How to do this hard integral. Partial fraction (1 Viewer)

turntaker · Oct 31, 2014

Plez help.

rumbleroar · Oct 31, 2014

Which one?

Kurosaki · Oct 31, 2014

Use partial fractions =).

Kurosaki · Oct 31, 2014

But yes, which one?

turntaker · Oct 31, 2014

rumbleroar said:
Which one?

Kurosaki said:
But yes, which one?

Sorry guys. Its 1, c

I'm such idiot

Drongoski · Oct 31, 2014

By inspection:

$\frac {5}{(x^2+1)(x^2+4)} = \frac {5}{3}( {\frac {1}{x^2+1} - \frac {1}{x^2+4}})$

Kurosaki · Oct 31, 2014

turntaker said:
Sorry guys. Its 1, c

I'm such idiot

Don't be so hard on yourself, most of us were pretty bad starting out

.
Generally when you decompose partial fractions, you let the expression in the numerator be of a degree one less than that of the denominator; so as the denominators are quadratics the numerators are linear.

$\frac{5}{(x^2+1)(x^2+4)}=\frac{Ax+B}{x^2+1}+\frac{Cx+D}{x^2+4}$ , and find the unknown coefficients.

Once you've gotten a bit more practice down you'll be able to see stuff like so - consider $\frac{1}{x^2+1}-\frac{1}{x^2+4}=\frac{3}{(x^2+1)(x^2+4)}$ , and then just multiply a suitable constant in

, and can bypass the above entirely (unless they ask you specifically to find the coefficients for the fraction's numerators in decomposed form).

turntaker · Oct 31, 2014

Kurosaki said:
Don't be so hard on yourself, most of us were pretty bad starting out .
Generally when you decompose partial fractions, you let the expression in the numerator be of a degree one less than that of the denominator; so as the denominators are quadratics the numerators are linear.

$\frac{5}{(x^2+1)(x^2+4)}=\frac{Ax+B}{x^2+1}+\frac{Cx+D}{x^2+4}$ , and find the unknown coefficients.

Once you've gotten a bit more practice down you'll be able to see stuff like so - consider $\frac{1}{x^2+1}-\frac{1}{x^2+4}=\frac{3}{(x^2+1)(x^2+4)}$ , and then just multiply a suitable constant in , and can bypass the above entirely (unless they ask you specifically to find the coefficients for the fraction's numerators in decomposed form).

Thanks man. I just can't see it in my head. It seems magical to me that you can do that.

does it mean I should drop ext 2.

Kurosaki · Oct 31, 2014

turntaker said:
Thanks man. I just can't see it in my head. It seems magical to me that you can do that.

does it mean I should drop ext 2.

No it means you need more practice

. I think that you should see how you fare after you've done your first assessment and see what happens from there. If you do well, you should keep it; if you do OK but think you could have done better, likewise, and if you did really bad don't hesitate to drop. It's all up to you though.

iStudent · Nov 1, 2014

Kurosaki said:
Don't be so hard on yourself, most of us were pretty bad starting out .
Generally when you decompose partial fractions, you let the expression in the numerator be of a degree one less than that of the denominator; so as the denominators are quadratics the numerators are linear.

$\frac{5}{(x^2+1)(x^2+4)}=\frac{Ax+B}{x^2+1}+\frac{Cx+D}{x^2+4}$ , and find the unknown coefficients.

Once you've gotten a bit more practice down you'll be able to see stuff like so - consider $\frac{1}{x^2+1}-\frac{1}{x^2+4}=\frac{3}{(x^2+1)(x^2+4)}$ , and then just multiply a suitable constant in , and can bypass the above entirely (unless they ask you specifically to find the coefficients for the fraction's numerators in decomposed form).

There's a slightly easier way. Since there are no 'x' terms and only constants and x^2 terms you don't have to have the numerator as Ax+B and Cx+D.

Simply having them as A and B is fine. As for the reason... well it's like letting u=x^2 so that you have linear products for your denominator and solving it as usual.

Kurosaki · Nov 1, 2014

iStudent said:
There's a slightly easier way. Since there are no 'x' terms and only constants and x^2 terms you don't have to have the numerator as Ax+B and Cx+D.

Simply having them as A and B is fine. As for the reason... well it's like letting u=x^2 so that you have linear products for your denominator and solving it as usual.

Yes, I know that, but I felt showing the generalised case might be better for turntaker given they seem to be having trouble either understanding the process - how it works - or are simply not practised enough

.

Nice explanation btw, hopefully turntaker will find it useful if they read over it.

How to do this hard integral. Partial fraction (1 Viewer)

turntaker

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rumbleroar

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Kurosaki

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turntaker

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Drongoski

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Kurosaki

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turntaker

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Kurosaki

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iStudent

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Kurosaki

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