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4U Integration. (1 Viewer)

x jiim

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Most of the sheet we got was fairly alright, but got stuck on the last few gross questions.

∫ √((3-x)/(2+x)) dx

∫ ((logx)^7)/x dx

Thanks :]
 

Drongoski

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Most of the sheet we got was fairly alright, but got stuck on the last few gross questions.

∫ √((3-x)/(2+x)) dx

∫ ((logx)^7)/x dx

Thanks :]
2nd one dead easy.

the integral = int of (log x)^7 wrt log x

= (1/(7+1)) (log x)^7+1 + C

(you may prefer to use the substitution: let u = log x )

= (log x)^8/8 + C
 

x jiim

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2nd one dead easy.

the integral = int of (log x)^7 wrt log x

= (1/(7+1)) (log x)^7+1 + C

(you may prefer to use the substitution: let u = log x )

= (log x)^8/8 + C
oh, whoops :eek:
any ideas on the first one?
the answer's apparently

√(6+x-x^2) + 5/2.sin^-1 (2x-1)/5 + k o_____o
 

Drongoski

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I've skipped some of latter steps . . . tiring typing out the details in LaTeX
 
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duckcowhybrid

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Jim you could just ask someone from our class on MSN for the solution he wrote on the board. Regardless both methods posted above work and I cbf writing out the official solution.
 

study-freak

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Well I let u=x-0.5 because when the numerator is rationalised, it allows us to make the denominator into root of difference of two squares. Then, standard integrals can be used to integrate the expression.
 
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x jiim

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Thanks everyone :]
 
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