If x = -1 and x = 2 are extreme points of f(x) = `alpha log|x| + beta x^2 + x`, then

If x=-1 and x = 2 are extreme points of f(x)=alphalog|x|+betax^(2)+x then-

If x=-1 and x=2 are extreme points of f(x)=alphalog|x|+beta|x|^2+x then :

Let a, binR be such that the function f given by f(x)=ln|x|+bx^2+ax,xne0 has extreme values at x = -1 and x = 2 Statement 1:f has local maximum ar x=-1 and x=2. Statement 2: a=1/2 and b=1/4

a, b in RR be such that the function f given by f(x)=ln|x|+bx^(2)+ax,xne0 has extreme values at x=-1 and x = 2. Statement-I : f has local maximum at x = -1 and at x = 2. Statement-II : a=(1)/(2)" and "b=-(1)/(4) .

Let f (x)=x^2+b_1x+c_1 and g(x)=x^2+b_2x+c_2 . When f(x)=0 then the real roots of f(x) are alpha,beta and when g(x)=0 then the real roots of g(x) are alpha+h,beta+h . Minimum value of f(x) is -1/4 and when x= 7/2 then value of g(x) will be minimum. Minimum value of g(x) is-

Let f (x)=x^2+b_1x+c_1 and g(x)=x^2+b_2x+c_2 . When f(x)=0 then the real roots of f(x) are alpha,beta and when g(x)=0 then the real roots of g(x) are alpha+h,beta+h . Minimum value of f(x) is -1/4 and when x= 7/2 then value of g(x) will be minimum. Roots of g(x)=0 are-

Let f (x)=x^2+b_1x+c_1 and g(x)=x^2+b_2x+c_2 . When f(x)=0 then the real roots of f(x) are alpha,beta and when g(x)=0 then the real roots of g(x) are alpha+h,beta+h . Minimum value of f(x) is 1/4 and when x= 7/2 then value of g(x) will be minimum. Value of b_2 is-

If f(x) = 27x^3 + 1/x^3 and alpha, beta are the roots of 3x + 1/x = 2 then

The function f (x) = log (x+ sqrt(x^(2) +1)) 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