B. -3
The value of a for given polynomial is -3
Step-by-step explanation:
Factor theorem for polynomials,
If (x-c) is a factor of polynomial f(x), then f(c)=0
Given: x+a is a factor of polynomial
Let
By Factor theorem, since x+a is a factor of f(x),
![(x+a)=[x-(-a)]\\So,\ f(-a)=0](https://img.qammunity.org/2021/formulas/history/middle-school/dtf4qbpbexmnnyokr0sun68ua5k13kp63o.png)
Substituting
in f(x)=0, we get
![f(x) = 4x^3-13x^2-ax = 0\\f(-a)= [4(-a)^3]-[13(-a)^2]-[a(-a)] = 0\\(-4a^3-13a^2+a^2)=0\\(-4a^3-12a^2)=0\\-4a^3=12a^2\\(a^3)/(a^2) =(12)/(-4) \\\\a=(-3)](https://img.qammunity.org/2021/formulas/history/middle-school/svscrco4jmk7i2nehsztaxg8v9frd1ggzr.png)
Therefore, value of a is (-3)