What is the value of `alpha (alpha ne 0)` for which `x^(2) - 5x + alpha` and `x^(2) - 7x + 2alpha` have a common factor?

The number of possible value of alpha for which expression y=(alpha x^(2)+7x-2)/(alpha+7x-2x^(2)) has atleast one common linear factor in numerator and denominator,is-

Find the value of alpha for which the equation (alpha-12)x^(2)+2(alpha-12)x+2=0 has equal roots.

If alpha-x is a factor of x^(2)-ax+b, then alpha(a-alpha) is equal to-

The value of alpha in (-pi, 0) satisfying sin alpha+int_(alpha)^(2alpha) cos2 x dx=0 , is

If alpha,beta are the roots of 3x^(2)-5x+7=0 then alpha^(3)+beta^(3)=

The value of 'c' for which |alpha^(2) - beta^(2)| = 7//4 , where alpha and beta are the roots of 2 x^(2) + 7 x + c = 0 , is

If root of the equation x^(2) + ax + b = 0 are alpha , beta , then the roots of x^(2) + (2 alpha + a) x + alpha^(2) + a alpha + b = 0 are

If the equations 2x^(2)+alpha x+alpha=0 and x^(2)+2x+2 alpha=0 have acommon root then find the number of integral values of alpha