Sunday, December 25, 2011

`int_1^4 ((4 + 6u)/sqrt(u)) du` Evaluate the integral

`int_1^4(4+6u)/sqrt(u)du`


`=int_1^4(4/sqrt(u)+(6u)/sqrt(u))du`


`=int_1^4(4u^(-1/2)+6u^(1/2))du`


`=[4(u^(-1/2+1)/(-1/2+1))+6(u^(1/2+1)/(1/2+1))]_1^4`


`=[4(u^(1/2)/(1/2))+6(u^(3/2)/(3/2))]_1^4`


`=[8u^(1/2)+6*2/3u^(3/2)]_1^4`


`=[8(4)^(1/2)+4(4)^(3/2)]-[8(1)^(1/2)+4(1)^(3/2)]`


`=(8(2^2)^(1/2)+4(2^2)^(3/2))-(8+4)`

`=(16+4(2^3))-12`


`=(16+32)-12`

=36

No comments:

Post a Comment

How is Joe McCarthy related to the play The Crucible?

When we read its important to know about Senator Joseph McCarthy. Even though he is not a character in the play, his role in histor...