# SZS status Theorem
# SZS status Theorem
# SZS output start CNFRefutation.
fof(1, conjecture,![X1]:p(s(t_bool,h4s_integers_intu_u_divides(s(t_h4s_integers_int,h4s_integers_intu_u_ofu_u_num(s(t_h4s_nums_num,h4s_arithmetics_numeral(s(t_h4s_nums_num,h4s_arithmetics_bit1(s(t_h4s_nums_num,h4s_arithmetics_zero))))))),s(t_h4s_integers_int,X1)))),file('i/f/integer/INT__DIVIDES__1_c0', ch4s_integers_INTu_u_DIVIDESu_u_1u_c0)).
fof(2, axiom,~(p(s(t_bool,f))),file('i/f/integer/INT__DIVIDES__1_c0', aHLu_FALSITY)).
fof(27, axiom,![X15]:![X16]:(p(s(t_bool,h4s_integers_intu_u_divides(s(t_h4s_integers_int,X16),s(t_h4s_integers_int,X15))))<=>?[X20]:s(t_h4s_integers_int,h4s_integers_intu_u_mul(s(t_h4s_integers_int,X20),s(t_h4s_integers_int,X16)))=s(t_h4s_integers_int,X15)),file('i/f/integer/INT__DIVIDES__1_c0', ah4s_integers_INTu_u_DIVIDES)).
fof(28, axiom,![X1]:s(t_h4s_integers_int,h4s_integers_intu_u_mul(s(t_h4s_integers_int,X1),s(t_h4s_integers_int,h4s_integers_intu_u_ofu_u_num(s(t_h4s_nums_num,h4s_arithmetics_numeral(s(t_h4s_nums_num,h4s_arithmetics_bit1(s(t_h4s_nums_num,h4s_arithmetics_zero)))))))))=s(t_h4s_integers_int,X1),file('i/f/integer/INT__DIVIDES__1_c0', ah4s_integers_INTu_u_MULu_u_RID)).
fof(30, axiom,![X5]:(s(t_bool,X5)=s(t_bool,t)|s(t_bool,X5)=s(t_bool,f)),file('i/f/integer/INT__DIVIDES__1_c0', aHLu_BOOLu_CASES)).
fof(31, axiom,p(s(t_bool,t)),file('i/f/integer/INT__DIVIDES__1_c0', aHLu_TRUTH)).
# SZS output end CNFRefutation
