The zeroes of the quadratic polynomial `x^(2) +kx +k` where `k ne 0`,

The zeroes of the quadratic polynomial x^(2)+kx+k, k≠0

If the zeroes of the quadratic polynomial ax^(2) +bx +c , where c ne 0 , are equal, then

If the sum of the zeroes of the quadratic polynomial 3x^(2)-kx+6 is 3 ,then find the value of K.

If one of the zeroes of the quadratic polynomial (k-1)x^(2)+kx+1 is -3 then the value of k is : (A) (4)/(3) (B) (-4)/(3) (C) (2)/(3) (D) (-2)/(3)

If alpha and beta be the zeroes of the quadratic polynomial p(x) = 2x^2 - kx + 7 since that alpha^2 + beta^2 - 1/2 alpha beta = (23)/(2) , find the value of k.

If the sum of the zeros of the quadratic polynomial kx^(2)+2x + 3k is equal to the product of its zeros then k = ?

If one zero of the quadratic polynomial kx^(2) + 3x+k is 2 then the value of k is

If one of the zeroes of the quadratic polynomial (k-1)x^(2)+kx+1 is -3 ,then the value of k is

Find the value of 'k' so that the zeros of the quadratic polynomial 3x^(2)-kx+14 are in the ratio 7:6

If the sum of the squares of zeroes of the quadratic polynomial f(x) = x^(2) - 8x + k is 40, find the value of k.