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Integration (1 Viewer)
- Thread starter YannY
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Pimpcess.Snaz
Guest
This is a bitch.
I tried to do it using the parts method where i made
u = lnsinx
du = cosx/sinx
and dv = dx
v = x
Then i got I = xlnsinx - integral (xcosx/sinx)
Then i made integral(xcosx/sinx) = I(2)
u = x
du = dx
dv = sinx/cosx
v=lnsinx
I(2) = xlnxsinx - integral (lnsinx)
I(2) = xlnsinx - I
I = xlnsinx - (xlnsinx - I)
I = xlnsinx - xlnsinx + I
I = I
lol i did that three times.. sorry i wasn't much help
I tried to do it using the parts method where i made
u = lnsinx
du = cosx/sinx
and dv = dx
v = x
Then i got I = xlnsinx - integral (xcosx/sinx)
Then i made integral(xcosx/sinx) = I(2)
u = x
du = dx
dv = sinx/cosx
v=lnsinx
I(2) = xlnxsinx - integral (lnsinx)
I(2) = xlnsinx - I
I = xlnsinx - (xlnsinx - I)
I = xlnsinx - xlnsinx + I
I = I
lol i did that three times.. sorry i wasn't much help
This integral is just an exercise in substitution lol
I'll use the notation I[a,b]...dx to represent the definite integral from a to b wrtx.
Let J=I[0,pi/2]log(sinx)dx
Let x=pi/2-t in the integral
dx=-dt
I[0,pi/2]log(sinx)dx=I[pi/2,0]-log(cost)dt
=I[0,pi/2]log(cost)dt=I[0,pi/2]log(cosx)dx
(this can be seen from letting t=x. For the rest of this proof, I wont use the intermediate sub, but just write it out in terms of x, as the t sub is just a dummy variable)
Since I[0,pi/2]log(sinx)dx=I[0,pi/2]log(cosx)dx,
2J=I[0,pi/2]log(sinxcosx)dx
=I[0,pi/2]log(0.5sin2x)dx
=I[0,pi/2]log(0.5)dx+I[0,pi/2]log(sin2x)dx
=(-pi/2)log2+I[0,pi/2]log(sin2x)dx
=(-pi/2)log2+0.5I[0,pi]log(sinx)dx
=(-pi/2)log2+0.5(I[0,pi/2]log(sinx)dx+I[pi/2,pi]log(sinx)dx)
=(-pi/2)log2+0.5(J+I[0,pi/2]log(sinx)dx) (note:I[pi/2,pi]log(sinx)dx=I[0,pi/2]log(sinx)dx through the substitution x=pi-t)
=(-pi/2)log2+J
J=I[0,pi/2]log(sinx)dx=(-pi/2)log2
I'll use the notation I[a,b]...dx to represent the definite integral from a to b wrtx.
Let J=I[0,pi/2]log(sinx)dx
Let x=pi/2-t in the integral
dx=-dt
I[0,pi/2]log(sinx)dx=I[pi/2,0]-log(cost)dt
=I[0,pi/2]log(cost)dt=I[0,pi/2]log(cosx)dx
(this can be seen from letting t=x. For the rest of this proof, I wont use the intermediate sub, but just write it out in terms of x, as the t sub is just a dummy variable)
Since I[0,pi/2]log(sinx)dx=I[0,pi/2]log(cosx)dx,
2J=I[0,pi/2]log(sinxcosx)dx
=I[0,pi/2]log(0.5sin2x)dx
=I[0,pi/2]log(0.5)dx+I[0,pi/2]log(sin2x)dx
=(-pi/2)log2+I[0,pi/2]log(sin2x)dx
=(-pi/2)log2+0.5I[0,pi]log(sinx)dx
=(-pi/2)log2+0.5(I[0,pi/2]log(sinx)dx+I[pi/2,pi]log(sinx)dx)
=(-pi/2)log2+0.5(J+I[0,pi/2]log(sinx)dx) (note:I[pi/2,pi]log(sinx)dx=I[0,pi/2]log(sinx)dx through the substitution x=pi-t)
=(-pi/2)log2+J
J=I[0,pi/2]log(sinx)dx=(-pi/2)log2
Last edited:
hurikai
boredofposting
How did you do this:
I[0,pi/2]log(0.5sin2x)dx=I[0,pi/2]log(0.5)dx+I[0,pi/2]sin2xdx
shouldn't there be a log in front of sin 2x?
Also, how did you do:
(-pi/2)log2+I[0,pi/2]sin2xdx=(-pi/2)log2+0.5I[0,pi]sinxdx
Probably some extremely clever trick that I don't know about
I can see genius in that working out. Please explain
I think the first example I posted is wrong though.
I[0,pi/2]log(0.5sin2x)dx=I[0,pi/2]log(0.5)dx+I[0,pi/2]sin2xdx
shouldn't there be a log in front of sin 2x?
Also, how did you do:
(-pi/2)log2+I[0,pi/2]sin2xdx=(-pi/2)log2+0.5I[0,pi]sinxdx
Probably some extremely clever trick that I don't know about
I can see genius in that working out. Please explain
I think the first example I posted is wrong though.
hurikai
boredofposting
3unitz said:
Where there's a will...
hurikai
boredofposting
Yip said:
Fucking genius.
Yip, how did you know to sub pi-t ? Did you just experiment, or is there a definitive method to it?