Struggling with an Integral? Try These Substitution Strategies!

adelin · Feb 14, 2014

I cannot find a substitution that work for this integral

∫dx/2√x+2x

what should I do?

statdad · Feb 14, 2014

What is [itex]\left(\sqrt{x}\right)^2[/itex]?

adelin · Feb 14, 2014

it is∫dx/2sqrt(x)+2x

PhysicoRaj · Feb 14, 2014

See what you can do to bring a function and it's derivative.. you have √x in the denominator so you should think in terms of derivative of that.

statdad · Feb 14, 2014

If the integral is
[tex] \int \frac{1}{2 \sqrt{x} + 2x} \, dx[/tex]

thinking about the derivative of [itex]\sqrt{x}[/itex] alone will not help.

adelin · Feb 14, 2014

yes, this is the integral

PhysicoRaj · Feb 14, 2014

If he tries to bring the derivative of √x so that it is in product with the original function √x, he can substitute easily. That's what I meant.

PhysicoRaj · Feb 14, 2014

Convert the addition form in the denominator into product form so that the function and it's derivative are seen clearly in multiplied form.

vanhees71 · Feb 14, 2014

Then think about the obvious substitution, aiming to get rid of the square root :-).

adelin · Feb 14, 2014

thank you

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