The total number of extremum(s) of y=int...

The total number of extremum(s) of `y=int_0^(x^2)(t^2-5t+4)/(2+e^t)dt` are

A

`x=-2`

B

`x=1`

C

`x=0`

D

`x=-1`

Text Solution

Verified by Experts

The correct Answer is:

A, B, C, D

Promotional Banner

Promotional Banner

Recommended Questions

The total number of extremum(s) of y=int0^(x^2)(t^2-5t+4)/(2+e^t)dt ar...
Text Solution
|
The total number of extremum(s) of y=int(0)^(x^(2))(t^(2)-5t+4)/(2+e^(...
Text Solution
|
The poins of extremum of phi(x)=int(1)^(x) e^(-t^(2)//2) (1-t^(2))dt a...
Text Solution
|
If w = e ^(xy) wh4ere x = t ^(2), y = t ^(3) show that (dw)/(dt)=5t ^(...
Text Solution
|
int0^(x^2)(t^2-5t+4)/(2+e^')dt के चरम बिन्दु (Points of extremum) है
Text Solution
|
If int0^1 (e^t)/(1 + t) dt = a, then int0^1 (e^t)/((1 + t)^(2))dt is e...
Text Solution
|
Prove that int0^x e^(x t-t^2) dt=e^(x^(2)/4)int0^x e^-(t^(2)/4)dt
Text Solution
|
If int0^y cos t^2\ dt = int0^(x^2)\ sint/t \ dt, then dy/dx is equal t...
Text Solution
|
Find the points of extremum of the following functions : (a) F(x) ...
Text Solution
|