The condition on the polynomial `p(x)= ax^(2) + bx +c, a ne 0`, so that its zeroes are reciprocal of each other, is

If truth and lie are zeros of the polynomial px^(2)+qx+r , (p ne 0) and those zeros are reciprocal to each other, Find the relation between p and r .

The polynomial p(x)=ax^(2)+bx+c can have at most zeros, where ane0 :

The polynomial of type ax^(2)+bx+c , when a=0

If roots of 7x^(2) - 11 x + k = 0, k ne 0 are reciprocal of each other, then k is equal to

If the zero of the polynomial f(x)=k^(2)x^(2)-17x+k+2(k>0) are reciprocal of each other,then the value of k is

If one zero of the polynomial (3x^(2) + 8x + k) is the reciprocal of the other then value of k is:

If a,b in R and equality ax^(2)-bx+c=0 has complex roots which are reciprocal of each other,then one has :

If the zeroes of the polynomial f(x)=x^(3)-ax^(2)+bx+c are in arithmetic progression, then