\DOC BINOP_CONV \TYPE {BINOP_CONV : conv -> conv} \SYNOPSIS Applies a conversion to both arguments of a binary operator. \DESCRIBE If {c} is a conversion where {c `l`} returns {|- l = l'} and {c `r`} returns {|- r = r'}, then {BINOP_CONV c `op l r`} returns {|- op l r = op l' r'}. The term {op} is arbitrary, but is often a constant such as addition or conjunction. \FAILURE Never fails when applied to the conversion. But may fail when applied to the term if one of the core conversions fails or returns an inappropriate theorem on the subterms. \EXAMPLE { # BINOP_CONV NUM_ADD_CONV `(1 + 1) * (2 + 2)`;; val it : thm = |- (1 + 1) * (2 + 2) = 2 * 4 } \SEEALSO ABS_CONV, BINOP2_CONV, COMB_CONV, COMB2_CONV, RAND_CONV, RATOR_CONV. \ENDDOC