The value m for which one of the roots o...

The value `m` for which one of the roots of `x^2-3x+2m=0` is double of one of the roots of `x^2-x+m=0` is `-2` b. `1` c. `2` d. none of these

Similar Questions

Explore conceptually related problems

Find the value of m for which one of the roots of x^(2)-3x+2m=0 is double of one of the roots of x^(2)-x+m=0

The value of m for which one root of x^(2)-3x+2m=0 is double of one of the roots of X^(2)-X+m=0 is:

The value of 'k' for which one of the roots of x^(2) - x + 3 k = 0 , is double of one of the roots of x^(2) - x + k = 0 , is

If one root of x^(3)+4x^(2)-4x-16=0 is double the other, then the roots are

The value of m for which the roots of the equation x^(2)+(m-2)x+m+2=0 are in the ratio 2:3 is

If one root of 2x^(3)+3x^(2)-8x+3=0 is the double the other then the roots are

Find the value of m for which the equation 5x^2-4x+2+m(4x^2-2x-1)=0 the product of the roots is 2

The value of m for which the equation x^(2)-x+m^(2)=0 has no real roots is given as

If the roots of x^(2)-2(7+3m)x+55m+45=0 are equal,then m

If the product of the roots of 5x^(2)-4x+2+m(4x^(2)-2x-1)=0 is 3, then m=