A quadratic equation `2x^2-3x+!` has zeroes as `alpha` and `beta` Now form a quadratic equation whose zeroes are `3alpha` and `3beta`

If the roots of the quadratic equation x^(2) - 3x - 304 = 0 are alpha and beta , then the quadratic equation with roots 3alpha and 3beta is

If alpha+beta=5 and alpha^(3) +beta^(3)=35 , find the quadratic equation whose roots are alpha and beta .

If alpha+beta=5 and alpha^(3) +beta^(3)=35 , find the quadratic equation whose roots are alpha and beta .

If alpha + beta = 5 and alpha^(3) + beta ^(3) = 35 , find the quadratic equation whose roots are alpha and beta .

The roots of the equation x^2+3x+4=0 are alpha and beta .Form the equations whose roots are (alpha+beta)^2 and (alpha-beta)^2

IF alpha + beta =- 2 and alpha ^3 + beta ^3 =- 56 , then the quadratic equation whose roots are alpha and beta is

If alpha and beta are the roots of the quadratic equation x^(2) + px + q = 0 , then form the quadratic equation whose roots are alpha + (1)/(beta), beta + (1)/(alpha)

3x^2-5x+2=0 is a quadratic equation the roots are alpha,beta then alpha^3+beta^3 is…………