Stuck on taking the integral of

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    Integral Stuck
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The integral from 0 to 3 of (1 + [1/2x^(1/2) - 1/2x^(-1/2)]^2)^(1/2) presents challenges in simplification and substitution. Initial attempts involved foiling the squared term and applying u-substitution, but these methods proved ineffective. After manipulating the algebra, a new expression emerged: (1/2) ∫_0^3 (x^(1/2) + x^(-1/2)) dx. The discussion emphasizes the importance of strong algebra skills as foundational for success in calculus and higher-level mathematics. Mastery of these concepts is essential for progressing through more complex mathematical disciplines.
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from 0 to 3, ( 1 + [ 1/2x^(1/2) - 1/2x^(-1/2) ]^2 )^(1/2) dx

I started to foil the ^2 term and then tryed to use the u sub, but It doesn't seem to work out. this problem is killing me!
 
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Try that again! ((1/2)x1/2- (1/2)x-1/2)1/2=
(1/4)x- 1/2+ (1/4)x-1.

Now, when you add 1 to that you get (1/4)x+ 1/2+ (1/4)x-1. In other words, exactly the same thing except with +1/2 instead of -1/2!

Now that = (what?)2.
 
I think HallsofIvy is saying mess about with the algebra. I did and in a few steps got:

\frac{1}{2} \int_0^3 x^{\frac{1}{2}} + x^{-\frac{1}{2}} dx

But I am not 100% confident on my skills so don't just copy that down.
 
Another proof that you need to be good at algebra in order to be good at calculus.
 
e(ho0n3 said:
Another proof that you need to be good at algebra in order to be good at calculus.

And you have to be good at calculus to be good at differential equations- and you have to be good at differential equations to be good at analysis, It just keeps going!
 
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