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Reduction question (1 Viewer)

cutemouse

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Hello,

I can do the showing parts, just don't know how to find the integral...



Could someone please help me?

Thanks
 

azureus88

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let x=cos@
dx=-sin@d@

x=0, @=pi/2
x=1, @=0

[maths]\int_{0}^{1}\frac{x^7dx}{\sqrt{1-x^2}}[/maths]

[maths]\int_{\pi /2}^{0}\frac{\cos^7\Theta (-\sin\Theta d\Theta )}{sin\Theta }[/maths]

[maths]\int_{0}^{\pi /2}\cos^7\Theta d\Theta[/maths]

then use the reduction formula from the previous part.
 
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cutemouse

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Hi, I got one more question. Could someone please help me on this one? Thanks

 

cutemouse

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Hey Jetblack, thanks for your help!

Just one question though, how do I know when to apply integration by parts or to use the other 'miscellaneous' method?

Thanks
 

cutemouse

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Hi again,

I have another question, lol.. It's a part of the one I previously posted.

Hence find ∫sec3x dx <-- I can do it until I have to find ∫secx dx, how would I do that?

Thanks for your help so far ppl!
 
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azureus88

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[maths]\int \sec\Theta d\Theta [/maths]

[maths]=\int \frac{\sec\Theta (\sec\Theta +\tan\Theta )}{\sec\Theta +\tan\Theta }d\Theta [/maths]

[maths]=\ln(\sec\Theta +\tan\Theta )[/maths] as the derivative of demoninator is the numberator.

Alternatively, you could just use the t-formula.
 

Drongoski

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Edit: Above learnt from the text. I wonder how many of us could have figured this technique out ourselves. So it is one of those you 'memorise'.
 
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cutemouse

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[maths]\int \sec\Theta d\Theta [/maths]

[maths]=\int \frac{\sec\Theta (\sec\Theta +\tan\Theta )}{\sec\Theta +\tan\Theta }d\Theta [/maths]

[maths]=\ln(\sec\Theta +\tan\Theta )[/maths] as the derivative of demoninator is the numberator.

Alternatively, you could just use the t-formula.
Hi, thanks for your help... Just wondering though, how am I supposed to know this? lol... is there a 'list' of integrals like these that I should know and be able to manipulate?

Thanks
 

azureus88

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I guess you just know from experience. You should also learn the integral of cosec@ which uses the same method. If you're unsure though, you could still use the t formula as last resort
 

cutemouse

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How would I use t results in this case? I tried and miserably failed :(
 

azureus88

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let t=tan@/2
dt/d@=(1/2)sec^2(@/2)=(1/2)(1+t^2)
d@=2dt/(1+t^2)

[maths]\int \sec\Theta d\Theta [/maths]

[maths]\int (\frac{1+t^2}{1-t^2})(\frac{2dt}{1+t^2})[/maths]

[maths]\int \frac{2dt}{(1-t)(1+t)}[/maths]

Then procede with partial fractions.
 

cutemouse

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Yeah I got there, and got two log expressions, but I don't know how to make them into the other form (secx+tanx)

Sorry if this is really obvious, I'm pretty slow at this stuff :(
 

lolokay

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use log law and the t identities

also, the integral of secx can be made into a standard integral if you let u=secx
 

azureus88

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You dont really need it in that form but if you want, you can do this:

[maths]\int (\frac{1}{1-t}+\frac{1}{1+t})dt [/maths]

[maths]=\ln(\frac{1+t}{1-t})[/maths]

[maths]=\ln[\frac{(1+t)^2}{1-t^2}][/maths]

[maths]=\ln(\frac{1+t^2}{1-t^2}+\frac{2t}{1-t^2})[/maths]

[maths]=\ln(\sec\Theta +\tan\Theta )[/maths]

However, you cant always expect the result to turn out neatly like this case, since in integration, the result may differ by a constant.

By the way, nice method lolokay.
 
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cutemouse

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Hi, Sorry but I have more questions...

1. If Im, n=∫sinmx cosnx dx, prove that
Im, n=∫sinm-1x (d/dx)[(-cosn+1x)/(n+1)] dx = [-sinm-1x cosn+1x]/(n+1) + (m-1)/(n+1)[Im-2,n - Im,n]

Hence show that Im, n = [-sinm-1x cosn+1x]/(n+1) + (m-1)/(n+1)*Im-2,n

2. If Un=∫0pi/2 θsinnθdθ, n>1 prove that:

Un=(n-1)/n * Un-2 + 1/n2

3. If Un=∫(cos2nx)/sinx dx, show that Un=[2cos(2n-1)x/(2n-1)]+Un-1

Thanks alot for your help!
 
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azureus88

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2. If Un=∫0pi/2 θsinnθdθ, n>1 prove that:

Un=(n-1)/n * Un-2 + 1/n2
I dont like working with U_n and @ so i changed it to I_n and x. Anyway, here it is:

[maths]I_n=\int_{0}^{\pi/2}x\sin^nxdx\\=\int_{0}^{\pi/2}\sin^{n-1}x(x\sin x)dx\\=\int_{0}^{\pi/2}\sin^{n-1}x\frac{\mathrm{d} }{\mathrm{d} x}(-x\cos x+\sin x)dx\\=[-x\cos x\sin^{n-1}x+\sin^nx]-(n-1)\int_{0}^{\pi/2}(-x\cos x+\sin x)(\sin^{n-2}x\cos x)dx\\=1+(n-1)\int_{0}^{\pi/2}(x\sin^{n-2}x(1-\sin^2x)-\sin^{m-1}x\cos x)dx\\=1+(n-1)[I_{n-2}-I_n]-(n-1)\int_{0}^{\pi/2}\sin^{n-1}x\cos xdx\\=1+(n-1)[I_{n-2}-I_n]-\frac{n-1}{n}[\sin^nx]^{\pi/2}_0[/maths]

[maths]I_n(n-1+1)=1+(n-1)I_{n-2}-\frac{n-1}{n}\\I_n=\frac{1}{n}+\frac{n-1}{n}I_{n-2}-\frac{n-1}{n^2}\\=\frac{n-1}{n}I_{n-2}+\frac{1}{n^2}[/maths]
 
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