Use power series operations to find the taylor series at xequals=0 for the following function. x cubedx3sine startfraction 3 pi x over 2 endfractionsin 3πx 2 the taylor series for sine xsinx is a commonly known series. what is the taylor series at xequals=0 for sine xsinx? summation from n equals 0 to infinity∑n=0[infinity] startfraction left parenthesis negative 1 right parenthesis superscript n baseline times x superscript 2 n plus 1 over left parenthesis 2 n plus 1 right parenthesis exclamation mark endfraction (−1)n•x2n+1 (2n+1)! (type an exact answer.) use power series operations and the taylor series at xequals=0 for sine xsinx to find the taylor series at xequals=0 for the given function.