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Integrating Sin^2xCos^2x (1 Viewer)

wogboy

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since sin[2a] = 2 * sin[a] * cos [a]

therefore,

integral(sin^2[x] * cos^2[x]) dx

= integral(1/4 * sin^2[2x]) dx

= 1/4 * integral(sin^2[2x]) dx

now since,

sin^2[2x] = (1 - cos[4x]) / 2

therefore,

= 1/2 * 1/4 * integral(1 - cos[4x]) dx
= 1/2 * 1/4 * integral(1 - cos[4x]) dx

= x/8 - (sin[2x])/32 + C

[Edit] Minor correction as pointed out by BJ.
 
Last edited:

BlackJack

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Originally posted by wogboy

sin^2[2x] = (1 - cos[4x]) / 2)
minor slip-up:
sin^2(2x) = (1 - cos[4x]) /2
then it goes to
= 1/4 * integral(0.5*(1 - cos[4x]) dx
= 1/8 * integral(1 - cos[4x]) dx
= x/8 - (sin[2x])/32 + C

We did the question elsewhere w/ the cosine rule instead...
 

addikaye03

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int. sin^2xcos^2x

int. 1/4(2sinxcosx)^2

1/4 int. sin^2 (2x)

[cos4x=1-2sin^2(2x)]

1/8 int. sin^2(2x)=1/8 int. (1-cos4x)

1/8(x-1/4sin4x)+C #
 
Last edited:

edmund gosse

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thats the answer dude, i got the same answer, just expand bracket.

the girl above me stuffed it up, but since this was created in 2002 and they would be 26-27 years old, i don't think its gona matter
Dude, I know, I was just adding my right answer to yours to balance out the first two incorrect answers in this thread. And so what if the thread is seven years old?
 

addikaye03

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Dude, I know, I was just adding my right answer to yours to balance out the first two incorrect answers in this thread. And so what if the thread is seven years old?
dude, i'm not snapping at you or anything, i was just saying that it doesnt matter that she got it wrong since they're finished school... but yes, you i and correct. Chill man
 

scardizzle

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int. sin^2xcos^2x

int. 1/4(2sinxcosx)^2

1/4 int. sin^2 (2x)

[cos4x=1-2sin^2(2x)]

1/8 int. sin^2(2x)=1/8 int.

1/8(x+1/4sin4x)+C #
Isnt the intergral of (1-cos4x) = x-sin4x/4? And therefore wouldnt the answer be 1/8(x - sin4x/4) + C

Do correct me if im wrong
 

edmund gosse

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dude, i'm not snapping at you or anything, i was just saying that it doesnt matter that she got it wrong since they're finished school... but yes, you i and correct. Chill man
I am chilled, my homey brother-man.
 

jchoi

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Isnt the intergral of (1-cos4x) = x-sin4x/4? And therefore wouldnt the answer be 1/8(x - sin4x/4) + C

Do correct me if im wrong
It's correct. if y = sin x, dy/dx = cos x. This means Integral of sin x = cos x + C.
So, if we integrate (1-cos4x), it becomes [x-1/4(sin4x)] + C.

I think... lol it looks correct.
 

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