Use the factor theorem to find the value...

Use the factor theorem to find the value of `k` for which `(a+2b),w h e r ea ,b!=0` is a factor of `a^4+32 b^4+a ^3 b(k+3)dot`

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Use the factor theorem to find the value of k for which (a+2b),w h e r ea ,b!=0 is a factor of a^4+32 b^4+a ^3b(k+3)dot

Use the factor theorem to find the value of k for which (a+2b), wherea,b!=0 is a factor of a^(4)+32b^(4)+a^(3)b(k+3)

The value of k for which x -1 is a factor of 4X^3 + 3x^2 - 4x + k is (A) A 3 (B) 1 (C) -2 (D) -3

If x^2+(a-b)x+(1-a-b)=0. w h e r ea ,b in R , then find the values of a for which equation has unequal real roots for all values of bdot

Find the value of k, if x - 1 is a factor of 4x^3 + 3x^2 -4x + k .

Factorize: 8a^3-b^3-4a x+2b x

Evaluate int_a^b(dx)/(sqrt(x)),w h e r ea , b > 0.

Evaluate int_a^b(dx)/(sqrt(x)),w h e r ea , b > 0.

Evaluate int_a^b(dx)/(sqrt(x)),w h e r ea , b > 0.

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