35/2.73 | (212) op(all_0_89_89, e1) = all_0_40_40
% 9.35/2.73 | (213) ~ (all_0_57_57 = all_0_60_60)
% 9.35/2.73 | (214) op(all_0_40_40, e1) = e1
% 9.35/2.73 | (215) ~ (all_0_78_78 = all_0_79_79)
% 9.35/2.73 | (216) ~ (all_0_63_63 = all_0_67_67)
% 9.35/2.73 | (217) ~ (all_0_71_71 = all_0_73_73)
% 9.35/2.73 | (218) all_0_59_59 = e6 | all_0_59_59 = e5 | all_0_59_59 = e4 | all_0_59_59 = e3 | all_0_59_59 = e2 | all_0_59_59 = e1 | all_0_59_59 = e0
% 9.35/2.73 | (219) ~ (all_0_85_85 = all_0_87_87)
% 9.35/2.73 | (220) all_0_74_74 = e6 | all_0_74_74 = e5 | all_0_74_74 = e4 | all_0_74_74 = e3 | all_0_74_74 = e2 | all_0_74_74 = e1 | all_0_74_74 = e0
% 9.35/2.73 | (221) ~ (all_0_51_51 = all_0_65_65)
% 9.35/2.73 | (222) all_0_49_49 = e5 | all_0_56_56 = e5 | all_0_63_63 = e5 | all_0_70_70 = e5 | all_0_77_77 = e5 | all_0_84_84 = e5 | all_0_91_91 = e5
% 9.35/2.73 | (223) op(all_0_60_60, e5) = all_0_29_29
% 9.35/2.73 | (224) ~ (all_0_53_53 = all_0_55_55)
% 9.35/2.73 | (225) ~ (all_0_50_50 = all_0_51_51)
% 9.35/2.73 | (226) ~ (all_0_69_69 = all_0_83_83)
% 9.35/2.73 | (227) op(e2, e3) = all_0_80_80
% 9.35/2.73 | (228) op(all_0_55_55, e6) = all_0_42_42
% 9.35/2.73 | (229) ~ (all_0_79_79 = all_0_81_81)
% 9.35/2.73 | (230) op(e2, e0) = all_0_83_83
% 9.35/2.73 | (231) ~ (all_0_59_59 = all_0_61_61)
% 9.35/2.73 | (232) ~ (all_0_88_88 = all_0_95_95)
% 9.35/2.73 | (233) ~ (all_0_72_72 = all_0_93_93)
% 9.35/2.73 | (234) all_0_82_82 = e6 | all_0_82_82 = e5 | all_0_82_82 = e4 | all_0_82_82 = e3 | all_0_82_82 = e2 | all_0_82_82 = e1 | all_0_82_82 = e0
% 9.35/2.73 | (235) op(all_0_53_53, e6) = all_0_28_28
% 9.35/2.73 | (236) all_0_52_52 = e1 | all_0_59_59 = e1 | all_0_66_66 = e1 | all_0_73_73 = e1 | all_0_80_80 = e1 | all_0_87_87 = e1 | all_0_94_94 = e1
% 9.35/2.73 | (237) all_0_70_70 = e6 | all_0_70_70 = e5 | all_0_70_70 = e4 | all_0_70_70 = e3 | all_0_70_70 = e2 | all_0_70_70 = e1 | all_0_70_70 = e0
% 9.35/2.73 | (238) ~ (all_0_65_65 = all_0_66_66)
% 9.35/2.73 | (239) ~ (all_0_67_67 = all_0_88_88)
% 9.35/2.73 | (240) all_0_57_57 = e6 | all_0_57_57 = e5 | all_0_57_57 = e4 | all_0_57_57 = e3 | all_0_57_57 = e2 | all_0_57_57 = e1 | all_0_57_57 = e0
% 9.35/2.73 | (241) all_0_84_84 = e3 | all_0_85_85 = e3 | all_0_86_86 = e3 | all_0_87_87 = e3 | all_0_88_88 = e3 | all_0_89_89 = e3 | all_0_90_90 = e3
% 9.35/2.73 | (242) op(e3, e5) = all_0_71_71
% 9.35/2.73 | (243) ~ (all_0_55_55 = all_0_69_69)
% 9.35/2.73 | (244) ~ (all_0_68_68 = all_0_69_69)
% 9.35/2.73 | (245) all_0_51_51 = e2 | all_0_58_58 = e2 | all_0_65_65 = e2 | all_0_72_72 = e2 | all_0_79_79 = e2 | all_0_86_86 = e2 | all_0_93_93 = e2
% 9.35/2.73 | (246) ~ (all_0_52_52 = all_0_94_94)
% 9.35/2.73 | (247) ~ (all_0_63_63 = all_0_84_84)
% 9.35/2.73 | (248) ~ (all_0_53_53 = all_0_95_95)
% 9.35/2.73 | (249) op(e1, e1) = all_0_89_89
% 9.35/2.73 | (250) ~ (all_0_55_55 = all_0_97_97)
% 9.35/2.73 | (251) ~ (e5 = e0)
% 9.35/2.73 | (252) op(all_0_18_18, e2) = e4
% 9.35/2.73 | (253) all_0_84_84 = e6 | all_0_85_85 = e6 | all_0_86_86 = e6 | all_0_87_87 = e6 | all_0_88_88 = e6 | all_0_89_89 = e6 | all_0_90_90 = e6
% 9.35/2.73 | (254) all_0_77_77 = e2 | all_0_78_78 = e2 | all_0_79_79 = e2 | all_0_80_80 = e2 | all_0_81_81 = e2 | all_0_82_82 = e2 | all_0_83_83 = e2
% 9.35/2.73 | (255) all_0_92_92 = e6 | all_0_92_92 = e5 | all_0_92_92 = e4 | all_0_92_92 = e3 | all_0_92_92 = e2 | all_0_92_92 = e1 | all_0_92_92 = e0
% 9.35/2.73 | (256) ~ (all_0_59_59 = all_0_73_73)
% 9.35/2.73 | (257) ~ (all_0_49_49 = all_0_52_52)
% 9.35/2.73 | (258) op(all_0_22_22, e5) = e3
% 9.35/2.73 | (259) ~ (all_0_72_72 = all_0_79_79)
% 9.35/2.73 | (260) all_0_63_63 = e6 | all_0_63_63 = e5 | all_0_63_63 = e4 | all_0_63_63 = e3 | all_0_63_63 = e2 | all_0_63_63 = e1 | all_0_63_63 = e0
% 9.35/2.73 | (261) ~ (all_0_61_61 = all_0_68_68)
% 9.35/2.73 | (262) ~ (all_0_57_57 = all_0_85_85)
% 9.35/2.73 | (263) ~ (all_0_51_51 = all_0_54_54)
% 9.35/2.73 | (264) op(e1, e6) = all_0_84_84
% 9.35/2.73 | (265) ~ (all_0_55_55 = all_0_83_83)
% 9.35/2.73 | (266) all_0_77_77 = e3 | all_0_78_78 = e3 | all_0_79_79 = e3 | all_0_80_80 = e3 | all_0_81_81 = e3 | all_0_82_82 = e3 | all_0_83_83 = e3
% 9.35/2.73 | (267) ~ (all_0_94_94 = all_0_96_96)
% 9.35/2.73 | (268) op(all_0_95_95, e0) = all_0_34_34
% 9.35/2.73 | (269) ~ (all_0_71_71 = all_0_74_74)
% 9.35/2.73 | (270) ~ (all_0_80_80 = all_0_94_94)
% 9.35/2.73 | (271) op(all_0_93_93, e0) = all_0_20_20
% 9.35/2.73 | (272) all_0_63_63 = e3 | all_0_64_64 = e3 | all_0_65_65 = e3 | all_0_66_66 = e3 | all_0_67_67 = e3 | all_0_68_68 = e3 | all_0_69_69 = e3
% 9.35/2.73 | (273) all_0_91_91 = e4 | all_0_92_92 = e4 | all_0_93_93 = e4 | all_0_94_94 = e4 | all_0_95_95 = e4 | all_0_96_96 = e4 | all_0_97_97 = e4
% 9.35/2.73 | (274) all_0_53_53 = e1 | all_0_60_60 = e1 | all_0_67_67 = e1 | all_0_74_74 = e1 | all_0_81_81 = e1 | all_0_88_88 = e1 | all_0_95_95 = e1
% 9.35/2.73 | (275) ~ (all_0_64_64 = all_0_66_66)
% 9.35/2.73 | (276) op(all_0_39_39, e2) = e1
% 9.35/2.73 | (277) all_0_49_49 = e2 | all_0_50_50 = e2 | all_0_51_51 = e2 | all_0_52_52 = e2 | all_0_53_53 = e2 | all_0_54_54 = e2 | all_0_55_55 = e2
% 9.35/2.73 | (278) ~ (all_0_80_80 = all_0_81_81)
% 9.35/2.73 | (279) op(all_0_76_76, e3) = all_0_45_45
% 9.35/2.73 | (280) all_0_75_75 = e6 | all_0_75_75 = e5 | all_0_75_75 = e4 | all_0_75_75 = e3 | all_0_75_75 = e2 | all_0_75_75 = e1 | all_0_75_75 = e0
% 9.35/2.73 | (281) all_0_54_54 = e6 | all_0_61_61 = e6 | all_0_68_68 = e6 | all_0_75_75 = e6 | all_0_82_82 = e6 | all_0_89_89 = e6 | all_0_96_96 = e6
% 9.35/2.73 | (282) op(e2, e2) = all_0_81_81
% 9.35/2.73 | (283) all_0_73_73 = e6 | all_0_73_73 = e5 | all_0_73_73 = e4 | all_0_73_73 = e3 | all_0_73_73 = e2 | all_0_73_73 = e1 | all_0_73_73 = e0
% 9.35/2.73 | (284) ~ (all_0_70_70 = all_0_91_91)
% 9.35/2.74 | (285) ~ (all_0_87_87 = all_0_88_88)
% 9.35/2.74 | (286) all_0_50_50 = e3 | all_0_57_57 = e3 | all_0_64_64 = e3 | all_0_71_71 = e3 | all_0_78_78 = e3 | all_0_85_85 = e3 | all_0_92_92 = e3
% 9.35/2.74 | (287) all_0_91_91 = e1 | all_0_92_92 = e1 | all_0_93_93 = e1 | all_0_94_94 = e1 | all_0_95_95 = e1 | all_0_96_96 = e1 | all_0_97_97 = e1
% 9.35/2.74 | (288) ~ (all_0_50_50 = all_0_85_85)
% 9.35/2.74 | (289) ~ (all_0_52_52 = all_0_53_53)
% 9.35/2.74 | (290) all_0_53_53 = e2 | all_0_60_60 = e2 | all_0_67_67 = e2 | all_0_74_74 = e2 | all_0_81_81 = e2 | all_0_88_88 = e2 | all_0_95_95 = e2
% 9.35/2.74 | (291) all_0_91_91 = e6 | all_0_92_92 = e6 | all_0_93_93 = e6 | all_0_94_94 = e6 | all_0_95_95 = e6 | all_0_96_96 = e6 | all_0_97_97 = e6
% 9.35/2.74 | (292) all_0_49_49 = e0 | all_0_50_50 = e0 | all_0_51_51 = e0 | all_0_52_52 = e0 | all_0_53_53 = e0 | all_0_54_54 = e0 | all_0_55_55 = e0
% 9.35/2.74 | (293) ~ (all_0_78_78 = all_0_81_81)
% 9.35/2.74 | (294) all_0_91_91 = e3 | all_0_92_92 = e3 | all_0_93_93 = e3 | all_0_94_94 = e3 | all_0_95_95 = e3 | all_0_96_96 = e3 | all_0_97_97 = e3
% 9.35/2.74 | (295) ~ (all_0_62_62 = all_0_90_90)
% 9.35/2.74 | (296) op(all_0_84_84, e1) = all_0_5_5
% 9.35/2.74 | (297) ~ (all_0_59_59 = all_0_60_60)
% 9.35/2.74 | (298) op(all_0_41_41, e0) = e1
% 9.35/2.74 | (299) all_0_56_56 = e1 | all_0_57_57 = e1 | all_0_58_58 = e1 | all_0_59_59 = e1 | all_0_60_60 = e1 | all_0_61_61 = e1 | all_0_62_62 = e1
% 9.35/2.74 | (300) op(all_0_70_70, e3) = all_0_3_3
% 9.35/2.74 | (301) ~ (all_0_85_85 = all_0_92_92)
% 9.35/2.74 | (302) ~ (all_0_64_64 = all_0_68_68)
% 9.35/2.74 | (303) ~ (all_0_64_64 = all_0_71_71)
% 9.35/2.74 | (304) op(all_0_75_75, e3) = all_0_38_38
% 9.35/2.74 | (305) ~ (e6 = e0)
% 9.35/2.74 | (306) ~ (all_0_77_77 = all_0_82_82)
% 9.35/2.74 | (307) ~ (all_0_60_60 = all_0_74_74)
% 9.35/2.74 | (308) all_0_90_90 = e6 | all_0_90_90 = e5 | all_0_90_90 = e4 | all_0_90_90 = e3 | all_0_90_90 = e2 | all_0_90_90 = e1 | all_0_90_90 = e0
% 9.35/2.74 | (309) op(all_0_58_58, e5) = all_0_15_15
% 9.35/2.74 | (310) op(all_0_91_91, e0) = all_0_6_6
% 9.35/2.74 | (311) all_0_77_77 = e5 | all_0_78_78 = e5 | all_0_79_79 = e5 | all_0_80_80 = e5 | all_0_81_81 = e5 | all_0_82_82 = e5 | all_0_83_83 = e5
% 9.35/2.74 | (312) ~ (all_0_93_93 = all_0_95_95)
% 9.35/2.74 | (313) all_0_66_66 = e6 | all_0_66_66 = e5 | all_0_66_66 = e4 | all_0_66_66 = e3 | all_0_66_66 = e2 | all_0_66_66 = e1 | all_0_66_66 = e0
% 9.35/2.74 | (314) ~ (all_0_74_74 = all_0_81_81)
% 9.35/2.74 | (315) op(all_0_68_68, e4) = all_0_37_37
% 9.35/2.74 | (316) op(all_0_94_94, e0) = all_0_27_27
% 9.35/2.74 | (317) ~ (all_0_60_60 = all_0_88_88)
% 9.35/2.74 | (318) op(all_0_37_37, e4) = e1
% 9.35/2.74 | (319) ~ (all_0_50_50 = all_0_57_57)
% 9.35/2.74 | (320) ~ (all_0_86_86 = all_0_88_88)
% 9.35/2.74 | (321) ~ (all_0_80_80 = all_0_82_82)
% 9.35/2.74 | (322) ~ (all_0_73_73 = all_0_75_75)
% 9.35/2.74 | (323) all_0_77_77 = e6 | all_0_78_78 = e6 | all_0_79_79 = e6 | all_0_80_80 = e6 | all_0_81_81 = e6 | all_0_82_82 = e6 | all_0_83_83 = e6
% 9.35/2.74 | (324) all_0_86_86 = e6 | all_0_86_86 = e5 | all_0_86_86 = e4 | all_0_86_86 = e3 | all_0_86_86 = e2 | all_0_86_86 = e1 | all_0_86_86 = e0
% 9.35/2.74 | (325) ~ (all_0_87_87 = all_0_90_90)
% 9.35/2.74 | (326) ~ (all_0_81_81 = all_0_95_95)
% 9.35/2.74 | (327) ~ (all_0_71_71 = all_0_92_92)
% 9.35/2.74 | (328) op(all_0_57_57, e5) = all_0_8_8
% 9.35/2.74 | (329) all_0_49_49 = e2 | all_0_56_56 = e2 | all_0_63_63 = e2 | all_0_70_70 = e2 | all_0_77_77 = e2 | all_0_84_84 = e2 | all_0_91_91 = e2
% 9.35/2.74 | (330) ~ (all_0_92_92 = all_0_96_96)
% 9.35/2.74 | (331) ~ (all_0_57_57 = all_0_62_62)
% 9.35/2.74 | (332) op(all_0_23_23, e4) = e3
% 9.35/2.74 | (333) ~ (all_0_52_52 = all_0_54_54)
% 9.35/2.74 | (334) ~ (all_0_83_83 = all_0_90_90)
% 9.35/2.74 | (335) all_0_55_55 = e2 | all_0_62_62 = e2 | all_0_69_69 = e2 | all_0_76_76 = e2 | all_0_83_83 = e2 | all_0_90_90 = e2 | all_0_97_97 = e2
% 9.35/2.74 | (336) op(all_0_8_8, e5) = e5
% 9.35/2.74 | (337) all_0_52_52 = e0 | all_0_59_59 = e0 | all_0_66_66 = e0 | all_0_73_73 = e0 | all_0_80_80 = e0 | all_0_87_87 = e0 | all_0_94_94 = e0
% 9.35/2.74 | (338) ~ (all_0_86_86 = all_0_93_93)
% 9.35/2.74 | (339) ~ (all_0_76_76 = all_0_83_83)
% 9.35/2.74 | (340) all_0_50_50 = e5 | all_0_57_57 = e5 | all_0_64_64 = e5 | all_0_71_71 = e5 | all_0_78_78 = e5 | all_0_85_85 = e5 | all_0_92_92 = e5
% 9.35/2.74 | (341) all_0_49_49 = e6 | all_0_56_56 = e6 | all_0_63_63 = e6 | all_0_70_70 = e6 | all_0_77_77 = e6 | all_0_84_84 = e6 | all_0_91_91 = e6
% 9.35/2.74 | (342) op(e3, e2) = all_0_74_74
% 9.35/2.74 | (343) op(e0, e0) = all_0_97_97
% 9.35/2.74 | (344) ~ (all_0_60_60 = all_0_81_81)
% 9.35/2.74 | (345) ~ (all_0_58_58 = all_0_65_65)
% 9.35/2.74 | (346) ~ (e1 = e0)
% 9.35/2.74 | (347) ~ (all_0_82_82 = all_0_96_96)
% 9.35/2.74 | (348) all_0_55_55 = e6 | all_0_62_62 = e6 | all_0_69_69 = e6 | all_0_76_76 = e6 | all_0_83_83 = e6 | all_0_90_90 = e6 | all_0_97_97 = e6
% 9.35/2.74 | (349) ~ (e3 = e1)
% 9.35/2.74 | (350) all_0_84_84 = e2 | all_0_85_85 = e2 | all_0_86_86 = e2 | all_0_87_87 = e2 | all_0_88_88 = e2 | all_0_89_89 = e2 | all_0_90_90 = e2
% 9.35/2.74 | (351) ~ (all_0_56_56 = all_0_62_62)
% 9.35/2.74 | (352) all_0_63_63 = e2 | all_0_64_64 = e2 | all_0_65_65 = e2 | all_0_66_66 = e2 | all_0_67_67 = e2 | all_0_68_68 = e2 | all_0_69_69 = e2
% 9.35/2.74 | (353) op(all_0_88_88, e1) = all_0_33_33
% 9.35/2.74 | (354) op(all_0_83_83, e2) = all_0_46_46
% 9.35/2.74 | (355) ~ (all_0_49_49 = all_0_51_51)
% 9.35/2.74 | (356) ~ (e2 = e1)
% 9.35/2.74 | (357) op(all_0_5_5, e1) = e6
% 9.35/2.74 | (358) ~ (all_0_58_58 = all_0_79_79)
% 9.35/2.74 | (359) all_0_51_51 = e3 | all_0_58_58 = e3 | all_0_65_65 = e3 | all_0_72_72 = e3 | all_0_79_79 = e3 | all_0_86_86 = e3 | all_0_93_93 = e3
% 9.35/2.74 | (360) ~ (all_0_74_74 = all_0_95_95)
% 9.35/2.74 | (361) all_0_50_50 = e4 | all_0_57_57 = e4 | all_0_64_64 = e4 | all_0_71_71 = e4 | all_0_78_78 = e4 | all_0_85_85 = e4 | all_0_92_92 = e4
% 9.35/2.74 | (362) all_0_52_52 = e6 | all_0_59_59 = e6 | all_0_66_66 = e6 | all_0_73_73 = e6 | all_0_80_80 = e6 | all_0_87_87 = e6 | all_0_94_94 = e6
% 9.35/2.74 | (363) op(e0, e2) = all_0_95_95
% 9.35/2.74 | (364) all_0_61_61 = e6 | all_0_61_61 = e5 | all_0_61_61 = e4 | all_0_61_61 = e3 | all_0_61_61 = e2 | all_0_61_61 = e1 | all_0_61_61 = e0
% 9.35/2.74 | (365) ~ (all_0_50_50 = all_0_53_53)
% 9.35/2.74 | (366) ~ (all_0_56_56 = all_0_91_91)
% 9.35/2.74 | (367) ~ (all_0_71_71 = all_0_85_85)
% 9.35/2.74 | (368) ~ (all_0_62_62 = all_0_97_97)
% 9.35/2.74 | (369) all_0_50_50 = e1 | all_0_57_57 = e1 | all_0_64_64 = e1 | all_0_71_71 = e1 | all_0_78_78 = e1 | all_0_85_85 = e1 | all_0_92_92 = e1
% 9.35/2.74 | (370) op(all_0_11_11, e2) = e5
% 9.35/2.74 | (371) all_0_51_51 = e6 | all_0_58_58 = e6 | all_0_65_65 = e6 | all_0_72_72 = e6 | all_0_79_79 = e6 | all_0_86_86 = e6 | all_0_93_93 = e6
% 9.35/2.74 | (372) op(all_0_56_56, e5) = all_0_1_1
% 9.35/2.74 | (373) ~ (e6 = e5)
% 9.35/2.74 | (374) op(all_0_10_10, e3) = e5
% 9.35/2.74 | (375) ~ (all_0_90_90 = all_0_97_97)
% 9.35/2.74 | (376) op(all_0_80_80, e2) = all_0_25_25
% 9.35/2.74 | (377) op(e5, e4) = all_0_58_58
% 9.35/2.74 | (378) op(e5, e3) = all_0_59_59
% 9.35/2.74 | (379) ~ (all_0_77_77 = all_0_80_80)
% 9.35/2.74 | (380) ~ (all_0_66_66 = all_0_80_80)
% 9.35/2.74 | (381) ~ (all_0_67_67 = all_0_95_95)
% 9.35/2.74 | (382) op(all_0_51_51, e6) = all_0_14_14
% 9.35/2.74 | (383) ~ (all_0_77_77 = all_0_83_83)
% 9.35/2.74 | (384) op(all_0_52_52, e6) = all_0_21_21
% 9.35/2.74 | (385) ~ (all_0_94_94 = all_0_95_95)
% 9.35/2.74 | (386) op(all_0_38_38, e3) = e1
% 9.35/2.74 | (387) op(all_0_59_59, e5) = all_0_22_22
% 9.35/2.74 | (388) ~ (all_0_59_59 = all_0_94_94)
% 9.35/2.74 | (389) ~ (e5 = e2)
% 9.35/2.74 | (390) all_0_63_63 = e5 | all_0_64_64 = e5 | all_0_65_65 = e5 | all_0_66_66 = e5 | all_0_67_67 = e5 | all_0_68_68 = e5 | all_0_69_69 = e5
% 9.35/2.74 | (391) all_0_70_70 = e3 | all_0_71_71 = e3 | all_0_72_72 = e3 | all_0_73_73 = e3 | all_0_74_74 = e3 | all_0_75_75 = e3 | all_0_76_76 = e3
% 9.35/2.74 | (392) op(e6, e2) = all_0_53_53
% 9.35/2.74 | (393) all_0_53_53 = e6 | all_0_60_60 = e6 | all_0_67_67 = e6 | all_0_74_74 = e6 | all_0_81_81 = e6 | all_0_88_88 = e6 | all_0_95_95 = e6
% 9.35/2.74 | (394) ~ (all_0_69_69 = all_0_76_76)
% 9.35/2.74 | (395) ~ (all_0_56_56 = all_0_70_70)
% 9.35/2.74 | (396) ~ (all_0_65_65 = all_0_93_93)
% 9.35/2.74 | (397) ~ (all_0_79_79 = all_0_82_82)
% 9.35/2.74 | (398) ~ (all_0_51_51 = all_0_93_93)
% 9.35/2.74 | (399) all_0_50_50 = e6 | all_0_57_57 = e6 | all_0_64_64 = e6 | all_0_71_71 = e6 | all_0_78_78 = e6 | all_0_85_85 = e6 | all_0_92_92 = e6
% 9.35/2.74 | (400) ~ (all_0_92_92 = all_0_93_93)
% 9.35/2.74 | (401) ~ (all_0_54_54 = all_0_68_68)
% 9.35/2.74 | (402) op(all_0_3_3, e3) = e6
% 9.35/2.74 | (403) all_0_70_70 = e1 | all_0_71_71 = e1 | all_0_72_72 = e1 | all_0_73_73 = e1 | all_0_74_74 = e1 | all_0_75_75 = e1 | all_0_76_76 = e1
% 9.35/2.75 | (404) ~ (all_0_64_64 = all_0_85_85)
% 9.35/2.75 | (405) all_0_55_55 = e4 | all_0_62_62 = e4 | all_0_69_69 = e4 | all_0_76_76 = e4 | all_0_83_83 = e4 | all_0_90_90 = e4 | all_0_97_97 = e4
% 9.35/2.75 | (406) all_0_54_54 = e2 | all_0_61_61 = e2 | all_0_68_68 = e2 | all_0_75_75 = e2 | all_0_82_82 = e2 | all_0_89_89 = e2 | all_0_96_96 = e2
% 9.35/2.75 | (407) op(all_0_72_72, e3) = all_0_17_17
% 9.35/2.75 | (408) all_0_49_49 = e1 | all_0_56_56 = e1 | all_0_63_63 = e1 | all_0_70_70 = e1 | all_0_77_77 = e1 | all_0_84_84 = e1 | all_0_91_91 = e1
% 9.35/2.75 | (409) ~ (all_0_55_55 = all_0_90_90)
% 9.35/2.75 | (410) ~ (e6 = e1)
% 9.35/2.75 | (411) all_0_49_49 = e4 | all_0_50_50 = e4 | all_0_51_51 = e4 | all_0_52_52 = e4 | all_0_53_53 = e4 | all_0_54_54 = e4 | all_0_55_55 = e4
% 9.35/2.75 | (412) ~ (all_0_70_70 = all_0_73_73)
% 9.35/2.75 | (413) op(all_0_30_30, e4) = e2
% 9.35/2.75 | (414) all_0_51_51 = e0 | all_0_58_58 = e0 | all_0_65_65 = e0 | all_0_72_72 = e0 | all_0_79_79 = e0 | all_0_86_86 = e0 | all_0_93_93 = e0
% 9.35/2.75 | (415) all_0_84_84 = e0 | all_0_85_85 = e0 | all_0_86_86 = e0 | all_0_87_87 = e0 | all_0_88_88 = e0 | all_0_89_89 = e0 | all_0_90_90 = e0
% 9.35/2.75 | (416) op(all_0_45_45, e3) = e0
% 9.35/2.75 | (417) ~ (all_0_70_70 = all_0_75_75)
% 9.35/2.75 | (418) all_0_53_53 = e6 | all_0_53_53 = e5 | all_0_53_53 = e4 | all_0_53_53 = e3 | all_0_53_53 = e2 | all_0_53_53 = e1 | all_0_53_53 = e0
% 9.35/2.75 | (419) ~ (all_0_59_59 = all_0_62_62)
% 9.35/2.75 | (420) ~ (all_0_56_56 = all_0_63_63)
% 9.35/2.75 | (421) ~ (all_0_84_84 = all_0_89_89)
% 9.35/2.75 | (422) all_0_84_84 = e4 | all_0_85_85 = e4 | all_0_86_86 = e4 | all_0_87_87 = e4 | all_0_88_88 = e4 | all_0_89_89 = e4 | all_0_90_90 = e4
% 9.35/2.75 | (423) op(all_0_0_0, e6) = e6
% 9.35/2.75 | (424) ~ (all_0_60_60 = all_0_61_61)
% 9.35/2.75 | (425) ~ (all_0_77_77 = all_0_79_79)
% 9.35/2.75 | (426) ~ (all_0_93_93 = all_0_96_96)
% 9.35/2.75 | (427) ~ (all_0_52_52 = all_0_55_55)
% 9.35/2.75 | (428) all_0_54_54 = e6 | all_0_54_54 = e5 | all_0_54_54 = e4 | all_0_54_54 = e3 | all_0_54_54 = e2 | all_0_54_54 = e1 | all_0_54_54 = e0
% 9.35/2.75 | (429) all_0_76_76 = e6 | all_0_76_76 = e5 | all_0_76_76 = e4 | all_0_76_76 = e3 | all_0_76_76 = e2 | all_0_76_76 = e1 | all_0_76_76 = e0
% 9.35/2.75 | (430) ~ (all_0_83_83 = all_0_97_97)
% 9.35/2.75 | (431) all_0_55_55 = e0 | all_0_62_62 = e0 | all_0_69_69 = e0 | all_0_76_76 = e0 | all_0_83_83 = e0 | all_0_90_90 = e0 | all_0_97_97 = e0
% 9.35/2.75 | (432) ~ (all_0_85_85 = all_0_86_86)
% 9.35/2.75 | (433) ~ (e5 = e4)
% 9.35/2.75 | (434) op(e1, e0) = all_0_90_90
% 9.77/2.75 | (435) op(all_0_96_96, e0) = all_0_41_41
% 9.77/2.75 | (436) all_0_89_89 = e6 | all_0_89_89 = e5 | all_0_89_89 = e4 | all_0_89_89 = e3 | all_0_89_89 = e2 | all_0_89_89 = e1 | all_0_89_89 = e0
% 9.77/2.75 | (437) ~ (all_0_73_73 = all_0_74_74)
% 9.77/2.75 | (438) ~ (all_0_58_58 = all_0_61_61)
% 9.77/2.75 | (439) ~ (all_0_68_68 = all_0_96_96)
% 9.77/2.75 | (440) op(all_0_20_20, e0) = e4
% 9.77/2.75 | (441) ~ (all_0_63_63 = all_0_68_68)
% 9.77/2.75 | (442) ~ (all_0_57_57 = all_0_59_59)
% 9.77/2.75 | (443) ~ (all_0_60_60 = all_0_67_67)
% 9.77/2.75 | (444) all_0_49_49 = e5 | all_0_50_50 = e5 | all_0_51_51 = e5 | all_0_52_52 = e5 | all_0_53_53 = e5 | all_0_54_54 = e5 | all_0_55_55 = e5
% 9.77/2.75 | (445) ~ (all_0_63_63 = all_0_66_66)
% 9.77/2.75 | (446) ~ (all_0_73_73 = all_0_80_80)
% 9.77/2.75 | (447) op(all_0_32_32, e2) = e2
% 9.77/2.75 | (448) all_0_52_52 = e5 | all_0_59_59 = e5 | all_0_66_66 = e5 | all_0_73_73 = e5 | all_0_80_80 = e5 | all_0_87_87 = e5 | all_0_94_94 = e5
% 9.77/2.75 | (449) ~ (all_0_60_60 = all_0_62_62)
% 9.77/2.75 | (450) ~ (all_0_85_85 = all_0_90_90)
% 9.77/2.75 | (451) ~ (all_0_74_74 = all_0_88_88)
% 9.77/2.75 | (452) ~ (all_0_70_70 = all_0_74_74)
% 9.77/2.75 | (453) ~ (all_0_72_72 = all_0_76_76)
% 9.77/2.75 | (454) op(all_0_86_86, e1) = all_0_19_19
% 9.77/2.75 | (455) ~ (all_0_69_69 = all_0_90_90)
% 9.77/2.75 | (456) op(e3, e1) = all_0_75_75
% 9.77/2.75 | (457) ~ (all_0_74_74 = all_0_76_76)
% 9.77/2.75 | (458) ~ (all_0_85_85 = all_0_88_88)
% 9.77/2.75 | (459) op(e0, e4) = all_0_93_93
% 9.77/2.75 | (460) ~ (all_0_77_77 = all_0_78_78)
% 9.77/2.75 | (461) op(all_0_44_44, e4) = e0
% 9.77/2.75 | (462) ~ (all_0_72_72 = all_0_73_73)
% 9.77/2.75 | (463) all_0_55_55 = e6 | all_0_55_55 = e5 | all_0_55_55 = e4 | all_0_55_55 = e3 | all_0_55_55 = e2 | all_0_55_55 = e1 | all_0_55_55 = e0
% 9.77/2.75 | (464) all_0_49_49 = e3 | all_0_56_56 = e3 | all_0_63_63 = e3 | all_0_70_70 = e3 | all_0_77_77 = e3 | all_0_84_84 = e3 | all_0_91_91 = e3
% 9.77/2.75 | (465) all_0_51_51 = e6 | all_0_51_51 = e5 | all_0_51_51 = e4 | all_0_51_51 = e3 | all_0_51_51 = e2 | all_0_51_51 = e1 | all_0_51_51 = e0
% 9.77/2.75 | (466) op(e5, e6) = all_0_56_56
% 9.77/2.75 | (467) ~ (all_0_59_59 = all_0_80_80)
% 9.77/2.75 | (468) all_0_84_84 = e1 | all_0_85_85 = e1 | all_0_86_86 = e1 | all_0_87_87 = e1 | all_0_88_88 = e1 | all_0_89_89 = e1 | all_0_90_90 = e1
% 9.77/2.75 | (469) ~ (all_0_89_89 = all_0_90_90)
% 9.77/2.75 | (470) (all_0_49_49 = e6 & all_0_57_57 = e5 & all_0_65_65 = e4 & all_0_73_73 = e3 & all_0_81_81 = e2 & all_0_89_89 = e1 & all_0_97_97 = e0) | ( ~ (all_0_49_49 = e6) & ~ (all_0_57_57 = e5) & ~ (all_0_65_65 = e4) & ~ (all_0_73_73 = e3) & ~ (all_0_81_81 = e2) & ~ (all_0_89_89 = e1) & ~ (all_0_97_97 = e0))
% 9.77/2.75 | (471) op(all_0_46_46, e2) = e0
% 9.77/2.75 | (472) all_0_69_69 = e6 | all_0_69_69 = e5 | all_0_69_69 = e4 | all_0_69_69 = e3 | all_0_69_69 = e2 | all_0_69_69 = e1 | all_0_69_69 = e0
% 9.77/2.75 | (473) all_0_91_91 = e2 | all_0_92_92 = e2 | all_0_93_93 = e2 | all_0_94_94 = e2 | all_0_95_95 = e2 | all_0_96_96 = e2 | all_0_97_97 = e2
% 9.77/2.75 | (474) all_0_53_53 = e3 | all_0_60_60 = e3 | all_0_67_67 = e3 | all_0_74_74 = e3 | all_0_81_81 = e3 | all_0_88_88 = e3 | all_0_95_95 = e3
% 9.77/2.75 | (475) op(all_0_87_87, e1) = all_0_26_26
% 9.77/2.75 | (476) all_0_54_54 = e3 | all_0_61_61 = e3 | all_0_68_68 = e3 | all_0_75_75 = e3 | all_0_82_82 = e3 | all_0_89_89 = e3 | all_0_96_96 = e3
% 9.77/2.75 | (477) ~ (all_0_51_51 = all_0_86_86)
% 9.77/2.75 | (478) ~ (all_0_76_76 = all_0_90_90)
% 9.77/2.75 | (479) all_0_49_49 = e6 | all_0_49_49 = e5 | all_0_49_49 = e4 | all_0_49_49 = e3 | all_0_49_49 = e2 | all_0_49_49 = e1 | all_0_49_49 = e0
% 9.77/2.75 | (480) ~ (e5 = e3)
% 9.77/2.75 | (481) ~ (all_0_74_74 = all_0_75_75)
% 9.77/2.75 | (482) op(all_0_77_77, e2) = all_0_4_4
% 9.77/2.75 | (483) ~ (e6 = e3)
% 9.77/2.75 | (484) op(all_0_1_1, e5) = e6
% 9.77/2.75 | (485) ~ (all_0_78_78 = all_0_85_85)
% 9.77/2.75 | (486) op(all_0_25_25, e2) = e3
% 9.77/2.75 | (487) op(all_0_61_61, e5) = all_0_36_36
% 9.77/2.75 | (488) ~ (all_0_57_57 = all_0_92_92)
% 9.77/2.75 | (489) op(e4, e0) = all_0_69_69
% 9.77/2.75 | (490) ~ (all_0_65_65 = all_0_67_67)
% 9.77/2.75 | (491) ~ (all_0_87_87 = all_0_94_94)
% 9.77/2.75 | (492) all_0_65_65 = e6 | all_0_65_65 = e5 | all_0_65_65 = e4 | all_0_65_65 = e3 | all_0_65_65 = e2 | all_0_65_65 = e1 | all_0_65_65 = e0
% 9.77/2.75 | (493) op(e6, e0) = all_0_55_55
% 9.77/2.75 | (494) ~ (all_0_56_56 = all_0_59_59)
% 9.77/2.75 | (495) op(all_0_79_79, e2) = all_0_18_18
% 9.77/2.75 | (496) op(all_0_7_7, e6) = e5
% 9.77/2.75 | (497) op(e0, e5) = all_0_92_92
% 9.77/2.75 | (498) all_0_55_55 = e1 | all_0_62_62 = e1 | all_0_69_69 = e1 | all_0_76_76 = e1 | all_0_83_83 = e1 | all_0_90_90 = e1 | all_0_97_97 = e1
% 9.77/2.75 | (499) op(all_0_50_50, e6) = all_0_7_7
% 9.77/2.75 | (500) ~ (all_0_53_53 = all_0_67_67)
% 9.77/2.75 | (501) ~ (all_0_56_56 = all_0_60_60)
% 9.77/2.75 | (502) all_0_58_58 = e6 | all_0_58_58 = e5 | all_0_58_58 = e4 | all_0_58_58 = e3 | all_0_58_58 = e2 | all_0_58_58 = e1 | all_0_58_58 = e0
% 9.77/2.75 | (503) ~ (all_0_86_86 = all_0_90_90)
% 9.77/2.75 | (504) op(all_0_31_31, e3) = e2
% 9.77/2.75 | (505) op(e2, e4) = all_0_79_79
% 9.77/2.75 | (506) ~ (all_0_66_66 = all_0_94_94)
% 9.77/2.75 | (507) op(e4, e5) = all_0_64_64
% 9.77/2.75 | (508) op(all_0_29_29, e5) = e2
% 9.77/2.75 | (509) ~ (all_0_63_63 = all_0_77_77)
% 9.77/2.75 | (510) op(all_0_6_6, e0) = e6
% 9.77/2.75 | (511) op(all_0_43_43, e5) = e0
% 9.77/2.75 | (512) ~ (e6 = e2)
% 9.77/2.76 | (513) all_0_52_52 = e4 | all_0_59_59 = e4 | all_0_66_66 = e4 | all_0_73_73 = e4 | all_0_80_80 = e4 | all_0_87_87 = e4 | all_0_94_94 = e4
% 9.77/2.76 | (514) ~ (all_0_52_52 = all_0_80_80)
% 9.77/2.76 | (515) all_0_54_54 = e5 | all_0_61_61 = e5 | all_0_68_68 = e5 | all_0_75_75 = e5 | all_0_82_82 = e5 | all_0_89_89 = e5 | all_0_96_96 = e5
% 9.77/2.76 | (516) ~ (all_0_52_52 = all_0_87_87)
% 9.77/2.76 | (517) ~ (all_0_67_67 = all_0_81_81)
% 9.77/2.76 | (518) ~ (all_0_63_63 = all_0_69_69)
% 9.77/2.76 | (519) ~ (all_0_66_66 = all_0_67_67)
% 9.77/2.76 | (520) ~ (all_0_84_84 = all_0_87_87)
% 9.77/2.76 | (521) ~ (all_0_49_49 = all_0_84_84)
% 9.77/2.76 | (522) all_0_53_53 = e0 | all_0_60_60 = e0 | all_0_67_67 = e0 | all_0_74_74 = e0 | all_0_81_81 = e0 | all_0_88_88 = e0 | all_0_95_95 = e0
% 9.77/2.76 | (523) op(e4, e2) = all_0_67_67
% 9.77/2.76 | (524) ~ (all_0_58_58 = all_0_93_93)
% 9.77/2.76 | (525) op(e2, e5) = all_0_78_78
% 9.77/2.76 | (526) op(all_0_69_69, e4) = all_0_44_44
% 9.77/2.76 | (527) ~ (all_0_79_79 = all_0_93_93)
% 9.77/2.76 | (528) ~ (all_0_49_49 = all_0_70_70)
% 9.77/2.76 | (529) op(all_0_9_9, e4) = e5
% 9.77/2.76 | (530) ~ (all_0_61_61 = all_0_75_75)
% 9.77/2.76 | (531) op(e2, e1) = all_0_82_82
% 9.77/2.76 | (532) ~ (all_0_78_78 = all_0_80_80)
% 9.77/2.76 | (533) op(all_0_16_16, e4) = e4
% 9.77/2.76 | (534) op(all_0_35_35, e6) = e1
% 9.77/2.76 | (535) ~ (all_0_76_76 = all_0_97_97)
% 9.77/2.76 | (536) ~ (e3 = e2)
% 9.77/2.76 | (537) all_0_63_63 = e4 | all_0_64_64 = e4 | all_0_65_65 = e4 | all_0_66_66 = e4 | all_0_67_67 = e4 | all_0_68_68 = e4 | all_0_69_69 = e4
% 9.77/2.76 | (538) ~ (all_0_56_56 = all_0_84_84)
% 9.77/2.76 | (539) all_0_77_77 = e6 | all_0_77_77 = e5 | all_0_77_77 = e4 | all_0_77_77 = e3 | all_0_77_77 = e2 | all_0_77_77 = e1 | all_0_77_77 = e0
% 9.77/2.76 | (540) ~ (all_0_61_61 = all_0_89_89)
% 9.77/2.76 | (541) op(e4, e1) = all_0_68_68
% 9.77/2.76 | (542) ~ (all_0_59_59 = all_0_66_66)
% 9.77/2.76 | (543) all_0_54_54 = e4 | all_0_61_61 = e4 | all_0_68_68 = e4 | all_0_75_75 = e4 | all_0_82_82 = e4 | all_0_89_89 = e4 | all_0_96_96 = e4
% 9.77/2.76 | (544) ~ (all_0_49_49 = all_0_91_91)
% 9.77/2.76 | (545) all_0_56_56 = e3 | all_0_57_57 = e3 | all_0_58_58 = e3 | all_0_59_59 = e3 | all_0_60_60 = e3 | all_0_61_61 = e3 | all_0_62_62 = e3
% 9.77/2.76 | (546) ~ (all_0_72_72 = all_0_74_74)
% 9.77/2.76 | (547) all_0_72_72 = e6 | all_0_72_72 = e5 | all_0_72_72 = e4 | all_0_72_72 = e3 | all_0_72_72 = e2 | all_0_72_72 = e1 | all_0_72_72 = e0
% 9.77/2.76 | (548) all_0_50_50 = e6 | all_0_50_50 = e5 | all_0_50_50 = e4 | all_0_50_50 = e3 | all_0_50_50 = e2 | all_0_50_50 = e1 | all_0_50_50 = e0
% 9.77/2.76 | (549) op(e5, e2) = all_0_60_60
% 9.77/2.76 | (550) op(all_0_65_65, e4) = all_0_16_16
% 9.77/2.76 | (551) ~ (all_0_56_56 = all_0_77_77)
% 9.77/2.76 | (552) ~ (all_0_53_53 = all_0_88_88)
% 9.77/2.76 | (553) ~ (all_0_51_51 = all_0_55_55)
% 9.77/2.76 | (554) op(all_0_97_97, e0) = all_0_48_48
% 9.77/2.76 | (555) ~ (all_0_64_64 = all_0_65_65)
% 9.77/2.76 | (556) ~ (all_0_77_77 = all_0_91_91)
% 9.77/2.76 | (557) op(e0, e3) = all_0_94_94
% 9.77/2.76 | (558) all_0_68_68 = e6 | all_0_68_68 = e5 | all_0_68_68 = e4 | all_0_68_68 = e3 | all_0_68_68 = e2 | all_0_68_68 = e1 | all_0_68_68 = e0
% 9.77/2.76 | (559) ~ (all_0_49_49 = all_0_77_77)
% 9.77/2.76 | (560) all_0_56_56 = e5 | all_0_57_57 = e5 | all_0_58_58 = e5 | all_0_59_59 = e5 | all_0_60_60 = e5 | all_0_61_61 = e5 | all_0_62_62 = e5
% 9.77/2.76 | (561) ~ (e4 = e2)
% 9.77/2.76 | (562) ~ (all_0_69_69 = all_0_97_97)
% 9.77/2.76 | (563) ~ (all_0_50_50 = all_0_52_52)
% 9.77/2.76 | (564) ~ (all_0_49_49 = all_0_63_63)
% 9.77/2.76 | (565) ~ (all_0_49_49 = e6) | ~ (all_0_57_57 = e5) | ~ (all_0_65_65 = e4) | ~ (all_0_73_73 = e3) | ~ (all_0_81_81 = e2) | ~ (all_0_89_89 = e1) | ~ (all_0_97_97 = e0)
% 9.77/2.76 | (566) all_0_70_70 = e2 | all_0_71_71 = e2 | all_0_72_72 = e2 | all_0_73_73 = e2 | all_0_74_74 = e2 | all_0_75_75 = e2 | all_0_76_76 = e2
% 9.77/2.76 | (567) all_0_77_77 = e4 | all_0_78_78 = e4 | all_0_79_79 = e4 | all_0_80_80 = e4 | all_0_81_81 = e4 | all_0_82_82 = e4 | all_0_83_83 = e4
% 9.77/2.76 | (568) all_0_49_49 = e4 | all_0_56_56 = e4 | all_0_63_63 = e4 | all_0_70_70 = e4 | all_0_77_77 = e4 | all_0_84_84 = e4 | all_0_91_91 = e4
% 9.77/2.76 | (569) ~ (all_0_78_78 = all_0_92_92)
% 9.77/2.76 | (570) ~ (all_0_89_89 = all_0_96_96)
% 9.77/2.76 | (571) ~ (all_0_72_72 = all_0_86_86)
% 9.77/2.76 | (572) all_0_91_91 = e0 | all_0_92_92 = e0 | all_0_93_93 = e0 | all_0_94_94 = e0 | all_0_95_95 = e0 | all_0_96_96 = e0 | all_0_97_97 = e0
% 9.77/2.76 | (573) op(e6, e1) = all_0_54_54
% 9.77/2.76 | (574) op(all_0_14_14, e6) = e4
% 9.77/2.76 | (575) op(e1, e2) = all_0_88_88
% 9.77/2.76 | (576) ~ (all_0_86_86 = all_0_87_87)
% 9.77/2.76 | (577) all_0_93_93 = e6 | all_0_93_93 = e5 | all_0_93_93 = e4 | all_0_93_93 = e3 | all_0_93_93 = e2 | all_0_93_93 = e1 | all_0_93_93 = e0
% 9.77/2.76 | (578) op(e5, e1) = all_0_61_61
% 9.77/2.76 | (579) ~ (all_0_50_50 = all_0_54_54)
% 9.77/2.76 | (580) ~ (all_0_91_91 = all_0_93_93)
% 9.77/2.76 | (581) all_0_94_94 = e6 | all_0_94_94 = e5 | all_0_94_94 = e4 | all_0_94_94 = e3 | all_0_94_94 = e2 | all_0_94_94 = e1 | all_0_94_94 = e0
% 9.77/2.76 | (582) ~ (all_0_65_65 = all_0_72_72)
% 9.77/2.76 | (583) ~ (all_0_79_79 = all_0_86_86)
% 9.77/2.76 | (584) ~ (all_0_91_91 = all_0_94_94)
% 9.77/2.76 | (585) ~ (all_0_53_53 = all_0_54_54)
% 9.77/2.76 | (586) ~ (all_0_84_84 = all_0_85_85)
% 9.77/2.76 | (587) ~ (all_0_55_55 = all_0_76_76)
% 9.77/2.76 | (588) ~ (all_0_54_54 = all_0_75_75)
% 9.77/2.76 | (589) op(e3, e3) = all_0_73_73
% 9.77/2.76 | (590) op(e3, e0) = all_0_76_76
% 9.77/2.76 | (591) all_0_54_54 = e0 | all_0_61_61 = e0 | all_0_68_68 = e0 | all_0_75_75 = e0 | all_0_82_82 = e0 | all_0_89_89 = e0 | all_0_96_96 = e0
% 9.77/2.76 | (592) ~ (all_0_71_71 = all_0_75_75)
% 9.77/2.76 | (593) ~ (all_0_65_65 = all_0_69_69)
% 9.77/2.76 | (594) op(all_0_17_17, e3) = e4
% 9.77/2.76 | (595) all_0_49_49 = e0 | all_0_56_56 = e0 | all_0_63_63 = e0 | all_0_70_70 = e0 | all_0_77_77 = e0 | all_0_84_84 = e0 | all_0_91_91 = e0
% 9.77/2.76 | (596) op(all_0_73_73, e3) = all_0_24_24
% 9.77/2.76 | (597) ~ (all_0_93_93 = all_0_97_97)
% 9.77/2.76 | (598) ~ (all_0_95_95 = all_0_96_96)
% 9.77/2.76 | (599) ~ (all_0_53_53 = all_0_74_74)
% 9.77/2.76 | (600) all_0_88_88 = e6 | all_0_88_88 = e5 | all_0_88_88 = e4 | all_0_88_88 = e3 | all_0_88_88 = e2 | all_0_88_88 = e1 | all_0_88_88 = e0
% 9.77/2.76 | (601) ~ (all_0_80_80 = all_0_87_87)
% 9.77/2.76 | (602) all_0_91_91 = e5 | all_0_92_92 = e5 | all_0_93_93 = e5 | all_0_94_94 = e5 | all_0_95_95 = e5 | all_0_96_96 = e5 | all_0_97_97 = e5
% 9.77/2.76 | (603) all_0_84_84 = e5 | all_0_85_85 = e5 | all_0_86_86 = e5 | all_0_87_87 = e5 | all_0_88_88 = e5 | all_0_89_89 = e5 | all_0_90_90 = e5
% 9.77/2.76 | (604) ~ (all_0_71_71 = all_0_72_72)
% 9.77/2.76 | (605) all_0_80_80 = e6 | all_0_80_80 = e5 | all_0_80_80 = e4 | all_0_80_80 = e3 | all_0_80_80 = e2 | all_0_80_80 = e1 | all_0_80_80 = e0
% 9.77/2.76 | (606) op(e0, e1) = all_0_96_96
% 9.77/2.76 | (607) ~ (all_0_50_50 = all_0_71_71)
% 9.77/2.76 | (608) all_0_53_53 = e5 | all_0_60_60 = e5 | all_0_67_67 = e5 | all_0_74_74 = e5 | all_0_81_81 = e5 | all_0_88_88 = e5 | all_0_95_95 = e5
% 9.77/2.76 | (609) ~ (all_0_63_63 = all_0_65_65)
% 9.77/2.76 | (610) ~ (e4 = e1)
% 9.77/2.76 | (611) op(all_0_26_26, e1) = e3
% 9.77/2.76 | (612) ~ (all_0_57_57 = all_0_64_64)
% 9.77/2.76 | (613) op(all_0_24_24, e3) = e3
% 9.77/2.76 | (614) ~ (all_0_61_61 = all_0_62_62)
% 9.77/2.76 |
% 9.77/2.76 +-Applying beta-rule and splitting (470), into two cases.
% 9.77/2.76 |-Branch one:
% 9.77/2.76 | (615) all_0_49_49 = e6 & all_0_57_57 = e5 & all_0_65_65 = e4 & all_0_73_73 = e3 & all_0_81_81 = e2 & all_0_89_89 = e1 & all_0_97_97 = e0
% 9.77/2.76 |
% 9.77/2.76 | Applying alpha-rule on (615) yields:
% 9.77/2.76 | (616) all_0_89_89 = e1
% 9.77/2.76 | (617) all_0_49_49 = e6
% 9.77/2.76 | (618) all_0_81_81 = e2
% 9.77/2.76 | (619) all_0_65_65 = e4
% 9.77/2.76 | (620) all_0_57_57 = e5
% 9.77/2.76 | (621) all_0_97_97 = e0
% 9.77/2.77 | (622) all_0_73_73 = e3
% 9.77/2.77 |
% 9.77/2.77 +-Applying beta-rule and splitting (565), into two cases.
% 9.77/2.77 |-Branch one:
% 9.77/2.77 | (623) ~ (all_0_49_49 = e6)
% 9.77/2.77 |
% 9.77/2.77 | Equations (617) can reduce 623 to:
% 9.77/2.77 | (624) $false
% 9.77/2.77 |
% 9.77/2.77 |-The branch is then unsatisfiable
% 9.77/2.77 |-Branch two:
% 9.77/2.77 | (617) all_0_49_49 = e6
% 9.77/2.77 | (626) ~ (all_0_57_57 = e5) | ~ (all_0_65_65 = e4) | ~ (all_0_73_73 = e3) | ~ (all_0_81_81 = e2) | ~ (all_0_89_89 = e1) | ~ (all_0_97_97 = e0)
% 9.77/2.77 |
% 9.77/2.77 +-Applying beta-rule and splitting (626), into two cases.
% 9.77/2.77 |-Branch one:
% 9.77/2.77 | (627) ~ (all_0_57_57 = e5)
% 9.77/2.77 |
% 9.77/2.77 | Equations (620) can reduce 627 to:
% 9.77/2.77 | (624) $false
% 9.77/2.77 |
% 9.77/2.77 |-The branch is then unsatisfiable
% 9.77/2.77 |-Branch two:
% 9.77/2.77 | (620) all_0_57_57 = e5
% 9.77/2.77 | (630) ~ (all_0_65_65 = e4) | ~ (all_0_73_73 = e3) | ~ (all_0_81_81 = e2) | ~ (all_0_89_89 = e1) | ~ (all_0_97_97 = e0)
% 9.77/2.77 |
% 9.77/2.77 +-Applying beta-rule and splitting (630), into two cases.
% 9.77/2.77 |-Branch one:
% 9.77/2.77 | (631) ~ (all_0_65_65 = e4)
% 9.77/2.77 |
% 9.77/2.77 | Equations (619) can reduce 631 to:
% 9.77/2.77 | (624) $false
% 9.77/2.77 |
% 9.77/2.77 |-The branch is then unsatisfiable
% 9.77/2.77 |-Branch two:
% 9.77/2.77 | (619) all_0_65_65 = e4
% 9.77/2.77 | (634) ~ (all_0_73_73 = e3) | ~ (all_0_81_81 = e2) | ~ (all_0_89_89 = e1) | ~ (all_0_97_97 = e0)
% 9.77/2.77 |
% 9.77/2.77 +-Applying beta-rule and splitting (634), into two cases.
% 9.77/2.77 |-Branch one:
% 9.77/2.77 | (635) ~ (all_0_73_73 = e3)
% 9.77/2.77 |
% 9.77/2.77 | Equations (622) can reduce 635 to:
% 9.77/2.77 | (624) $false
% 9.77/2.77 |
% 9.77/2.77 |-The branch is then unsatisfiable
% 9.77/2.77 |-Branch two:
% 9.77/2.77 | (622) all_0_73_73 = e3
% 9.77/2.77 | (638) ~ (all_0_81_81 = e2) | ~ (all_0_89_89 = e1) | ~ (all_0_97_97 = e0)
% 9.77/2.77 |
% 9.77/2.77 +-Applying beta-rule and splitting (638), into two cases.
% 9.77/2.77 |-Branch one:
% 9.77/2.77 | (639) ~ (all_0_81_81 = e2)
% 9.77/2.77 |
% 9.77/2.77 | Equations (618) can reduce 639 to:
% 9.77/2.77 | (624) $false
% 9.77/2.77 |
% 9.77/2.77 |-The branch is then unsatisfiable
% 9.77/2.77 |-Branch two:
% 9.77/2.77 | (618) all_0_81_81 = e2
% 9.77/2.77 | (642) ~ (all_0_89_89 = e1) | ~ (all_0_97_97 = e0)
% 9.77/2.77 |
% 9.77/2.77 +-Applying beta-rule and splitting (642), into two cases.
% 9.77/2.77 |-Branch one:
% 9.77/2.77 | (643) ~ (all_0_89_89 = e1)
% 9.77/2.77 |
% 9.77/2.77 | Equations (616) can reduce 643 to:
% 9.77/2.77 | (624) $false
% 9.77/2.77 |
% 9.77/2.77 |-The branch is then unsatisfiable
% 9.77/2.77 |-Branch two:
% 9.77/2.77 | (616) all_0_89_89 = e1
% 9.77/2.77 | (646) ~ (all_0_97_97 = e0)
% 9.77/2.77 |
% 9.77/2.77 | Equations (621) can reduce 646 to:
% 9.77/2.77 | (624) $false
% 9.77/2.77 |
% 9.77/2.77 |-The branch is then unsatisfiable
% 9.77/2.77 |-Branch two:
% 9.77/2.77 | (648) ~ (all_0_49_49 = e6) & ~ (all_0_57_57 = e5) & ~ (all_0_65_65 = e4) & ~ (all_0_73_73 = e3) & ~ (all_0_81_81 = e2) & ~ (all_0_89_89 = e1) & ~ (all_0_97_97 = e0)
% 9.77/2.77 |
% 9.77/2.77 | Applying alpha-rule on (648) yields:
% 9.77/2.77 | (643) ~ (all_0_89_89 = e1)
% 9.77/2.77 | (623) ~ (all_0_49_49 = e6)
% 9.77/2.77 | (639) ~ (all_0_81_81 = e2)
% 9.77/2.77 | (631) ~ (all_0_65_65 = e4)
% 9.77/2.77 | (627) ~ (all_0_57_57 = e5)
% 9.77/2.77 | (646) ~ (all_0_97_97 = e0)
% 9.77/2.77 | (635) ~ (all_0_73_73 = e3)
% 9.77/2.77 |
% 9.77/2.77 +-Applying beta-rule and splitting (19), into two cases.
% 9.77/2.77 |-Branch one:
% 9.77/2.77 | (617) all_0_49_49 = e6
% 9.77/2.77 |
% 9.77/2.77 | Equations (617) can reduce 623 to:
% 9.77/2.77 | (624) $false
% 9.77/2.77 |
% 9.77/2.77 |-The branch is then unsatisfiable
% 9.77/2.77 |-Branch two:
% 9.77/2.77 | (623) ~ (all_0_49_49 = e6)
% 9.77/2.77 | (659) all_0_57_57 = e5 | all_0_65_65 = e4 | all_0_73_73 = e3 | all_0_81_81 = e2 | all_0_89_89 = e1 | all_0_97_97 = e0
% 9.77/2.77 |
% 9.77/2.77 +-Applying beta-rule and splitting (659), into two cases.
% 9.77/2.77 |-Branch one:
% 9.77/2.77 | (620) all_0_57_57 = e5
% 9.77/2.77 |
% 9.77/2.77 | Equations (620) can reduce 627 to:
% 9.77/2.77 | (624) $false
% 9.77/2.77 |
% 9.77/2.77 |-The branch is then unsatisfiable
% 9.77/2.77 |-Branch two:
% 9.77/2.77 | (627) ~ (all_0_57_57 = e5)
% 9.77/2.77 | (663) all_0_65_65 = e4 | all_0_73_73 = e3 | all_0_81_81 = e2 | all_0_89_89 = e1 | all_0_97_97 = e0
% 9.77/2.77 |
% 9.77/2.77 +-Applying beta-rule and splitting (663), into two cases.
% 9.77/2.77 |-Branch one:
% 9.77/2.77 | (619) all_0_65_65 = e4
% 9.77/2.77 |
% 9.77/2.77 | Equations (619) can reduce 631 to:
% 9.77/2.77 | (624) $false
% 9.77/2.77 |
% 9.77/2.77 |-The branch is then unsatisfiable
% 9.77/2.77 |-Branch two:
% 9.77/2.77 | (631) ~ (all_0_65_65 = e4)
% 9.77/2.77 | (667) all_0_73_73 = e3 | all_0_81_81 = e2 | all_0_89_89 = e1 | all_0_97_97 = e0
% 9.77/2.77 |
% 9.77/2.77 +-Applying beta-rule and splitting (667), into two cases.
% 9.77/2.77 |-Branch one:
% 9.77/2.77 | (622) all_0_73_73 = e3
% 9.77/2.77 |
% 9.77/2.77 | Equations (622) can reduce 635 to:
% 9.77/2.77 | (624) $false
% 9.77/2.77 |
% 9.77/2.77 |-The branch is then unsatisfiable
% 9.77/2.77 |-Branch two:
% 9.77/2.77 | (635) ~ (all_0_73_73 = e3)
% 9.77/2.77 | (671) all_0_81_81 = e2 | all_0_89_89 = e1 | all_0_97_97 = e0
% 9.77/2.77 |
% 9.77/2.77 +-Applying beta-rule and splitting (671), into two cases.
% 9.77/2.77 |-Branch one:
% 9.77/2.77 | (618) all_0_81_81 = e2
% 9.77/2.77 |
% 9.77/2.77 | Equations (618) can reduce 639 to:
% 9.77/2.77 | (624) $false
% 9.77/2.77 |
% 9.77/2.77 |-The branch is then unsatisfiable
% 9.77/2.77 |-Branch two:
% 9.77/2.77 | (639) ~ (all_0_81_81 = e2)
% 9.77/2.78 | (675) all_0_89_89 = e1 | all_0_97_97 = e0
% 9.77/2.78 |
% 9.77/2.78 +-Applying beta-rule and splitting (675), into two cases.
% 9.77/2.78 |-Branch one:
% 9.77/2.78 | (616) all_0_89_89 = e1
% 9.77/2.78 |
% 9.77/2.78 | Equations (616) can reduce 643 to:
% 9.77/2.78 | (624) $false
% 9.77/2.78 |
% 9.77/2.78 |-The branch is then unsatisfiable
% 9.77/2.78 |-Branch two:
% 9.77/2.78 | (643) ~ (all_0_89_89 = e1)
% 9.77/2.78 | (621) all_0_97_97 = e0
% 9.77/2.78 |
% 9.77/2.78 | Equations (621) can reduce 646 to:
% 9.77/2.78 | (624) $false
% 9.77/2.78 |
% 9.77/2.78 |-The branch is then unsatisfiable
% 9.77/2.78 % SZS output end Proof for theBenchmark
% 9.77/2.78
% 9.77/2.78 2192ms
%------------------------------------------------------------------------------