Higher Level Integration Marathon & Questions (3 Viewers)

InteGrand

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Re: Extracurricular Integration Marathon

That's nice but it's not exactly an answer, since you haven't proven that the sum is the inverse hyperbolic sine of 1.
He used the Maclaurin series for the inverse hyperbolic sine (and the fact it holds at t = 1, which we can show for example by using Abel's theorem. We can show the series converges with the help of Stirling's approximation, for example).
 
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seanieg89

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Re: Extracurricular Integration Marathon

One way (probably pretty inefficient so am not going to bother texing it) is to just differentiate with respect to the parameters.

I let x=a^2, y=b^2, and evaluated using the easy result that for a > 1.



(And chuck some absolute values around a and b if you want to allow them to be negative obviously.)
 
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Paradoxica

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Re: Extracurricular Integration Marathon

One way (probably pretty inefficient so am not going to bother texing it) is to just differentiate with respect to the parameters.

I let x=a^2, y=b^2, and evaluated using the easy result that for a > 1.



(And chuck some absolute values around a and b if you want to allow them to be negative obviously.)
You could combine that with the symmetry of the integral to cut through some of that I suppose....

I(a,b) = I(b,a), from reflection.
 

Mahan1

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Re: HSC 2017 MX2 Integration Marathon






 
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pikachu975

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Re: HSC 2017 MX2 Integration Marathon

Add the two equations

B^3 + a^3 - 6B^2 - 6a^2 + 13B + 13a = 20
a^3 + B^3 - 6(B^2 + a^2) + 13(B+a) = 20
(a+B)(a^2 - aB + B^2) - 6(B^2 + a^2) + 13(B+a) = 20
(a+B)(a^2 - aB + B^2 - 6B^2 - 6a^2 + 13) = 20
(a+B)(-5a^2 - 5B^2 - aB + 13) = 20

Not sure what else to do but hopefully this helps someone but it probably won't
 

Paradoxica

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Re: HSC 2017 MX2 Integration Marathon

Now that this is somewhere slightly more appropriate...

With the substitutions α = u+2, β = v+2, the following equations are obtained:

u³+u=-9, v³+v=9

f: x → x³+x is bijective, so there can only be one root.

Thus, u+v=0, since they have oppositely signed variables in the same equation.

Thus, α+β=4
 
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