Never ever use it in the HSC unless you are wiling to explain what a taylor series is and how to derive the result....
Method is good for HSC but...
The rest is straight forward...
So yes yours seems right.
What about the differential equation solution, which both of these satisfy? (or is there some difficulty in elementarily justifying that if two functions are both solutions to a second-order differential equation, they are identical?)
Just because two functions satisfy the same second-order ODE, it doesn't mean they are identical.
Yes sorry about that. The working out was rushed.Method is good for HSC but...
Your 4th line is missing something, when you reapply the formula proven in the previous part; a constant comes out (a 1/2 be exact). This happens twice but since you can factorise, so the 1/4 out the front should be a 1/8.
x -cos(n-2)x}dx )
Ah yes, thanks for clearing that. One of my peers claimed that was so (for the same situation I described), and I instantly doubted him, but did not have any merit to my claim. Also, I forgot to mention the differing of constants, but that probably doesn't change the matter of the fact.
At school so no pic:
 Hence, prove $\frac{5^{125} -1}{5^{25} -1}$ is a composite number.$)
First of all, "factors" are by definition integers (which implies they are rational). To prove a positive integer N ≥ 2 is composite, we are trying to show that it can be written as N = ab, where a and b are both integers with 1 < a, b < N (i.e. both strictly between 1 and N).
Ah, so does integral pretty much just mean they are integers? Yeah I was confused why it was wrong that I wrote rational, now it's clear, thanks!
Yeah, integral is another word for integer (as an 'adjective').
