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by **Martingale** on Thu May 07, 2009 11:38 pm

yabo2k wrote:for the antiderivative of the second part then I would get

(2x/3)(e^3x/3)-(e^3x/3)((2/3)dx)

you really need to put an integral sign in there

$=\frac{2x}{3}\frac{e^{3x}}{3}-\int\frac{e^{3x}}{3}\frac{2}{3}dx=\frac{2xe^{3x}}{9}-\int\frac{2e^{3x}}{9}dx$

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by **yabo2k** on Thu May 07, 2009 11:51 pm

I have them on my paper but I don't know how to put it into the computer. But I guess this is where I get stuck. I don't see how it can go any further than my first answer

by **Martingale** on Thu May 07, 2009 11:55 pm

yabo2k wrote:I have them on my paper but I don't know how to put it into the computer. But I guess this is where I get stuck. I don't see how it can go any further than my first answer

Martingale wrote:
yabo2k wrote:for the antiderivative of the second part then I would get

(2x/3)(e^3x/3)-(e^3x/3)((2/3)dx)

you really need to put an integral sign in there

$=\frac{2x}{3}\frac{e^{3x}}{3}-\int\frac{e^{3x}}{3}\frac{2}{3}dx=\frac{2xe^{3x}}{9}-\int\frac{2e^{3x}}{9}dx$

$=\frac{2x}{3}\frac{e^{3x}}{3}-\int\frac{e^{3x}}{3}\frac{2}{3}dx=\frac{2xe^{3x}}{9}-\int\frac{2e^{3x}}{9}dx=\frac{2xe^{3x}}{9}-\frac{2e^{3x}}{27}+c$

by **yabo2k** on Thu May 07, 2009 11:58 pm

so did you find u, du, dv, and v again to get (2e^3x)/27

by **Martingale** on Fri May 08, 2009 12:04 am

yabo2k wrote:so did you find u, du, dv, and v again to get (2e^3x)/27

no...not for the last part. just used the fact that $\int e^{3x}dx=e^{3x}/3+c$ one last time

by **yabo2k** on Fri May 08, 2009 12:10 am

so my final answer would be

((x^2e^3x)/3)-((2xe^3x)/9)-((2e^3x)/27)+C

by **Martingale** on Fri May 08, 2009 12:20 am

yabo2k wrote:so my final answer would be

((x^2e^3x)/3)-((2xe^3x)/9)-((2e^3x)/27)+C

almost..check the sign on the (2e^3x)/27 term

by **yabo2k** on Fri May 08, 2009 12:33 am

$=\frac{2x}{3}\frac{e^{3x}}{3}-\int\frac{e^{3x}}{3}\frac{2}{3}dx=\frac{2xe^{3x}}{9}-\int\frac{2e^{3x}}{9}dx=\frac{2xe^{3x}}{9}-\frac{2e^{3x}}{27}+c$ [/quote]

You have it as a subtraction. So where did i go wrong?

by **Martingale** on Fri May 08, 2009 1:04 am

yabo2k wrote: $=\frac{2x}{3}\frac{e^{3x}}{3}-\int\frac{e^{3x}}{3}\frac{2}{3}dx=\frac{2xe^{3x}}{9}-\int\frac{2e^{3x}}{9}dx=\frac{2xe^{3x}}{9}-\frac{2e^{3x}}{27}+c$

You have it as a subtraction. So where did i go wrong?[/quote]

I have a subtraction for this small part of the problem. Combine this with the full problem.

by **Martingale** on Fri May 08, 2009 1:05 am

did you see this post of mine?

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