The number of integral values of 'm' less than 50, so that the roots of the quadratic equation`mx^2+(2m-1)x+(m-2)=0` are rational are

The number of integral values of 'm' less than 50 so that the roots of the quudratic equation mx^(2)+(2m-1)x+(m-2)=0 are rational are

The roots of the quadratic equation m^2-3m+1=0 are

The roots of the quadratic equation m^2-3m+1=0 are

Find m, if the quadratic equation x^2-2(m+1)x+m^2=0

The quadratic equation x^(2) - (m -3)x + m =0 has

Find m, if the quadratic equation (m-1)x^2-2(m-1)x+1=0 has real and equal roots.

Find m, if the quadratic equation (m-1)x^2-2(m-1)x+1=0 has real and equal roots.

If the roots of the equation lx^(2) +mx +m=0 are in the ratio p:q, then

The integral value of m for which the root of the equation m x^2+(2m-1)x+(m-2)=0 are rational are given by the expression [where n is integer] (A)n^2 (B) n(n+2) (C) n(n+1) (D) none of these

Find m, if the quadratic equation (m-12)x^(2)+2(m-12)x+2=0 has real and eqaul roots.