Find the value of a , if `( x - 2)` is a factor of `x^2 - ax + 6` .

Find the value of 'a' if (x-2) is a factor of 2x^3-6x^2+5x+a

Use the factor theorem to determine whether ( x - 2 ) is a factor of x^3 - 3x^2 + 4x - 4 or not .

For what value of m is (x-3) a factor of the polynomial 3x^3 -mx^2 +x +6 ?

Use the factor theorem to determine whether ( x + 1 ) is a factor of 2x^3 + 4x + 6 or not .

Using factor theorem show that : (x-2) is a factor of x^3-3x^2+4x+4

Find the values of x, for using the function f(x)= x^3 +12 x^2 +36x+6 is Monotonically increasing

(x-4) and (x-1/3) are the factors of the polynomial ax^2 -13x +b . Complete the following activity to find the values of a and b. p(x) =ax^2 -13x +b . (x-4) os the factor of p(x)

(x-3) and (x-1/3) are the factors of the polynomial ax^2 -10x +b . Complete the following activity to find the values of a and b. p(x) =ax^2 -10x +b . By factor theorem,p(3) =0 ,

Factorize : 2x^(2)-8x+6