MedVision ad

HSC 2012-14 MX2 Integration Marathon (archive) (1 Viewer)

Status
Not open for further replies.

Trebla

Administrator
Administrator
Joined
Feb 16, 2005
Messages
8,391
Gender
Male
HSC
2006
Re: MX2 Integration Marathon

In that case, something more hardcore :p



 
Last edited:

barbernator

Active Member
Joined
Sep 13, 2010
Messages
1,439
Gender
Male
HSC
2012
Re: MX2 Integration Marathon

<a href="http://www.codecogs.com/eqnedit.php?latex=a)~within~the~domain~0\leq x\leq \frac{\pi }{2},~~ 0\leq sinx\leq 1\\ Taking~sinx\leq 1,~sin^{n@plus;1}x\leq sin^{n}x\\ \therefore \int_{0}^{\frac{\pi }{2}}sin^{n@plus;1}x\leq \int_{0}^{\frac{\pi }{2}}sin^{n}x\\ hence,~it~follows~that~ \int_{0}^{\frac{\pi }{2}}sin^{n@plus;2}x\leq \int_{0}^{\frac{\pi }{2}}sin^{n@plus;1}x\leq \int_{0}^{\frac{\pi }{2}}sin^{n}x~as~required" target="_blank"><img src="http://latex.codecogs.com/gif.latex?a)~within~the~domain~0\leq x\leq \frac{\pi }{2},~~ 0\leq sinx\leq 1\\ Taking~sinx\leq 1,~sin^{n+1}x\leq sin^{n}x\\ \therefore \int_{0}^{\frac{\pi }{2}}sin^{n+1}x\leq \int_{0}^{\frac{\pi }{2}}sin^{n}x\\ hence,~it~follows~that~ \int_{0}^{\frac{\pi }{2}}sin^{n+2}x\leq \int_{0}^{\frac{\pi }{2}}sin^{n+1}x\leq \int_{0}^{\frac{\pi }{2}}sin^{n}x~as~required" title="a)~within~the~domain~0\leq x\leq \frac{\pi }{2},~~ 0\leq sinx\leq 1\\ Taking~sinx\leq 1,~sin^{n+1}x\leq sin^{n}x\\ \therefore \int_{0}^{\frac{\pi }{2}}sin^{n+1}x\leq \int_{0}^{\frac{\pi }{2}}sin^{n}x\\ hence,~it~follows~that~ \int_{0}^{\frac{\pi }{2}}sin^{n+2}x\leq \int_{0}^{\frac{\pi }{2}}sin^{n+1}x\leq \int_{0}^{\frac{\pi }{2}}sin^{n}x~as~required" /></a>

<a href="http://www.codecogs.com/eqnedit.php?latex=b)~let~v=sin^{n-1}x~~~u=-cosx\\\\ dv=(n-1)cosxsin^{n-2}xdx~~~du=sinx\\\\ I_{n}=-cosxsin^{n-1}x]^\frac{\pi }{2}_{0}@plus;(n-1)\int_{\frac{\pi }{2}}^{0}cos^{2}xsin^{n-2}xdx\\\\ I_{n}=(n-1)\int_{\frac{\pi }{2}}^{0}(1-sin^{2}x)sin^{n-2}xdx\\\\ I_{n}=(n-1)I_{n-2}-(n-1)I_{n}\\\\ nI_{n}=(n-1)I_{n-2}~whoops~it~asked~for~n@plus;2~:/\\\\ I_{n}=\frac{n-1}{n}I_{n-2}\\\\ let~n=k@plus;2\\\\ I_{n@plus;2}=\frac{n@plus;1}{n@plus;2}I_{n}~QED" target="_blank"><img src="http://latex.codecogs.com/gif.latex?b)~let~v=sin^{n-1}x~~~u=-cosx\\\\ dv=(n-1)cosxsin^{n-2}xdx~~~du=sinx\\\\ I_{n}=-cosxsin^{n-1}x]^\frac{\pi }{2}_{0}+(n-1)\int_{\frac{\pi }{2}}^{0}cos^{2}xsin^{n-2}xdx\\\\ I_{n}=(n-1)\int_{\frac{\pi }{2}}^{0}(1-sin^{2}x)sin^{n-2}xdx\\\\ I_{n}=(n-1)I_{n-2}-(n-1)I_{n}\\\\ nI_{n}=(n-1)I_{n-2}~whoops~it~asked~for~n+2~:/\\\\ I_{n}=\frac{n-1}{n}I_{n-2}\\\\ let~n=k+2\\\\ I_{n+2}=\frac{n+1}{n+2}I_{n}~QED" title="b)~let~v=sin^{n-1}x~~~u=-cosx\\\\ dv=(n-1)cosxsin^{n-2}xdx~~~du=sinx\\\\ I_{n}=-cosxsin^{n-1}x]^\frac{\pi }{2}_{0}+(n-1)\int_{\frac{\pi }{2}}^{0}cos^{2}xsin^{n-2}xdx\\\\ I_{n}=(n-1)\int_{\frac{\pi }{2}}^{0}(1-sin^{2}x)sin^{n-2}xdx\\\\ I_{n}=(n-1)I_{n-2}-(n-1)I_{n}\\\\ nI_{n}=(n-1)I_{n-2}~whoops~it~asked~for~n+2~:/\\\\ I_{n}=\frac{n-1}{n}I_{n-2}\\\\ let~n=k+2\\\\ I_{n+2}=\frac{n+1}{n+2}I_{n}~QED" /></a>
 
Last edited:

Sindivyn

Member
Joined
Mar 4, 2012
Messages
194
Gender
Male
HSC
2012
Re: MX2 Integration Marathon

I'm not sure about this bit


Let A = sinx
=1/2 * root (1+k^2)
Make a substitution of tanC
= 1/2 * integration of sec^3 x
Integration by parts and done ( don't forget to sub EVERYTHING back in :p)




is that the same x as before? If so you went in a huge circle. Where did a k come from?? (I'm actually confused - trying to work it out)
Yeah, I went in a circle but ended up with a different result because I equated sin^2 x - 1 to 1. Making so many mistakes tonight :(
 

rolpsy

Member
Joined
Apr 9, 2011
Messages
94
Gender
Male
HSC
2012
Re: MX2 Integration Marathon

new question:

find




or something easier

 
Joined
Sep 20, 2010
Messages
2,225
Gender
Undisclosed
HSC
2012
Re: MX2 Integration Marathon

2 calls for an expansion of the denominator which results in 1-2sin2x by identities and double angles. Then a t=tanx substitution is made, which falls (pretty sure) into a perfect square on the bottom, leading to a linear power integral.
 

rolpsy

Member
Joined
Apr 9, 2011
Messages
94
Gender
Male
HSC
2012
Re: MX2 Integration Marathon

:cool:
good job

i did it a similar way:


etc.
It follows that I = G(n-1) = ln(n).




Also, asianese try and do the second one without t-results
 

Shadowdude

Cult of Personality
Joined
Sep 19, 2009
Messages
12,145
Gender
Male
HSC
2010
Re: MX2 Integration Marathon

what is this

leibniz rule?
 

seanieg89

Well-Known Member
Joined
Aug 8, 2006
Messages
2,662
Gender
Male
HSC
2007
Re: MX2 Integration Marathon

There are many ways of justifying differentiating under the integral. Just use one that is general enough that it applies :). The one I use pretty much all the time is based on the dominated convergence theorem and suffices in most real-world applications.
 

barbernator

Active Member
Joined
Sep 13, 2010
Messages
1,439
Gender
Male
HSC
2012
Re: MX2 Integration Marathon

the second one becomes a sec integration.

EDIT: no it doesnt
 
Last edited:

seanieg89

Well-Known Member
Joined
Aug 8, 2006
Messages
2,662
Gender
Male
HSC
2007
Re: MX2 Integration Marathon

:cool:
good job

i did it a similar way:


etc.
It follows that I = G(n-1) = ln(n).




Also, asianese try and do the second one without t-results
Yeah, the initial substitution of mine was unnecessary of course. Just something I like doing, prefer to work with exponential functions rather than logarithmic ones.
 

bleakarcher

Active Member
Joined
Jul 8, 2011
Messages
1,509
Gender
Male
HSC
2013
Re: MX2 Integration Marathon

Talking about the second one rolpsy posted?

I think it becomes the standard sec^2 and sec2xtan2x

Cbb with paper lol
2/[cos^2(x)-2sin(x)cos(x)+sin^2(x)]=2sec^2(x)/[1-2tan(x)+tan^2(x)]=2sec^2(x)/[tan(x)-1]^2

Now it's easy.
 

D94

New Member
Joined
Oct 5, 2011
Messages
4,423
Gender
Male
HSC
N/A
Re: MX2 Integration Marathon

2/[cos^2(x)-2sin(x)cos(x)+sin^2(x)]=2sec^2(x)/[1-2tan(x)+tan^2(x)]=2sec^2(x)/[tan(x)-1]^2

Now it's easy.
Alternatively, you could straightaway divide the top and bottom by cos2x.
 
Status
Not open for further replies.

Users Who Are Viewing This Thread (Users: 0, Guests: 1)

Top