HELP: Integration using Substitution (1 Viewer)

hkgirl

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PLEASE HELP...:(
this is urgent & i seriously don't get this topic!!

1) By using the substitution
a) u = 2x + 7
b) u^2 = 2x + 7

find the integration of:

x square root (2x+7) dx



2) Use the substituion u = 5 - x
find the integration of:

x squareroot (5-x) dx



3) Using u = 1 + x^4

find the integration of

(x^3)/ (1+x^4)^5 with end points 1 and 0



THANKS in advance!!
will be much appreciated!
 

SoulSearcher

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1) i) u = 2x + 7, therefore x = (u-7)/2
du/dx = 2, therefore du/2 = dx
Int. [x*rt(2x+7)] dx
= Int. [(u-7)/2 * rt(u)] * du/2
= 1/4 Int. [(u-7)rt(u)] du
= 1/4 Int. [u3/2 - 7u1/2] du

From there, you integrate as normal, then substitute in u = 2x+7 when you have finished integrating.

ii) u2 = 2x + 7, therefore x = (u2-7)/2
dx/du = u, therefore dx = u du
u = +/- rt(2x+7), however we will deal with only the positive sign here.
Int. [x*rt(2x+7)] dx
= Int. [(u2-7)/2 * u]*u du
= 1/2 Int. [(u2-7)u2] du
= 1/2 Int. [u4 - 7u2]du

You can integrate normally from there, and substitute u2 back in when appropriate.

2) u = 5-x, therefore x = 5-u
du/dx = -1, therefore dx = -du
Int. [x*rt(5-x)] dx
= Int. [(5-u)rt(u)]*-du
= Int. [(u-5)rt(u)] du
= Int. [u3/2-5u1/2] du

You can integrate normally from there.

3) x3/(1+x4)5 = 1/4 * 4x3/(1+x4)5
u = 1 + x4
du/dx = 4x3, therefore dx = du/4x3
x = 1, u = 2, similarly, x = 0, u = 1
Int. [x3/(1+x4)5] dx (1-->0)
= 1/4 Int. [4x3/(1+x4)5] dx (1-->0)
= 1/4 Int. [1/u5] du (2-->1)
= 1/4 [-1/4 * u-4] (2-->1)
= -1/16 [1/u4] (2-->1)

Sub in your values of u, and you should get your answer that way.
 

hkgirl

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omg thanks so much!!

you're sooo nice! you typed all that out for me!!

how did you type the powers??
 
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x2 = x[sup ] 2 [/sup ] without the spaces to write in superscript ie higher than normal.

x2 = x[sub ] 2 [/sub ] without spaces to write in subscript (lower than normal)
 

Fish Sauce

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I love you all so much, I was stuck on that exact same question. That EXACT one.

Stupid textbook with no examples for those type of question.
 

Fish Sauce

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Just a quick question.

I'm trying to solve
Int. sinxcosx dx

I swear I've done it right (and checks on the internet confirm my answer) but the book says that the answer is
-1/4 cos2x + c

I did it like this:
u = cosx
du = -sin dx

- Int. -cosxsinx dx
= - Int. u du
= -u^2 / 2
= - cos^2 x / 2
= - 1/2 cos^2x

Can anyone confirm my answer?
Thanks!
 

jb_nc

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its right
 
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elseany

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theres two ways to do that integral

what the text book did was let sinxcosx = (sin2x)/2

so (1/2)*Int.sin2x dx = -1/4cos2x + c

they're both right, the difference is in the constant
 

Mattamz

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You are both right :)

Note:
cos2x = (cosx)^2 - (sinx)^2
= 2(cosx)^2 -1

(cosx)^2 = (cos2x + 1)/2

From this we replace ur last line of working:
=((cosx)^2)/2 + C
=((cos2x+1)/2)/2 + C
=(cos2x)/4 +1/4 + C
= (cos2x)/4 + c , (since 1/4 is a constant)

Personally i would have used the subsitution:
u = sinx
du = cosx.dx
Not that it really matters
 
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