hades94720
New member
- Joined
- May 22, 2016
- Messages
- 1
I have this worked solution:
(a) Evaluate the definite integral.
. . . . .\(\displaystyle \mbox{(i) }\, \)\(\displaystyle \displaystyle \int_0^2\, \bigg[\, 3\, f'(x)\, -\, 4x\, g'(x^2)\, \bigg]\, dx\)
Solution:
. . . . . . . . .\(\displaystyle \displaystyle \int_0^2\, \bigg[\, 3\, f'(x)\, -\, 4x\, g'(x^2)\, \bigg]\, dx\, =\, \bigg[\, 3\, f(x)\, -\, 2\, g(x^2)\, \bigg]\, \bigg|_0^2\)
I don't understand why the '4x' would be changed to 2; it should be 2x^2 (by 4* x^(1+1)/(1+1)),
isn't it ?
Should it be [3f(x)- 2x^2 g(x^2)] ?
Thanks.
(a) Evaluate the definite integral.
. . . . .\(\displaystyle \mbox{(i) }\, \)\(\displaystyle \displaystyle \int_0^2\, \bigg[\, 3\, f'(x)\, -\, 4x\, g'(x^2)\, \bigg]\, dx\)
Solution:
. . . . . . . . .\(\displaystyle \displaystyle \int_0^2\, \bigg[\, 3\, f'(x)\, -\, 4x\, g'(x^2)\, \bigg]\, dx\, =\, \bigg[\, 3\, f(x)\, -\, 2\, g(x^2)\, \bigg]\, \bigg|_0^2\)
I don't understand why the '4x' would be changed to 2; it should be 2x^2 (by 4* x^(1+1)/(1+1)),
isn't it ?
Should it be [3f(x)- 2x^2 g(x^2)] ?
Thanks.
Attachments
Last edited by a moderator: