Answer:
The product polynomial will be of eight degree of x.
Step-by-step explanation:
Sammy wrote a three degree single variable polynomial of x.
Let us assume that the polynomial is (px³+qx²+rx+s) where, p, q, r, and s are any arbitrary constants.
Now, Myisha wrote a five-degree single variable polynomial of x.
Let us assume that the polynomial is ([tex]ax^{5} +bx^{4}+cx^{3}+dx^{2} +ex+f[/tex]) where, a, b, c, d, e, anf f are any arbitrary constants.
Hence, if we multiply Sammy's three-degree polynomial (px³+qx²+rx+s) with Myisha's five-degree polynomial ([tex]ax^{5} +bx^{4}+cx^{3}+dx^{2} +ex+f[/tex]) then it is clear that the maximum degree of the polynomial obtained will be (3+5) =8.
Therefore, the product polynomial will be of eight degrees of x. (Answer)
