Can somebody look at my solution for this question and point out where I'm going wrong?
The answer is [(square root of 5) - 1 ]
Q: find integral of: X / {sq root(1 + X^2)}
My solution:
let u =X^2
du=2X dx
at X=2, u=4 and at X=0, u=0
Therefore integral becomes (with limits 4 and 0):
{ [0.5 du] / [sq root of (1+u)] }
= 0.5 [ ln {(sq root of u) + (sq root of u+1)} ] (limits are 4 and 0]
= 0.5 ln(2 + sq root of 5)
Thanks
bcd
The answer is [(square root of 5) - 1 ]
Q: find integral of: X / {sq root(1 + X^2)}
My solution:
let u =X^2
du=2X dx
at X=2, u=4 and at X=0, u=0
Therefore integral becomes (with limits 4 and 0):
{ [0.5 du] / [sq root of (1+u)] }
= 0.5 [ ln {(sq root of u) + (sq root of u+1)} ] (limits are 4 and 0]
= 0.5 ln(2 + sq root of 5)
Thanks
bcd