If p, q, r are real and `p ne q`, then the roots of the equation `(p-q)x^(2) +5(p+q) x-2(p-q) r` are

If p, q, are real and p ne q then the roots of the equation (p-q) x^(2)+5(p+q) x-2(p-q)=0 are

If p,qr are real and p!=q, then show that the roots of the equation (p-q)x^(2)+5(p+q)x-2(p-q=0 are real and unequal.

If p, a,rare real and p!=q ,then show that the roots of the equation (p-q)x^(2)+5(p+q)x-2(p-q)=0 are real and unequal.

If p , qr are real and p!=q , then show that the roots of the equation (p-q)x^2+5(p+q)x-2(p-q=0 are real and unequal.

If p,q are real p!=q, then show that the roots of the equation (p-q)x^(2)+5(p+q)x-2(p-q)=0 are real and unequal.

The roots of the equation (q-r)x^(2)+(r-p)x+(p-q)=0

The roots of the equation (q- r) x^(2) + (r - p) x + (p - q)= 0 are