Let f(x)=a x^2-b|x|, where aa n db are c...

Let `f(x)=a x^2-b|x|,` where `aa n db` are constants. Then at `x=0,f(x)` has a maxima whenever `a >0,b >0` a maxima whenever `a >0,b<0` minima whenever `a >0,b<0` neither a maxima nor a minima whenever `a >0, b<0`

Similar Questions

Explore conceptually related problems

Let f(x)=a x^2-b|x|, where aa n db are constants. Then at x=0,f(x) has a maxima whenever a >0,b >0 a maxima whenever a >0,b 0,b 0, b<0

Let f(x)=a x^2-b|x|, where aa n db are constants. Then at x=0,f(x) has A. a maxima whenever a >0,b >0 B. a maxima whenever a >0,b 0,b 0, b<0

Let f(x)=ax^(2)-b|x|, where a and b are constants.Then at x=0,f(x) has a maxima whenever a>0,b>0 a maxima whenever a>0,b 0,b 0,b<0

Let f(x)=ax^(2)-b|x| , where a and b are constant . Then at x=0 , f(x) has

Let f(x) =ax^(2) -b|x| , where a and b are constants. Then at x = 0, f (x) is

Let f(x)=a+b|x|+c|x|^(2) , where a,b,c are real constants. The, f'(0) exists if

A function is defined as f(x) = ax^(2) – b|x| where a and b are constants then at x = 0 we will have a maxima of f(x) if