If `alpha, beta(alpha,beta)` are the points of discontinuity of the function `f(f(x))`, where `f(x)=1/(1-x)`, then the set of values of a foe which the points `(alpha,beta)` and `(a,a^2)` lie on the same side of the line `x+2y-3=0` , is

If alpha, beta (alpha < beta) are the points of discontinuity of the function f(f(x)), where f(x)= frac(1)(1-x) then the set of values of a for which the points ( alpha , beta ) and (a , a^2 ) lie on the same side of the line x+2y-3 =0 is

If alpha, beta (where alpha lt beta ) are the points of discontinuity of the function g(x) = f(f(f(x))), where f(x) = (1)/(1-x). Then, The points of discontinuity of g(x) is

If alpha, beta (where alpha lt beta ) are the points of discontinuity of the function g(x) = f(f(f(x))), where f(x) = (1)/(1-x) . Then, The points of discontinuity of g(x) is

If alpha, beta (where alpha lt beta ) are the points of discontinuity of the function g(x) = f(f(f(x))), where f(x) = (1)/(1-x), and P(a, a^(2)) is any point on XY - plane. Then, The domain of f(g(x)), is

If alpha, beta (where alpha lt beta ) are the points of discontinuity of the function g(x) = f(f(f(x))), where f(x) = (1)/(1-x), and P(a, a^(2)) is any point on XY - plane. Then, The domain of f(g(x)), is

If alpha, beta (where alpha lt beta ) are the points of discontinuity of the function g(x) = f(f(f(x))), where f(x) = (1)/(1-x), and P(a, a^(2)) is any point on XY - plane. Then, The domain of f(g(x)), is

If alpha, beta (where alpha lt beta ) are the points of discontinuity of the function g(x) = f(f(f(x))), where f(x) = (1)/(1-x), and P(a, a^(2)) is any point on XY - plane. Then, The domain of f(g(x)), is

If alpha, beta (where alpha lt beta ) are the points of discontinuity of the function g(x) = f(f(x)) , where f(x) = (1)/(1-x), and P(a, a^(2)) is any point on XY - plane. Then, If point P(a, a^(2)) lies on the same side as that of (alpha, beta) with respect to line x + 2y - 3 = 0, then

If alpha, beta (where alpha lt beta ) are the points of discontinuity of the function g(x) = f(f(x)) , where f(x) = (1)/(1-x), and P(a, a^(2)) is any point on XY - plane. Then, If point P(a, a^(2)) lies on the same side as that of (alpha, beta) with respect to line x + 2y - 3 = 0, then

if alpha and beta are the root of the quadratic polynomial f(x) = x^2-5x+6 , find the value of (alpha^2 beta + beta^2 alpha)