0.03/0.12 % Problem : theBenchmark.p : TPTP v0.0.0. Released v0.0.0. 0.03/0.13 % Command : tptp2X_and_run_prover9 %d %s 0.13/0.34 % Computer : n019.cluster.edu 0.13/0.34 % Model : x86_64 x86_64 0.13/0.34 % CPU : Intel(R) Xeon(R) CPU E5-2620 v4 @ 2.10GHz 0.13/0.34 % Memory : 8042.1875MB 0.13/0.34 % OS : Linux 3.10.0-693.el7.x86_64 0.13/0.34 % CPULimit : 1200 0.13/0.34 % DateTime : Wed Jul 14 17:13:14 EDT 2021 0.13/0.34 % CPUTime : 0.75/1.03 ============================== Prover9 =============================== 0.75/1.03 Prover9 (32) version 2009-11A, November 2009. 0.75/1.03 Process 7772 was started by sandbox on n019.cluster.edu, 0.75/1.03 Wed Jul 14 17:13:15 2021 0.75/1.03 The command was "/export/starexec/sandbox/solver/bin/prover9 -t 1200 -f /tmp/Prover9_7619_n019.cluster.edu". 0.75/1.03 ============================== end of head =========================== 0.75/1.03 0.75/1.03 ============================== INPUT ================================= 0.75/1.03 0.75/1.03 % Reading from file /tmp/Prover9_7619_n019.cluster.edu 0.75/1.03 0.75/1.03 set(prolog_style_variables). 0.75/1.03 set(auto2). 0.75/1.03 % set(auto2) -> set(auto). 0.75/1.03 % set(auto) -> set(auto_inference). 0.75/1.03 % set(auto) -> set(auto_setup). 0.75/1.03 % set(auto_setup) -> set(predicate_elim). 0.75/1.03 % set(auto_setup) -> assign(eq_defs, unfold). 0.75/1.03 % set(auto) -> set(auto_limits). 0.75/1.03 % set(auto_limits) -> assign(max_weight, "100.000"). 0.75/1.03 % set(auto_limits) -> assign(sos_limit, 20000). 0.75/1.03 % set(auto) -> set(auto_denials). 0.75/1.03 % set(auto) -> set(auto_process). 0.75/1.03 % set(auto2) -> assign(new_constants, 1). 0.75/1.03 % set(auto2) -> assign(fold_denial_max, 3). 0.75/1.03 % set(auto2) -> assign(max_weight, "200.000"). 0.75/1.03 % set(auto2) -> assign(max_hours, 1). 0.75/1.03 % assign(max_hours, 1) -> assign(max_seconds, 3600). 0.75/1.03 % set(auto2) -> assign(max_seconds, 0). 0.75/1.03 % set(auto2) -> assign(max_minutes, 5). 0.75/1.03 % assign(max_minutes, 5) -> assign(max_seconds, 300). 0.75/1.03 % set(auto2) -> set(sort_initial_sos). 0.75/1.03 % set(auto2) -> assign(sos_limit, -1). 0.75/1.03 % set(auto2) -> assign(lrs_ticks, 3000). 0.75/1.03 % set(auto2) -> assign(max_megs, 400). 0.75/1.03 % set(auto2) -> assign(stats, some). 0.75/1.03 % set(auto2) -> clear(echo_input). 0.75/1.03 % set(auto2) -> set(quiet). 0.75/1.03 % set(auto2) -> clear(print_initial_clauses). 0.75/1.03 % set(auto2) -> clear(print_given). 0.75/1.03 assign(lrs_ticks,-1). 0.75/1.03 assign(sos_limit,10000). 0.75/1.03 assign(order,kbo). 0.75/1.03 set(lex_order_vars). 0.75/1.03 clear(print_given). 0.75/1.03 0.75/1.03 % formulas(sos). % not echoed (82 formulas) 0.75/1.03 0.75/1.03 ============================== end of input ========================== 0.75/1.03 0.75/1.03 % From the command line: assign(max_seconds, 1200). 0.75/1.03 0.75/1.03 ============================== PROCESS NON-CLAUSAL FORMULAS ========== 0.75/1.03 0.75/1.03 % Formulas that are not ordinary clauses: 0.75/1.03 1 (all VAR_V_33 all VAR_V_34 (pred_attacker(VAR_V_33) & pred_attacker(VAR_V_34) -> pred_attacker(constr_dec(VAR_V_33,VAR_V_34)))) # label(ax50) # label(axiom) # label(non_clause). [assumption]. 0.75/1.03 2 (all VAR_V_74 (pred_attacker(VAR_V_74) -> pred_attacker(tuple_A_out_1(VAR_V_74)))) # label(ax68) # label(axiom) # label(non_clause). [assumption]. 0.75/1.03 3 (all VAR_V_83 (pred_attacker(tuple_A_in_2(VAR_V_83)) -> pred_attacker(VAR_V_83))) # label(ax71) # label(axiom) # label(non_clause). [assumption]. 0.75/1.03 4 (all VAR_K_0X30 all VAR_M_0X30 VAR_M_0X30 = constr_comm_dec(constr_comm_enc(VAR_M_0X30,VAR_K_0X30),VAR_K_0X30)) # label(ax46) # label(axiom) # label(non_clause). [assumption]. 0.75/1.03 5 (all VAR_V_89 all VAR_V_90X30 (pred_attacker(VAR_V_90X30) & pred_mess(VAR_V_90X30,VAR_V_89) -> pred_attacker(VAR_V_89))) # label(ax72) # label(axiom) # label(non_clause). [assumption]. 0.75/1.03 6 (all VAR_V_77 (pred_attacker(tuple_A_out_1(VAR_V_77)) -> pred_attacker(VAR_V_77))) # label(ax69) # label(axiom) # label(non_clause). [assumption]. 0.75/1.03 7 (all VAR_V_80X30 (pred_attacker(VAR_V_80X30) -> pred_attacker(tuple_A_in_2(VAR_V_80X30)))) # label(ax70) # label(axiom) # label(non_clause). [assumption]. 0.75/1.03 8 (all VAR_V_50X30 (pred_attacker(VAR_V_50X30) -> pred_attacker(tuple_B_in_3(VAR_V_50X30)))) # label(ax60) # label(axiom) # label(non_clause). [assumption]. 0.75/1.03 9 (all VAR_V_59 (pred_attacker(tuple_B_in_1(VAR_V_59)) -> pred_attacker(VAR_V_59))) # label(ax63) # label(axiom) # label(non_clause). [assumption]. 0.75/1.03 10 (all VAR_MSG1_142 (pred_attacker(tuple_A_in_2(VAR_MSG1_142)) -> pred_attacker(tuple_A_out_4(constr_enc(name_objective,name_m_9))))) # label(ax79) # label(axiom) # label(non_clause). [assumption]. 0.75/1.03 11 (all VAR_V_53 (pred_attacker(tuple_B_in_3(VAR_V_53)) -> pred_attacker(VAR_V_53))) # label(ax61) # label(axiom) # label(non_clause). [assumption]. 0.75/1.03 12 (all VAR_V_29 all VAR_V_30X30 (pred_attacker(VAR_V_30X30) & pred_attacker(VAR_V_29) -> pred_attacker(constr_enc(VAR_V_29,VAR_V_30X30)) 0.75/1.03 WARNING: denials share constants (see output). 0.75/1.03 0.75/1.03 )) # label(ax49) # label(axiom) # label(non_clause). [assumption]. 0.75/1.03 13 (all VAR_V_41 all VAR_V_42 (pred_attacker(VAR_V_41) & pred_attacker(VAR_V_42) -> pred_attacker(constr_comm_dec(VAR_V_41,VAR_V_42)))) # label(ax52) # label(axiom) # label(non_clause). [assumption]. 0.75/1.03 14 (all VAR_V_94 pred_equal(VAR_V_94,VAR_V_94)) # label(ax75) # label(axiom) # label(non_clause). [assumption]. 0.75/1.03 15 (all VAR_V_37 all VAR_V_38 (pred_attacker(VAR_V_37) & pred_attacker(VAR_V_38) -> pred_attacker(constr_comm_enc(VAR_V_37,VAR_V_38)))) # label(ax51) # label(axiom) # label(non_clause). [assumption]. 0.75/1.03 16 (all VAR_V_95 pred_attacker(name_new0x2Dname(VAR_V_95))) # label(ax76) # label(axiom) # label(non_clause). [assumption]. 0.75/1.03 17 (all VAR_V_44 (pred_attacker(VAR_V_44) -> pred_attacker(tuple_B_out_2(VAR_V_44)))) # label(ax58) # label(axiom) # label(non_clause). [assumption]. 0.75/1.03 18 (all VAR_V_62 (pred_attacker(VAR_V_62) -> pred_attacker(tuple_A_out_4(VAR_V_62)))) # label(ax64) # label(axiom) # label(non_clause). [assumption]. 0.75/1.03 19 (all VAR_V_71 (pred_attacker(tuple_A_out_3(VAR_V_71)) -> pred_attacker(VAR_V_71))) # label(ax67) # label(axiom) # label(non_clause). [assumption]. 0.75/1.03 20 (all VAR_V_65 (pred_attacker(tuple_A_out_4(VAR_V_65)) -> pred_attacker(VAR_V_65))) # label(ax65) # label(axiom) # label(non_clause). [assumption]. 0.75/1.03 21 (all VAR_V_68 (pred_attacker(VAR_V_68) -> pred_attacker(tuple_A_out_3(VAR_V_68)))) # label(ax66) # label(axiom) # label(non_clause). [assumption]. 0.75/1.03 22 (all VAR_V_47 (pred_attacker(tuple_B_out_2(VAR_V_47)) -> pred_attacker(VAR_V_47))) # label(ax59) # label(axiom) # label(non_clause). [assumption]. 0.75/1.03 23 (all VAR_V_56 (pred_attacker(VAR_V_56) -> pred_attacker(tuple_B_in_1(VAR_V_56)))) # label(ax62) # label(axiom) # label(non_clause). [assumption]. 0.75/1.03 24 (all VAR_MSG1_162 (pred_attacker(tuple_B_in_1(VAR_MSG1_162)) -> pred_attacker(tuple_B_out_2(constr_comm_enc(VAR_MSG1_162,name_Kb))))) # label(ax80) # label(axiom) # label(non_clause). [assumption]. 0.75/1.03 25 (all VAR_K_8 all VAR_M_7 constr_dec(constr_enc(VAR_M_7,VAR_K_8),VAR_K_8) = VAR_M_7) # label(ax45) # label(axiom) # label(non_clause). [assumption]. 0.75/1.03 26 (all VAR_MSG1_128 (pred_attacker(tuple_A_in_2(VAR_MSG1_128)) -> pred_attacker(tuple_A_out_3(constr_comm_dec(VAR_MSG1_128,name_Ka))))) # label(ax78) # label(axiom) # label(non_clause). [assumption]. 0.75/1.03 27 (all VAR_V_91 all VAR_V_92 (pred_attacker(VAR_V_91) & pred_attacker(VAR_V_92) -> pred_mess(VAR_V_92,VAR_V_91))) # label(ax73) # label(axiom) # label(non_clause). [assumption]. 0.75/1.03 0.75/1.03 ============================== end of process non-clausal formulas === 0.75/1.03 0.75/1.03 ============================== PROCESS INITIAL CLAUSES =============== 0.75/1.03 0.75/1.03 ============================== PREDICATE ELIMINATION ================= 0.75/1.03 28 -pred_attacker(A) | -pred_attacker(B) | pred_mess(B,A) # label(ax73) # label(axiom). [clausify(27)]. 0.75/1.03 29 -pred_attacker(A) | -pred_mess(A,B) | pred_attacker(B) # label(ax72) # label(axiom). [clausify(5)]. 0.75/1.03 0.75/1.03 ============================== end predicate elimination ============= 0.75/1.03 0.75/1.03 Auto_denials: 0.75/1.03 % copying label co0 to answer in negative clause 0.75/1.03 % copying label ax31 to answer in negative clause 0.75/1.03 % copying label ax35 to answer in negative clause 0.75/1.03 % copying label ax33 to answer in negative clause 0.75/1.03 % copying label ax36 to answer in negative clause 0.75/1.03 % copying label ax7 to answer in negative clause 0.75/1.03 % copying label ax29 to answer in negative clause 0.75/1.03 % copying label ax39 to answer in negative clause 0.75/1.03 % copying label ax11 to answer in negative clause 0.75/1.03 % copying label ax28 to answer in negative clause 0.75/1.03 % copying label ax24 to answer in negative clause 0.75/1.03 % copying label ax20 to answer in negative clause 0.75/1.03 % copying label ax42 to answer in negative clause 0.75/1.03 % copying label ax19 to answer in negative clause 0.75/1.03 % copying label ax27 to answer in negative clause 0.75/1.03 % copying label ax0 to answer in negative clause 0.75/1.03 % copying label ax32 to answer in negative clause 0.75/1.03 % copying label ax8 to answer in negative clause 0.75/1.03 % copying label ax1 to answer in negative clause 0.75/1.03 % copying label ax4 to answer in negative clause 0.75/1.03 % copying label ax21 to answer in negative clause 39.69/40.01 % copying label ax25 to answer in negative clause 39.69/40.01 % copying label ax10 to answer in negative clause 39.69/40.01 % copying label ax18 to answer in negative clause 39.69/40.01 % copying label ax38 to answer in negative clause 39.69/40.01 % copying label ax16 to answer in negative clause 39.69/40.01 % copying label ax37 to answer in negative clause 39.69/40.01 % copying label ax6 to answer in negative clause 39.69/40.01 % copying label ax44 to answer in negative clause 39.69/40.01 % copying label ax26 to answer in negative clause 39.69/40.01 % copying label ax5 to answer in negative clause 39.69/40.01 % copying label ax30 to answer in negative clause 39.69/40.01 % copying label ax17 to answer in negative clause 39.69/40.01 % copying label ax3 to answer in negative clause 39.69/40.01 % copying label ax13 to answer in negative clause 39.69/40.01 % copying label ax22 to answer in negative clause 39.69/40.01 % copying label ax23 to answer in negative clause 39.69/40.01 % copying label ax34 to answer in negative clause 39.69/40.01 % copying label ax41 to answer in negative clause 39.69/40.01 % copying label ax2 to answer in negative clause 39.69/40.01 % copying label ax14 to answer in negative clause 39.69/40.01 % copying label ax12 to answer in negative clause 39.69/40.01 % copying label ax9 to answer in negative clause 39.69/40.01 % copying label ax43 to answer in negative clause 39.69/40.01 % copying label ax40 to answer in negative clause 39.69/40.01 % copying label ax15 to answer in negative clause 39.69/40.01 % assign(max_proofs, 46). % (Horn set with more than one neg. clause) 39.69/40.01 39.69/40.01 WARNING, because some of the denials share constants, 39.69/40.01 some of the denials or their descendents may be subsumed, 39.69/40.01 preventing the target number of proofs from being found. 39.69/40.01 The shared constants are: constr_CONST_2, constr_CONST_1, constr_CONST_3, constr_CONST_0x30, name_c, name_m_9, name_Ka, constr_CONST_4, name_Kb, name_objective. 39.69/40.01 39.69/40.01 Term ordering decisions: 39.69/40.01 Function symbol KB weights: name_Ka=1. name_m_9=1. constr_CONST_0x30=1. constr_CONST_1=1. constr_CONST_2=1. constr_CONST_3=1. constr_CONST_4=1. name_Kb=1. name_c=1. name_objective=1. tuple_false=1. tuple_true=1. constr_comm_enc=1. constr_comm_dec=1. constr_enc=1. constr_dec=1. tuple_A_in_2=1. tuple_A_out_1=1. tuple_A_out_3=1. tuple_A_out_4=1. tuple_B_in_1=1. tuple_B_out_2=1. tuple_B_in_3=1. name_new0x2Dname=1. 39.69/40.01 39.69/40.01 ============================== end of process initial clauses ======== 39.69/40.01 39.69/40.01 ============================== CLAUSES FOR SEARCH ==================== 39.69/40.01 39.69/40.01 ============================== end of clauses for search ============= 39.69/40.01 39.69/40.01 ============================== SEARCH ================================ 39.69/40.01 39.69/40.01 % Starting search at 0.02 seconds. 39.69/40.01 39.69/40.01 Low Water (keep): wt=9.000, iters=3660 39.69/40.01 39.69/40.01 Low Water (keep): wt=8.000, iters=3372 39.69/40.01 39.69/40.01 Low Water (keep): wt=7.000, iters=3558 39.69/40.01 39.69/40.01 Low Water (keep): wt=6.000, iters=3480 39.69/40.01 39.69/40.01 Low Water (keep): wt=5.000, iters=3388 39.69/40.01 39.69/40.01 NOTE: Back_subsumption disabled, ratio of kept to back_subsumed is 7024 (0.00 of 0.82 sec). 39.69/40.01 39.69/40.01 ============================== PROOF ================================= 39.69/40.01 % SZS status Theorem 39.69/40.01 % SZS output start Refutation 39.69/40.01 39.69/40.01 % Proof 1 at 32.72 (+ 6.28) seconds: co0. 39.69/40.01 % Length of proof is 30. 39.69/40.01 % Level of proof is 7. 39.69/40.01 % Maximum clause weight is 8.000. 39.69/40.01 % Given clauses 3245. 39.69/40.01 39.69/40.01 1 (all VAR_V_33 all VAR_V_34 (pred_attacker(VAR_V_33) & pred_attacker(VAR_V_34) -> pred_attacker(constr_dec(VAR_V_33,VAR_V_34)))) # label(ax50) # label(axiom) # label(non_clause). [assumption]. 39.69/40.01 4 (all VAR_K_0X30 all VAR_M_0X30 VAR_M_0X30 = constr_comm_dec(constr_comm_enc(VAR_M_0X30,VAR_K_0X30),VAR_K_0X30)) # label(ax46) # label(axiom) # label(non_clause). [assumption]. 39.69/40.01 6 (all VAR_V_77 (pred_attacker(tuple_A_out_1(VAR_V_77)) -> pred_attacker(VAR_V_77))) # label(ax69) # label(axiom) # label(non_clause). [assumption]. 39.69/40.01 7 (all VAR_V_80X30 (pred_attacker(VAR_V_80X30) -> pred_attacker(tuple_A_in_2(VAR_V_80X30)))) # label(ax70) # label(axiom) # label(non_clause). [assumption]. 39.69/40.01 10 (all VAR_MSG1_142 (pred_attacker(tuple_A_in_2(VAR_MSG1_142)) -> pred_attacker(tuple_A_out_4(constr_enc(name_objective,name_m_9))))) # label(ax79) # label(axiom) # label(non_clause). [assumption]. 39.69/40.01 19 (all VAR_V_71 (pred_attacker(tuple_A_out_3(VAR_V_71)) -> pred_attacker(VAR_V_71))) # label(ax67) # label(axiom) # label(non_clause). [assumption]. 39.69/40.01 20 (all VAR_V_65 (pred_attacker(tuple_A_out_4(VAR_V_65)) -> pred_attacker(VAR_V_65))) # label(ax65) # label(axiom) # label(non_clause). [assumption]. 39.76/40.04 25 (all VAR_K_8 all VAR_M_7 constr_dec(constr_enc(VAR_M_7,VAR_K_8),VAR_K_8) = VAR_M_7) # label(ax45) # label(axiom) # label(non_clause). [assumption]. 39.76/40.04 26 (all VAR_MSG1_128 (pred_attacker(tuple_A_in_2(VAR_MSG1_128)) -> pred_attacker(tuple_A_out_3(constr_comm_dec(VAR_MSG1_128,name_Ka))))) # label(ax78) # label(axiom) # label(non_clause). [assumption]. 39.76/40.04 37 pred_attacker(tuple_false) # label(ax48) # label(axiom). [assumption]. 39.76/40.04 39 pred_attacker(tuple_A_out_1(constr_comm_enc(name_m_9,name_Ka))) # label(ax77) # label(axiom). [assumption]. 39.76/40.04 40 constr_comm_dec(constr_comm_enc(A,B),B) = A # label(ax46) # label(axiom). [clausify(4)]. 39.76/40.04 41 constr_dec(constr_enc(A,B),B) = A # label(ax45) # label(axiom). [clausify(25)]. 39.76/40.04 42 -pred_attacker(name_objective) # label(co0) # label(negated_conjecture) # answer(co0). [assumption]. 39.76/40.04 113 -pred_attacker(tuple_A_out_1(A)) | pred_attacker(A) # label(ax69) # label(axiom). [clausify(6)]. 39.76/40.04 114 -pred_attacker(A) | pred_attacker(tuple_A_in_2(A)) # label(ax70) # label(axiom). [clausify(7)]. 39.76/40.04 120 -pred_attacker(tuple_A_out_3(A)) | pred_attacker(A) # label(ax67) # label(axiom). [clausify(19)]. 39.76/40.04 121 -pred_attacker(tuple_A_out_4(A)) | pred_attacker(A) # label(ax65) # label(axiom). [clausify(20)]. 39.76/40.04 125 -pred_attacker(A) | -pred_attacker(B) | pred_attacker(constr_dec(A,B)) # label(ax50) # label(axiom). [clausify(1)]. 39.76/40.04 126 -pred_attacker(tuple_A_in_2(A)) | pred_attacker(tuple_A_out_4(constr_enc(name_objective,name_m_9))) # label(ax79) # label(axiom). [clausify(10)]. 39.76/40.04 131 -pred_attacker(tuple_A_in_2(A)) | pred_attacker(tuple_A_out_3(constr_comm_dec(A,name_Ka))) # label(ax78) # label(axiom). [clausify(26)]. 39.76/40.04 143 pred_attacker(constr_comm_enc(name_m_9,name_Ka)). [hyper(113,a,39,a)]. 39.76/40.04 147 pred_attacker(tuple_A_in_2(tuple_false)). [hyper(114,a,37,a)]. 39.76/40.04 2105 pred_attacker(tuple_A_in_2(constr_comm_enc(name_m_9,name_Ka))). [hyper(114,a,143,a)]. 39.76/40.04 2264 pred_attacker(tuple_A_out_4(constr_enc(name_objective,name_m_9))). [hyper(126,a,147,a)]. 39.76/40.04 10507 pred_attacker(tuple_A_out_3(name_m_9)). [hyper(131,a,2105,a),rewrite([40(5)])]. 39.76/40.04 10574 pred_attacker(name_m_9). [hyper(120,a,10507,a)]. 39.76/40.04 11336 pred_attacker(constr_enc(name_objective,name_m_9)). [hyper(121,a,2264,a)]. 39.76/40.04 11337 pred_attacker(name_objective). [hyper(125,a,11336,a,b,10574,a),rewrite([41(5)])]. 39.76/40.04 11338 $F # answer(co0). [resolve(11337,a,42,a)]. 39.76/40.04 39.76/40.04 % SZS output end Refutation 39.76/40.04 ============================== end of proof ========================== 39.76/40.04 39.76/40.04 % Disable descendants (x means already disabled): 39.76/40.04 42 142 144 165 166 187 188 199 701 702 39.76/40.04 703 704 705 706 707 708 709 710 711 712 39.76/40.04 713 714 715 716 717 718 719 720 721 722 39.76/40.04 723 724 725 726 727 728 1304 1305 1306 1307 39.76/40.04 1308 1309 1310 1311 1312 1313 1314 1315 1316 1317 39.76/40.04 1318 1319 1320 1321 1322 1323 1324 1325 1326 1327 39.76/40.04 1328 1329 1330 1331 2106 2107 2108 2109 2110 2111 39.76/40.04 2112 2113 2114 2115 2116 2117 2118 2119 2120 2121 39.76/40.04 2122 2123 2124 2125 2126 2127 2128 2129 2130 2131 39.76/40.04 2132 2133 3115 3116 3117 3118 3119 3120 3121 3122 39.76/40.04 3123 3124 3125 3126 3127 3128 3129 3130 3131 3132 39.76/40.04 3133 3134 3135 3136 3137 3138 3139 3140 3141 3142 39.76/40.04 4095 4096 4097 4098 4099 4100 4101 4102 4103 4104 39.76/40.04 4105 4106 4107 4108 4109 4110 4111 4112 4113 4114 39.76/40.04 4115 4116 4117 4118 4119 4120 4121 4122 4547 4548 39.76/40.04 4549 4550 4551 4552 4553 4554 4555 4556 4557 4558 39.76/40.04 4559 4560 4561 4562 4563 4564 4565 4566 4567 4568 39.76/40.04 4569 4570 4571 4572 4573 4574 4866 4867 4868 4869 39.76/40.04 4870 4871 4872 4873 4874 4875 4876 4877 4878 4879 39.76/40.04 4880 4881 4882 4883 4884 4885 4886 4887 4888 4889 39.76/40.04 4890 4891 4892 4893 5178 5179 5180 5181 5182 5183 39.76/40.04 5184 5185 5186 5187 5188 5189 5190 5191 5192 5193 39.76/40.04 5194 5195 5196 5197 5198 5199 5200 5201 5202 5203 39.76/40.04 5204 5205 5497 5498 5499 5500 5501 5502 5503 5504 39.76/40.04 5505 5506 5507 5508 5509 5510 5511 5512 5513 5514 39.76/40.04 5515 5516 5517 5518 5519 5520 5521 5522 5523 5524 39.76/40.04 5809 5810 5811 5812 5813 5814 5815 5816 5817 5818 39.76/40.04 5819 5820 5821 5822 5823 5824 5825 5826 5827 5828 39.76/40.04 5829 5830 5831 5832 5833 5834 5835 5836 5929 5930 39.76/40.04 5931 5932 5933 5934 5935 5936 5937 5938 5939 5940 39.76/40.04 5941 5942 5943 5944 5945 5946 5947 5948 5949 5950 39.76/40.04 5951 5952 5953 5954 5955 5956 5985 5986 5987 5988 39.76/40.04 5989 5990 5991 5992 5993 5994 5995 5996 5997 5998 39.76/40.04 5999 6000 6001 6002 6003 6004 6005 6006 6007 6008 39.76/40.04 6009 6010 6011 6012 6041 6042 6043 6044 6045 6046 39.76/40.04 6047 6048 6049 6050 6051 6052 6053 6054 6055 6056 39.76/40.04 6057 6058 6059 6060 6061 6062 6063 6064 6065 6066 39.76/40.04 6067 6068 6097 6098 6099 6100 6101 6102 6103 6104 39.76/40.04 6105 6106 6107 6108 6109 6110 6111 6112 6113 6114 39.76/40.04 6115 6116 6117 6118 6119 6120 6121 6122 6123 6124 39.76/40.04 6153 6154 6155 6156 6157 6158 6159 6160 6161 6162 39.76/40.04 6163 6164 6165 6166 6167 6168 6169 6170 6171 6172 39.76/40.04 6173 6174 6175 6176 6177 6178 6179 6180 6181 6182 39.76/40.04 6183 6184 6185 6186 6187 6188 6189 6190 6191 6192 39.76/40.04 6193 6194 6195 6196 6197 6198 6199 6200 6201 6202 39.76/40.04 6203 6204 6205 6206 6207 6208 6209 6210 6211 6212 39.76/40.04 6213 6214 6215 6216 6217 6218 6219 6220 6221 6222 39.76/40.04 6223 6224 6225 6226 6227 6228 6229 6230 6231 6232 39.76/40.04 6233 6234 6235 6236 6237 6238 6239 6240 6241 6242 39.76/40.04 6243 6244 6245 6246 6247 6248 6249 6250 6251 6252 39.76/40.04 6253 6254 6255 6256 6257 6258 6259 6260 6261 6262 39.76/40.04 6263 6264 6265 6266 6267 6268 6269 6270 6271 6272 39.76/40.04 6273 6274 6275 6276 6277 6278 6279 6280 6281 6282 39.76/40.04 6283 6284 6285 6286 6287 6288 6289 6290 6291 6292 39.76/40.04 6293 6294 6295 6296 6297 6298 6299 6300 6301 6302 39.76/40.04 6303 6304 6305 6306 6307 6308 6309 6310 6311 6312 39.76/40.04 6313 6314 6315 6316 6317 6318 6319 6320 6321 6322 39.76/40.04 6323 6324 6325 6326 6327 6328 6329 6330 6331 6332 39.76/40.04 6333 6334 6335 6336 6337 6338 6339 6340 6341 6342 39.76/40.04 6343 6344 6345 6346 6347 6348 6349 6350 6351 6352 39.76/40.04 6353 6354 6355 6356 6357 6358 6359 6360 6361 6362 39.76/40.04 6363 6364 6365 6366 6367 6368 6369 6370 6371 6372 39.76/40.04 6373 6374 6375 6376 6377 6378 6379 6380 6381 6382 39.76/40.04 6383 6384 6385 6386 6387 6388 6389 6390 6391 6392 39.76/40.04 6393 6394 6395 6396 6397 6398 6399 6400 6401 6402 39.76/40.04 6403 6404 6405 6406 6407 6408 6409 6410 6411 6412 39.76/40.04 6413 6414 6415 6416 6417 6418 6419 6420 6421 6422 39.76/40.04 6423 6424 6425 6426 6427 6428 6429 6430 6431 6432 39.76/40.04 6433 6434 6435 6436 6437 6438 6439 6440 6441 6442 39.76/40.04 6443 6444 6445 6446 6447 6448 6449 6450 6451 6452 39.76/40.04 6453 6454 6455 6456 6457 6458 6459 6460 6461 6462 39.76/40.04 6463 6464 6465 6466 6467 6468 6469 6470 6471 6472 39.76/40.04 6473 6474 6475 6476 6477 6478 6479 6480 6481 6482 39.76/40.04 6483 6484 6485 6486 6487 6488 6489 6490 6491 6492 39.76/40.04 6493 6494 6495 6496 6497 6498 6499 6500 6501 6502 39.76/40.04 6503 6504 6505 6506 6507 6508 6509 6510 6511 6512 39.76/40.04 6513 6514 6515 6516 6517 6518 6519 6520 6521 6522 39.76/40.04 6523 6524 6525 6526 6527 6528 6529 6530 6531 6532 39.76/40.04 6533 6534 6535 6536 6537 6538 6539 6540 6541 6542 39.76/40.04 6543 6544 6545 6546 6547 6548 6549 6550 6551 6552 39.76/40.04 6553 6554 6555 6556 6557 6558 6559 6560 6561 6562 39.76/40.04 6563 6564 6565 6566 6567 6568 6569 6570 6571 6572 39.76/40.04 6573 6574 6575 6576 6577 6578 6579 6580 6581 6582 39.76/40.04 6583 6584 6585 6586 6587 6588 6589 6590 6591 6592 39.76/40.04 6593 6594 6595 6596 6597 6598 6599 6600 6601 6602 39.76/40.04 6603 6604 6605 6606 6607 6608 6609 6610 6611 6612 39.76/40.04 6613 6614 6615 6616 6617 6618 6619 6620 6621 6622 39.76/40.04 6623 6624 6625 6626 6627 6628 6629 6630 6631 6632 39.76/40.04 6633 6634 6635 6636 6637 6638 6639 6640 6641 6642 39.76/40.04 6643 6644 6645 6646 6647 6648 6649 6650 6651 6652 39.76/40.04 6653 6654 6655 6656 6657 6658 6659 6660 6661 6662 39.76/40.04 6663 6664 6665 6666 6667 6668 6669 6670 6671 6672 39.76/40.04 6673 6674 6675 6676 6677 6678 6679 6680 6681 6682 39.76/40.04 6683 6684 6685 6686 6687 6688 6689 6690 6691 6692 39.76/40.04 6693 6694 6695 6696 6697 6698 6699 6700 6701 6702 39.76/40.04 6703 6704 6705 6706 6707 6708 6709 6710 6711 6712 39.76/40.04 6713 6714 6715 6716 6717 6718 6719 6720 6721 6722 39.76/40.04 6723 6724 6725 6726 6727 6728 6729 6730 6731 6732 39.76/40.04 6733 6734 6735 6736 6737 6738 6739 6740 6741 6742 39.76/40.04 6743 6744 6745 6746 6747 6748 6749 6750 6751 6752 39.76/40.04 6753 6754 6755 6756 6757 6758 6759 6760 6761 6762 39.76/40.04 6763 6764 6765 6766 6767 6768 6769 6770 6771 6772 39.76/40.04 6773 6774 6775 6776 6777 6778 6779 6780 6781 6782 39.76/40.04 6783 6784 6785 6786 6787 6788 6789 6790 6791 6792 39.76/40.04 6793 6794 6795 6796 6797 6798 6799 6800 6801 6802 39.76/40.04 6803 6804 6805 6806 6807 6808 6809 6810 6811 6812 39.76/40.04 6813 6814 6815 6816 6817 6818 6819 6820 6821 6822 39.76/40.04 6823 6824 6825 6826 6827 6828 6829 6830 6831 6832 39.76/40.04 6833 6834 6835 6836 6837 6838 6839 6840 6841 6842 39.76/40.04 6843 6844 6845 6846 6847 6848 6849 6850 6851 6852 39.76/40.04 6853 6854 6855 6856 6857 6858 6859 6860 6861 6862 39.76/40.04 6863 6864 6865 6866 6867 6868 6869 6870 6871 6872 39.76/40.04 6873 6874 6875 6876 6877 6878 6879 6880 6881 6882 39.76/40.04 6883 6884 6885 6886 6887 6888 6889 6890 6891 6892 39.76/40.04 6893 6894 6895 6896 6897 6898 6899 6900 6901 6902 39.76/40.04 6903 6904 6905 6906 6907 6908 6909 6910 6911 6912 39.76/40.04 6913 6914 6915 6916 6917 6918 6919 6920 6921 6922 39.76/40.04 6923 6924 6925 6926 6927 6928 6929 6930 6931 6932 39.76/40.04 6933 6934 6935 6936 6937 6938 6939 6940 6941 6942 39.76/40.04 6943 6944 6945 6946 6947 6948 6949 6950 6951 6952 39.76/40.04 6953 6954 6955 6956 6957 6958 6959 6960 6961 6962 39.76/40.04 6963 6964 6965 6966 6967 6968 6969 6970 6971 6972 39.76/40.04 6973 6974 6975 6976 6977 6978 6979 6980 6981 6982 39.76/40.04 6983 6984 6985 6986 6987 6988 6989 6990 6991 6992 39.76/40.04 6993 6994 6995 6996 6997 6998 6999 7000 7001 7002 39.76/40.04 7003 7004 7005 7006 7007 7008 7009 7010 7011 7012 39.76/40.04 7013 7014 7015 7016 7017 7018 7019 7020 7021 7022 39.76/40.04 7023 7024 7025 7026 7027 7028 7029 7030 7031 7032 39.76/40.04 7033 7034 7035 7036 7037 7038 7039 7040 7041 7042 39.76/40.04 7043 7044 7045 7046 7047 7048 7049 7050 7051 7052 39.76/40.04 7053 7054 7055 7056 7057 7058 7059 7060 7061 7062 39.76/40.04 7063 7064 7065 7066 7067 7068 7069 7070 7071 7072 39.76/40.04 7073 7074 7075 7076 7077 7078 7079 7080 7081 7082 39.76/40.04 7083 7084 7085 7086 7087 7088 7089 7090 7091 7092 39.76/40.04 7093 7094 7095 7096 7097 7098 7099 7100 7101 7102 39.76/40.04 7103 7104 7105 7106 7107 7108 7109 7110 7111 7112 39.76/40.04 7113 7114 7115 7116 7117 7118 7119 7120 7121 7122 39.76/40.04 7123 7124 7125 7126 7127 7128 7129 7130 7131 7132 39.76/40.04 7133 7134 7135 7136 7137 7138 7139 7140 7141 7142 39.76/40.04 7143 7144 7145 7146 7147 7148 7149 7150 7151 7152 39.76/40.04 7153 7154 7155 7156 7157 7158 7159 7160 7161 7162 39.76/40.04 7163 7164 7165 7166 7167 7168 7169 7170 7171 7172 39.76/40.04 7173 7174 7175 7176 7177 7178 7179 7180 7181 7182 39.76/40.04 7183 7184 7185 7186 7187 7188 7196 7197 7198 7199 39.76/40.04 7200 7201 7202 7203 7204 7205 7206 7207 7208 7209 39.76/40.04 7210 7211 7212 7213 7214 7215 7216 7217 7218 7219 39.76/40.04 7220 7221 7222 7223 7224 7225 7226 7227 7228 7229 39.76/40.04 7230 7231 7232 7233 7234 7235 7236 7237 7238 7239 39.76/40.04 7240 7241 7242 7243 7244 7245 7246 7247 7248 7249 39.76/40.04 7250 7251 7259 7260 7261 7262 7263 7264 7265 7266 39.76/40.04 7267 7268 7269 7270 7271 7272 7273 7274 7275 7276 39.76/40.04 7277 7278 7279 7280 7281 7282 7283 7284 7285 7286 39.76/40.04 7294 7295 7296 7297 7298 7299 7300 7301 7302 7303 39.76/40.04 7304 7305 7306 7307 7308 7309 7310 7311 7312 7313 39.76/40.04 7314 7315 7316 7317 7318 7319 7320 7321 7322 7323 39.76/40.04 7324 7325 7326 7327 7328 7329 7330 7331 7332 7333 39.76/40.04 7334 7335 7336 7337 7338 7339 7340 7341 7342 7343 39.76/40.04 7344 7345 7346 7347 7348 7349 7357 7358 7359 7360 39.76/40.04 7361 7362 7363 7364 7365 7366 7367 7368 7369 7370 39.76/40.04 7371 7372 7373 7374 7375 7376 7377 7378 7379 7380 39.76/40.04 7381 7382 7383 7384 7385 7386 7387 7388 7389 7390 39.76/40.04 7391 7392 7393 7394 7395 7396 7397 7398 7399 7400 39.76/40.04 7401 7402 7403 7404 7405 7406 7407 7408 7409 7410 39.76/40.04 7411 7412 7420 7421 7422 7423 7424 7425 7426 7427 39.76/40.04 7428 7429 7430 7431 7432 7433 7434 7435 7436 7437 39.76/40.04 7438 7439 7440 7441 7442 7443 7444 7445 7446 7447 39.76/40.04 7448 7449 7450 7451 7452 7453 7454 7455 7456 7457 39.76/40.04 7458 7459 7460 7461 7462 7463 7464 7465 7466 7467 39.76/40.04 7468 7469 7470 7471 7472 7473 7474 7475 7483 7484 39.76/40.04 7485 7486 7487 7488 7489 7490 7491 7492 7493 7494 39.76/40.04 7495 7496 7497 7498 7499 7500 7501 7502 7503 7504 39.76/40.04 7505 7506 7507 7508 7509 7510 7518 7519 7520 7521 39.76/40.04 7522 7523 7524 7525 7526 7527 7528 7529 7530 7531 39.76/40.04 7532 7533 7534 7535 7536 7537 7538 7539 7540 7541 39.76/40.04 7542 7543 7544 7545 7546 7547 7548 7549 7550 7551 39.76/40.04 7552 7553 7554 7555 7556 7557 7558 7559 7560 7561 39.76/40.04 7562 7563 7564 7565 7566 7567 7568 7569 7570 7571 39.76/40.04 7572 7573 7581 7582 7583 7584 7585 7586 7587 7588 39.76/40.04 7589 7590 7591 7592 7593 7594 7595 7596 7597 7598 39.76/40.04 7599 7600 7601 7602 7603 7604 7605 7606 7607 7608 39.76/40.04 7609 7610 7611 7612 7613 7614 7615 7616 7617 7618 39.76/40.04 7619 7620 7621 7622 7623 7624 7625 7626 7627 7628 39.76/40.04 7629 7630 7631 7632 7633 7634 7635 7636 7644 7645 39.76/40.04 7646 7647 7648 7649 7650 7651 7652 7653 7654 7655 39.76/40.04 7656 7657 7658 7659 7660 7661 7662 7663 7664 7665 39.76/40.04 7666 7667 7668 7669 7670 7671 7679 7680 7681 7682 39.76/40.04 7683 7684 7685 7686 7687 7688 7689 7690 7691 7692 39.76/40.04 7693 7694 7695 7696 7697 7698 7699 7700 7701 7702 39.76/40.04 7703 7704 7705 7706 7714 7715 7716 7717 7718 7719 39.76/40.04 7720 7721 7722 7723 7724 7725 7726 7727 7728 7729 39.76/40.04 7730 7731 7732 7733 7734 7735 7736 7737 7738 7739 39.76/40.04 7740 7741 7742 7743 7744 7745 7746 7747 7748 7749 39.76/40.04 7750 7751 7752 7753 7754 7755 7756 7757 7758 7759 39.76/40.04 7760 7761 7762 7763 7764 7765 7766 7767 7768 7769 39.76/40.04 7777 7778 7779 7780 7781 7782 7783 7784 7785 7786 39.76/40.04 7787 7788 7789 7790 7791 7792 7793 7794 7795 7796 39.76/40.04 7797 7798 7799 7800 7801 7802 7803 7804 7812 7813 39.76/40.04 7814 7815 7816 7817 7818 7819 7820 7821 7822 7823 39.76/40.04 7824 7825 7826 7827 7828 7829 7830 7831 7832 7833 39.76/40.04 7834 7835 7836 7837 7838 7839 7840 7841 7842 7843 39.76/40.04 7844 7845 7846 7847 7848 7849 7850 7851 7852 7853 39.76/40.04 7854 7855 7856 7857 7858 7859 7860 7861 7862 7863 39.76/40.04 7864 7865 7866 7867 7875 7876 7877 7878 7879 7880 39.76/40.04 7881 7882 7883 7884 7885 7886 7887 7888 7889 7890 39.76/40.04 7891 7892 7893 7894 7895 7896 7897 7898 7899 7900 39.76/40.04 7901 7902 7910 7911 7912 7913 7914 7915 7916 7917 39.76/40.04 7918 7919 7920 7921 7922 7923 7924 7925 7926 7927 39.76/40.04 7928 7929 7930 7931 7932 7933 7934 7935 7936 7937 39.76/40.04 7938 7939 7940 7941 7942 7943 7944 7945 7946 7947 39.76/40.04 7948 7949 7950 7951 7952 7953 7954 7955 7956 7957 39.76/40.04 7958 7959 7960 7961 7962 7963 7964 7965 7973 7974 39.76/40.04 7975 7976 7977 7978 7979 7980 7981 7982 7983 7984 39.76/40.04 7985 7986 7987 7988 7989 7990 7991 7992 7993 7994 39.76/40.04 7995 7996 7997 7998 7999 8000 8008 8009 8010 8011 39.76/40.04 8012 8013 8014 8015 8016 8017 8018 8019 8020 8021 39.76/40.04 8022 8023 8024 8025 8026 8027 8028 8029 8030 8031 39.76/40.04 8032 8033 8034 8035 8036 8037 8038 8039 8040 8041 39.76/40.04 8042 8043 8044 8045 8046 8047 8048 8049 8050 8051 39.76/40.04 8052 8053 8054 8055 8056 8057 8058 8059 8060 8061 39.76/40.04 8062 8063 8071 8072 8073 8074 8075 8076 8077 8078 39.76/40.04 8079 8080 8081 8082 8083 8084 8085 8086 8087 8088 39.76/40.04 8089 8090 8091 8092 8093 8094 8095 8096 8097 8098 39.76/40.04 8106 8107 8108 8109 8110 8111 8112 8113 8114 8115 39.76/40.04 8116 8117 8118 8119 8120 8121 8122 8123 8124 8125 39.76/40.04 8126 8127 8128 8129 8130 8131 8132 8133 8134 8135 39.76/40.04 8136 8137 8138 8139 8140 8141 8142 8143 8144 8145 39.76/40.04 8146 8147 8148 8149 8150 8151 8152 8153 8154 8155 39.76/40.04 8156 8157 8158 8159 8160 8161 8169 8170 8171 8172 39.76/40.04 8173 8174 8175 8176 8177 8178 8179 8180 8181 8182 39.76/40.04 8183 8184 8185 8186 8187 8188 8189 8190 8191 8192 39.76/40.04 8193 8194 8195 8196 8197 8198 8199 8200 8201 8202 39.76/40.04 8203 8204 8205 8206 8207 8208 8209 8210 8211 8212 39.76/40.04 8213 8214 8215 8216 8217 8218 8219 8220 8221 8222 39.76/40.04 8223 8224 8232 8233 8234 8235 8236 8237 8238 8239 39.76/40.04 8240 8241 8242 8243 8244 8245 8246 8247 8248 8249 39.76/40.04 8250 8251 8252 8253 8254 8255 8256 8257 8258 8259 39.76/40.04 8267 8268 8269 8270 8271 8272 8273 8274 8275 8276 39.76/40.04 8277 8278 8279 8280 8281 8282 8283 8284 8285 8286 39.76/40.04 8287 8288 8289 8290 8291 8292 8293 8294 8295 8296 39.76/40.04 8297 8298 8299 8300 8301 8302 8303 8304 8305 8306 39.76/40.04 8307 8308 8309 8310 8311 8312 8313 8314 8315 8316 39.76/40.04 8317 8318 8319 8320 8321 8322 8330 8331 8332 8333 39.76/40.04 8334 8335 8336 8337 8338 8339 8340 8341 8342 8343 39.76/40.04 8344 8345 8346 8347 8348 8349 8350 8351 8352 8353 39.76/40.04 8354 8355 8356 8357 8365 8366 8367 8368 8369 8370 39.76/40.04 8371 8372 8373 8374 8375 8376 8377 8378 8379 8380 39.76/40.04 8381 8382 8383 8384 8385 8386 8387 8388 8389 8390 39.76/40.04 8391 8392 8393 8394 8395 8396 8397 8398 8399 8400 39.76/40.04 8401 8402 8403 8404 8405 8406 8407 8408 8409 8410 39.76/40.04 8411 8412 8413 8414 8415 8416 8417 8418 8419 8420 39.76/40.04 8428 8429 8430 8431 8432 8433 8434 8435 8436 8437 39.76/40.04 8438 8439 8440 8441 8442 8443 8444 8445 8446 8447 39.76/40.04 8448 8449 8450 8451 8452 8453 8454 8455 8456 8457 39.76/40.04 8458 8459 8460 8461 8462 8463 8464 8465 8466 8467 39.76/40.04 8468 8469 8470 8471 8472 8473 8474 8475 8476 8477 39.76/40.04 8478 8479 8480 8481 8482 8483 8491 8492 8493 8494 39.76/40.04 8495 8496 8497 8498 8499 8500 8501 8502 8503 8504 39.76/40.04 8505 8506 8507 8508 8509 8510 8511 8512 8513 8514 39.76/40.04 8515 8516 8517 8518 8526 8527 8528 8529 8530 8531 39.76/40.04 8532 8533 8534 8535 8536 8537 8538 8539 8540 8541 39.76/40.04 8542 8543 8544 8545 8546 8547 8548 8549 8550 8551 39.76/40.04 8552 8553 8554 8555 8556 8557 8558 8559 8560 8561 39.76/40.04 8562 8563 8564 8565 8566 8567 8568 8569 8570 8571 39.76/40.04 8572 8573 8574 8575 8576 8577 8578 8579 8580 8581 39.76/40.04 8589 8590 8591 8592 8593 8594 8595 8596 8597 8598 39.76/40.04 8599 8600 8601 8602 8603 8604 8605 8606 8607 8608 39.76/40.04 8609 8610 8611 8612 8613 8614 8615 8616 8617 8618 39.76/40.04 8619 8620 8621 8622 8623 8624 8625 8626 8627 8628 39.76/40.04 8629 8630 8631 8632 8633 8634 8635 8636 8637 8638 39.76/40.04 8639 8640 8641 8642 8643 8644 8652 8653 8654 8655 39.76/40.04 8656 8657 8658 8659 8660 8661 8662 8663 8664 8665 39.76/40.04 8666 8667 8668 8669 8670 8671 8672 8673 8674 8675 39.76/40.04 8676 8677 8678 8679 8680 8681 8682 8683 8684 8685 39.76/40.04 8686 8687 8688 8689 8690 8691 8692 8693 8694 8695 39.76/40.04 8696 8697 8698 8699 8700 8701 8702 8703 8704 8705 39.76/40.04 8706 8707 8715 8716 8717 8718 8719 8720 8721 8722 39.76/40.04 8723 8724 8725 8726 8727 8728 8729 8730 8731 8732 39.76/40.04 8733 8734 8735 8736 8737 8738 8739 8740 8741 8742 39.76/40.04 8750 8751 8752 8753 8754 8755 8756 8757 8758 8759 39.76/40.04 8760 8761 8762 8763 8764 8765 8766 8767 8768 8769 39.76/40.04 8770 8771 8772 8773 8774 8775 8776 8777 8778 8779 39.76/40.04 8780 8781 8782 8783 8784 8785 8786 8787 8788 8789 39.76/40.04 8790 8791 8792 8793 8794 8795 8796 8797 8798 8799 39.76/40.04 8800 8801 8802 8803 8804 8805 8813 8814 8815 8816 39.76/40.04 8817 8818 8819 8820 8821 8822 8823 8824 8825 8826 39.76/40.04 8827 8828 8829 8830 8831 8832 8833 8834 8835 8836 39.76/40.04 8837 8838 8839 8840 8848 8849 8850 8851 8852 8853 39.76/40.04 8854 8855 8856 8857 8858 8859 8860 8861 8862 8863 39.76/40.04 8864 8865 8866 8867 8868 8869 8870 8871 8872 8873 39.76/40.04 8874 8875 8876 8877 8878 8879 8880 8881 8882 8883 39.76/40.04 8884 8885 8886 8887 8888 8889 8890 8891 8892 8893 39.76/40.04 8894 8895 8896 8897 8898 8899 8900 8901 8902 8903 39.76/40.04 8911 8912 8913 8914 8915 8916 8917 8918 8919 8920 39.76/40.04 8921 8922 8923 8924 8925 8926 8927 8928 8929 8930 39.76/40.04 8931 8932 8933 8934 8935 8936 8937 8938 8946 8947 39.76/40.04 8948 8949 8950 8951 8952 8953 8954 8955 8956 8957 39.76/40.04 8958 8959 8960 8961 8962 8963 8964 8965 8966 8967 39.76/40.04 8968 8969 8970 8971 8972 8973 8981 8982 8983 8984 39.76/40.04 8985 8986 8987 8988 8989 8990 8991 8992 8993 8994 39.76/40.04 8995 8996 8997 8998 8999 9000 9001 9002 9003 9004 39.76/40.04 9005 9006 9007 9008 9009 9010 9011 9012 9013 9014 39.76/40.04 9015 9016 9017 9018 9019 9020 9021 9022 9023 9024 39.76/40.04 9025 9026 9027 9028 9029 9030 9031 9032 9033 9034 39.76/40.04 9035 9036 9044 9045 9046 9047 9048 9049 9050 9051 39.76/40.04 9052 9053 9054 9055 9056 9057 9058 9059 9060 9061 39.76/40.04 9062 9063 9064 9065 9066 9067 9068 9069 9070 9071 39.76/40.04 9079 9080 9081 9082 9083 9084 9085 9086 9087 9088 39.76/40.04 9089 9090 9091 9092 9093 9094 9095 9096 9097 9098 39.76/40.04 9099 9100 9101 9102 9103 9104 9105 9106 9107 9108 39.76/40.04 9109 9110 9111 9112 9113 9114 9115 9116 9117 9118 39.76/40.04 9119 9120 9121 9122 9123 9124 9125 9126 9127 9128 39.76/40.04 9129 9130 9131 9132 9133 9134 9142 9143 9144 9145 39.76/40.04 9146 9147 9148 9149 9150 9151 9152 9153 9154 9155 39.76/40.04 9156 9157 9158 9159 9160 9161 9162 9163 9164 9165 39.76/40.04 9166 9167 9168 9169 9170 9171 9172 9173 9174 9175 39.76/40.04 9176 9177 9178 9179 9180 9181 9182 9183 9184 9185 39.76/40.04 9186 9187 9188 9189 9190 9191 9192 9193 9194 9195 39.76/40.04 9196 9197 9205 9206 9207 9208 9209 9210 9211 9212 39.76/40.04 9213 9214 9215 9216 9217 9218 9219 9220 9221 9222 39.76/40.04 9223 9224 9225 9226 9227 9228 9229 9230 9231 9232 39.76/40.04 9240 9241 9242 9243 9244 9245 9246 9247 9248 9249 39.76/40.04 9250 9251 9252 9253 9254 9255 9256 9257 9258 9259 39.76/40.04 9260 9261 9262 9263 9264 9265 9266 9267 9268 9269 39.76/40.04 9270 9271 9272 9273 9274 9275 9276 9277 9278 9279 39.76/40.04 9280 9281 9282 9283 9284 9285 9286 9287 9288 9289 39.76/40.04 9290 9291 9292 9293 9294 9295 9303 9304 9305 9306 39.76/40.04 9307 9308 9309 9310 9311 9312 9313 9314 9315 9316 39.76/40.04 9317 9318 9319 9320 9321 9322 9323 9324 9325 9326 39.76/40.04 9327 9328 9329 9330 9338 9339 9340 9341 9342 9343 39.76/40.04 9344 9345 9346 9347 9348 9349 9350 9351 9352 9353 39.76/40.04 9354 9355 9356 9357 9358 9359 9360 9361 9362 9363 39.76/40.04 9364 9365 9366 9367 9368 9369 9370 9371 9372 9373 39.76/40.04 9374 9375 9376 9377 9378 9379 9380 9381 9382 9383 39.76/40.04 9384 9385 9386 9387 9388 9389 9390 9391 9392 9393 39.76/40.04 9401 9402 9403 9404 9405 9406 9407 9408 9409 9410 39.76/40.04 9411 9412 9413 9414 9415 9416 9417 9418 9419 9420 39.76/40.04 9421 9422 9423 9424 9425 9426 9427 9428 9436 9437 39.76/40.04 9438 9439 9440 9441 9442 9443 9444 9445 9446 9447 39.76/40.04 9448 9449 9450 9451 9452 9453 9454 9455 9456 9457 39.76/40.04 9458 9459 9460 9461 9462 9463 9464 9465 9466 9467 39.76/40.04 9468 9469 9470 9471 9472 9473 9474 9475 9476 9477 39.76/40.04 9478 9479 9480 9481 9482 9483 9484 9485 9486 9487 39.76/40.04 9488 9489 9490 9491 9499 9500 9501 9502 9503 9504 39.76/40.04 9505 9506 9507 9508 9509 9510 9511 9512 9513 9514 39.76/40.04 9515 9516 9517 9518 9519 9520 9521 9522 9523 9524 39.76/40.04 9525 9526 9534 9535 9536 9537 9538 9539 9540 9541 39.76/40.04 9542 9543 9544 9545 9546 9547 9555 9556 9557 9558 39.76/40.04 9559 9560 9561 9569 9570 9571 9572 9573 9574 9575 39.76/40.04 9583 9584 9585 9586 9587 9588 9589 9597 9598 9599 39.76/40.04 9600 9601 9602 9603 9611 9612 9613 9614 9615 9616 39.76/40.04 9617 9625 9626 9627 9628 9629 9630 9631 9639 9640 39.76/40.04 9641 9642 9643 9644 9645 9660 9661 9662 9663 9664 39.90/40.17 9665 9666 9667 9668 9669 9670 9671 9672 9673 9688 39.90/40.17 9689 9690 9691 9692 9693 9694 9702 9703 9704 9705 39.90/40.17 9706 9707 9708 9716 9717 9718 9719 9720 9721 9722 39.90/40.17 9730 9731 9732 9733 9734 9735 9736 9744 9745 9746 39.90/40.17 9747 9748 9749 9750 9765 9766 9767 9768 9769 9770 39.90/40.17 9771 9779 9780 9781 9782 9783 9784 9785 9793 9794 39.90/40.17 9795 9796 9797 9798 9799 9807 9808 9809 9810 9811 39.90/40.17 9812 9813 9821 9822 9823 9824 9825 9826 9827 9835 39.90/40.17 9836 9837 9838 9839 9840 9841 9849 9850 9851 9852 39.90/40.17 9853 9854 9855 9863 9864 9865 9866 9867 9868 9869 39.90/40.17 9877 9878 9879 9880 9881 9882 9883 9891 9892 9893 39.90/40.17 9894 9895 9896 9897 9905 9906 9907 9908 9909 9910 39.90/40.17 9911 9919 9920 9921 9922 9923 9924 9925 9933 9934 39.90/40.17 9935 9936 9937 9938 9939 9947 9948 9949 9950 9951 39.90/40.17 9952 9953 9961 9962 9963 9964 9965 9966 9967 9975 39.90/40.17 9976 9977 9978 9979 9980 9981 9982 9983 9984 9985 39.90/40.17 9986 9987 9988 9989 9990 9991 9992 9993 9994 9995 39.90/40.17 9996 9997 9998 9999 10000 10001 10002 10003 10004 10005 39.90/40.17 10006 10007 10008 10009 10010 10011 10012 10013 10014 10015 39.90/40.17 10016 10017 10018 10019 10020 10021 10022 10023 10024 10025 39.90/40.17 10026 10027 10028 10029 10030 10031 10032 10033 10034 10035 39.90/40.17 10036 10037 10038 10039 10040 10041 10042 10043 10044 10045 39.90/40.17 10046 10047 10048 10049 10050 10051 10052 10053 10054 10055 39.90/40.17 10056 10057 10058 10059 10060 10061 10062 10063 10064 10065 39.90/40.17 10066 10067 10068 10069 10070 10071 10072 10073 10074 10075 39.90/40.17 10076 10077 10078 10079 10080 10081 10082 10083 10084 10085 39.90/40.17 10086 10087 10088 10089 10090 10091 10092 10093 10094 10095 39.90/40.17 10096 10097 10098 10099 10100 10101 10102 10103 10104 10105 39.90/40.17 10106 10107 10108 10109 10110 10111 10112 10113 10114 10115 39.90/40.17 10116 10117 10118 10119 10120 10121 10122 10123 10124 10125 39.90/40.17 10126 10127 10128 10129 10130 10131 10132 10133 10134 10135 39.90/40.17 10136 10137 10138 10139 10140 10141 10142 10143 10144 10145 39.90/40.17 10146 10147 10148 10149 10150 10151 10152 10153 10154 10155 39.90/40.17 10156 10157 10158 10159 10160 10161 10162 10163 10164 10165 39.90/40.17 10166 10167 10168 10169 10170 10171 10172 10173 10174 10175 39.90/40.17 10176 10177 10178 10179 10180 10181 10182 10183 10184 10185 39.90/40.17 10186 10187 10188 10189 10190 10191 10192 10193 10194 10195 39.90/40.17 10196 10197 10198 10199 10200 10201 10202 10203 10204 10205 39.90/40.17 10206 10207 10208 10209 10210 10211 10212 10213 10214 10215 39.90/40.17 10216 10217 10218 10219 10220 10221 10222 10223 10224 10225 39.90/40.17 10226 10227 10228 10229 10230 10231 10232 10233 10234 10235 39.90/40.17 10236 10237 10238 10239 10240 10241 10242 10243 10244 10245 39.90/40.17 10246 10247 10248 10249 10250 10251 10252 10253 10254 10255 39.90/40.17 10256 10257 10258 10259 10260 10261 10262 10263 10264 10265 39.90/40.17 10266 10267 10268 10269 10270 10271 10272 10273 10274 10275 39.90/40.17 10276 10277 10278 10279 10280 10281 10282 10283 10284 10285 39.90/40.17 10286 10287 10288 10289 10290 10291 10292 10293 10294 10295 39.90/40.17 10296 10297 10298 10299 10300 10301 10302 10303 10304 10305 39.90/40.17 10306 10307 10308 10309 10310 10311 10312 10313 10314 10315 39.90/40.17 10316 10317 10318 10319 10320 10321 10322 10323 10324 10325 39.90/40.17 10326 10327 10328 10329 10330 10331 10332 10333 10334 10335 39.90/40.17 10336 10337 10338 10339 10340 10341 10342 10343 10344 10345 39.90/40.17 10346 10347 10348 10349 10350 10351 10352 10353 10354 10355 39.90/40.17 10356 10357 10358 10359 10360 10361 10362 10363 10364 10365 39.90/40.17 10366 10367 10368 10369 10370 10371 10372 10373 10374 10375 39.90/40.17 10376 10377 10378 10379 10380 10381 10382 10383 10384 10385 39.90/40.17 10386 10387 10388 10389 10390 10391 10392 10393 10394 10395 39.90/40.17 10396 10397 10398 10399 10400 10401 10402 10403 10404 10405 39.90/40.17 10406 10407 10408 10409 10410 10411 10412 10413 10414 10415 39.90/40.17 10416 10417 10418 10419 10420 10421 10422 10423 10424 10425 39.90/40.17 10426 10427 10428 10429 10430 10431 10432 10433 10434 10435 39.90/40.17 10436 10437 10438 10439 10440 10441 10442 10443 10444 10445 39.90/40.17 10446 10447 10448 10449 10450 10451 10452 10453 10454 10455 39.90/40.17 10456 10457 10458 10459 10460 10461 10462 10463 10464 10465 39.90/40.17 10466 10467 10468 10469 10470 10471 10472 10473 10474 10475 39.90/40.17 10476 10477 10478 10479 10480 10481 10482 10483 10484 10485 39.90/40.17 10486 10487 10488 10489 10490 10491 10492 10493 10494 10495 39.90/40.17 10496 10497 10498 10499 10500 10501 10502 10503 10504 10505 39.90/40.17 10506 11153 11154 11155 11156 11157 11158 11159 11167 11168 39.90/40.17 11169 11170 11Alarm clock 119.77/120.05 Prover9 interrupted 119.77/120.05 EOF