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4U Revising Game (1 Viewer)

gurmies

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its not a typo, drongoski.
check it yourself... copy what looks like an 'n' and paste it into word. you will see its a pi, not an n.

i had mistaken it for an 'n' myself. But it was gurmies who knocked some sense into me.
Using logic, he wouldn't go all the way to character map/remember the alt code for pi to make an error :p
 

azureus88

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It doesnt matter whether its pi or n. Its assumed that they're positive constants anyway so it should work either way.

Anyway, new question:

Find all solutions to z^4 = (z-1)^4
 

azureus88

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[maths]\delta V=\pi\left \{ (4-x+\delta x)^2-(4-x)^2 \right \}(2y)\\=4\pi y(4-x)\delta x\\=2\sqrt{3}\pi(4-x)\sqrt{4-x^2}\delta x\\\\V=\lim_{\delta x\to 0}\sum_{x=-2}^{2}2\sqrt{3}\pi(4-x)\sqrt{4-x^2}\delta x\\=8\sqrt{3}\pi\int_{-2}^{2}\sqrt{4-x^2}\delta x-2\sqrt{3}\pi\int_{-2}^{2}x\sqrt{4-x^2}\delta x\\=8\sqrt{3}\pi(\frac{\pi(2^2)}{2})-0\,\,\,\,(1/2\,$area of circle, odd function)\\=16\sqrt{3}\pi^2[/maths]
 

azureus88

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New Question:

[maths]$Show that$\,\,1+(1+x)+(1+x)^2+...+(1+x)^n=\frac{(1+x)^{n+1}-1}{x}\\$Hence show that$\,\,\binom{n}{r}+\binom{n-1}{r}+\binom{n-2}{r}+...+\binom{r}{r}=\binom{n+1}{r+1}[/maths]
 

Trebla

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trebla, put us out of our misery.
is it a pi or an n?

thanks.
It is meant to be pi and x doesn't have to be integer valued. Either way, azureus88's got the right idea, just replace n with pi. Well done.
 

Drongoski

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its not a typo, drongoski.
check it yourself... copy what looks like an 'n' and paste it into word. you will see its a pi, not an n.

i had mistaken it for an 'n' myself. But it was gurmies who knocked some sense into me.
U are right haris; I peered close without my glasses and realise I couldn't see well.
 

harism

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hahaha.
nice question there gurms.
my god you have to SEE it here.
 

GUSSSSSSSSSSSSS

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this seems familiar ......... =S (shuning, namu and maybe gurmies wud understand xD)

gradient of the chord = 6a/9a = 2/3
Equation of the chord: y = (2/3)x

each cross section is a semicircle, Area = (1/2)(pi.r^2)
r= (1/2)(y1 - y2) ........... y1 = sqrt(4ax) .............. y2 = (2/3)x
= (1/2)(2sqrt(ax) - (2/3)x)
= (1/6)(6sqrt(ax) - 2x)

therefore

Area = (pi/2)((1/6)(6sqrt(ax) - 2x))^2
= (pi/72)(36ax - 24xsqrt(ax) + 4x^2)
= (pi/72)(36ax - (24/a)(ax)^(3/2) + 4x^2)

therefore

volume = pi/72 . S(36ax - (24/a)(ax)^(3/2) + 4x^2)dx limits: 9a --> 0
= pi/72 . [18ax^2 - (48/5a^2)(ax)^(5/2) + (4/3)x^3] limits: 9a --> 0
= pi/72 . (1458a^3 - (48/5a^2)(9a^2)^(5/2) + (4/3)(9a)^3) - 0
= pi/72 . (1458a^3 - (48/5a^2)(243a^(5) + 972a^3)
= pi/72 . (2430a^3 - (11664/5)a^3)
= pi/72 . ((486/5)a^3)
= (27pi.a^3)/20



hmmmmmmmmmmmmmmmmmmmm THAT looks a tad weird ...... always make so many typos on computer =[[[[[[
 
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azureus88

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[maths]y_1^2=4ax\,\,and\,\,y_2=\frac{2}{3}x\\\delta V=\frac{\pi}{2}(y_1^2-y_2^2)\delta x\\=\frac{\pi}{2}(4ax-\frac{4}{9}x^2)\delta x\\V=\frac{\pi}{2}\int_{0}^{9a}(4ax-\frac{4}{9}x^2)dx\\=2\pi\int_{0}^{9a}(ax-\frac{x^2}{9})dx\\=27\pi a^3[/maths]

i might have misunderstood the question.
 
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GUSSSSSSSSSSSSS

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i might have misunderstood the question.
wat i interpreted it as saying was that the semicircles have their diameters IN that shaded region, so that shaded region is the BASE of a solid, with semi circular cross sections built up from it xD

......if that even makes sense at all =P
 

jet

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So did I. The semicircles stick out from the black area out of the screen, in a metaphorical sense.
 

GUSSSSSSSSSSSSS

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LOL well i just ammended my solution...saw one of the mistakes .... but it still doesnt look very pretty =[[[ probably heaps more mistakes in there =[[[
 

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