The polynomial of degree 5, P{a:) has leading coefficient 1, has roots of multiplicity 2 at a: = 1 and a\": = 0 , and a root of multiplicity 1 at :1: = 3 Find a possible formula for 13(3). 13(3) 2 l , Find the quotient and remainder using ldng division for 32+?mi15 1113 ' The quotient i5| ' The remainder it | | \fFind the quotient and remainder u51 rig eynthetic division for m3+$2+13$+15 3+2 The quotient i5 | ' The remainder i5 | ' \f\fFind the quotient and remainder using long division. IEIl 3313 The quotient i5 '. ' The remainder is. | I The polynomial of degree 4, mej has a root of multiph'city 2 at a: = 3 and roots of multiplicity 1 at a: : U and :1: = 1. It goes through the point (5, 7'2). Find a formula for PM). 13(3) 2 i i , The polynomial of degree 3, P(:t:], has a root of multiplicity 2 at :1: : 4 and a root of multiplicity 1 at a: = 5. The y-iritercept is y = 32. Find a formula for P[$). Pm = \\_ \f