(x^(2)-bx)/(ax-c)=(m-1)/(m+1)

If (x^(2)-bx)/(ax-b)=(m-1)/(m+1) has roots which are numerically equal but of opposite signs,the value of m must be:

If alpha and beta are the roots of ax^(2)+bx+c=0 then the equation ax^(2)-bx(x-1)+c(x-1)^(2)=0 has roots

If alpha,beta are the roots of the equation ax^(2)+bx+c=0, then find the roots of the equation ax^(2)-bx(x-1)+c(x-1)^(2)=0 in term of alpha and beta.

if alpha& beta are the roots of the quadratic equation ax^(2)+bx+c=0, then the quadratic equation ax^(2)-bx(x-1)+c(x-1)^(2)=0 has roots

If x_(1) and x_(2) are the real and distinct roots of ax^(2)+bx+c=0 then prove that lim_(xtox1) (1+sin(ax^(2)+bx+c))^(1/(x-x_(1)). equals to

If alpha, beta are the zeroes of ax^(2)+bx+c , then evaluate : lim_(x to beta)(1-cos(ax^(2)+bx+c))/(x-beta)^(2) .

Let alpha,beta(alpha