If `alpha, beta` are the roots of `x^(2) + x + 1 = 0`, then the equation whose roots are `(1)/(alpha^(3)), (1)/(beta^(3))`is

Assertion (A) : If alpha, beta are the roots of ax^(2) + bx + c = 0 then the equation whose roots are (alpha-1)/(alpha), (beta-1)/(beta) is c(1-x)^(2)+ b(1-x)+a=0 Reason (R): If alpha, beta are the roots of f(x) = 0 then the equation whose roots are (alpha-1)/(alpha) and (beta-1)/(beta) is f((1)/(1-x))=0

If alpha, beta are the roots of x^(2)+6x+9=0 , then the equation whose roots are (1)/(alpha), (1)/(beta) is

If alpha, beta are the roots of x^(2)-3x+1=0 , then the equation whose roots are (1/(alpha-2),1/(beta-2)) is

If alpha, beta are the roots of x^(2)+2x+5=0 , then the equation whose roots are (alpha+1)/(alpha), (beta+1)/(beta) is

If alpha, beta are the roots of 2x^(2) + 5x + 2 = 0 , then the equation with roots (1)/(alpha+1), (1)/(beta+1) is

If alpha, beta are the roots of x^(2)+2x-1=0 , then the equation whose roots are alpha^(2), beta^(2) is

If alpha, beta are the roots of x^(2)+x+1=0 , then the equation whose roots are alpha^(5), beta^(5) is

If alpha, beta are the roots of x^(2) - x + 1 = 0 then the quadratic equation whose roots are alpha^(2015), beta^(2015) is

If alpha, beta are the roots of x^(2)+3x+1=0 , then the equation whose roots 2-alpha, 2-beta is

If alpha and beta are the roots of ax^(2)+bx+c=0 , form the equation whose roots are (1)/(alpha) and (1)/(beta) .