Answer:
Option A.
Step-by-step explanation:
Remainder theorem: If a polynomial P(x) divided by (x-c), then the remainder is P(c). It means if c is a root of P(x), then P(c)=0.
The given polynomial is
[tex]f(x)=3x^3+6x^2-26x-8[/tex]
Substitute x=-4 in the given polynomial.
[tex]f(-4)=3(-4)^3+6(-4)^2-26(-4)-8[/tex]
[tex]f(-4)=3(-64)+6(16)-26(-4)-8[/tex]
[tex]f(-4)=-192+96+104-8[/tex]
[tex]f(-4)=0[/tex]
Similarly,
Substitute x=-2 in the given polynomial.
[tex]f(-2)=3(-2)^3+6(-2)^2-26(-2)-8=44[/tex]
Substitute x=2 in the given polynomial.
[tex]f(2)=3(2)^3+6(2)^2-26(2)-8=-12[/tex]
Substitute x=4 in the given polynomial.
[tex]f(4)=3(4)^3+6(4)^2-26(4)-8=176[/tex]
From the given options only at x=-4 the value of function is 0. It means remainder is 0 at x=-4.
-4 is a root of the given polynomial. Therefore the correct option is A.
