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

Similar Questions

Explore conceptually related problems

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|+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 ar extreme points of f(x) = alpha log|x|+betax^(2)+x , then

If x=-1 and x=""2 are extreme points of f(x)""=alphalog|x|+betax^2+x , then (1) alpha=-6,beta=1/2 (2) alpha=-6,beta=-1/2 (3) alpha=2,beta=-1/2 (4) alpha=2,beta=1/2

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)=alpha log|x|+beta x^(2)+x , then :

If x = -1 and x= 2 are the extreme points of y= alpha log x+ beta x^2 + x then A) alpha =6, beta = 1/2 B) alpha =- 6, beta = - 1/2 C) alpha =2, beta = -1/2 D) alpha =2, beta = 1/2

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

Similar Questions

Recommended Questions