Re: HSC 2013 4U Marathon
i) First let x=cos theta, substitute it into the expression they ask to prove. We get:
Prove:
 \theta - \cos(n-2)\theta )
With simple algebra and compound angle formula we arrive that LHS = RHS, also see that C_1(cos theta) = cos theta
C_1(x) = x
C_0(cos theta) = cos 0*theta = 1
C_0(x)=1
ii)
 = C_0(x) + C_1(x) z + \sum_{k=2}^{\infty} C_{k}(x) z^k )
 = 1+ xz + \sum_{k=2}^{\infty} 2xC_{k-1}z^k - C_{k-2}z^k )
=1+xz+2xz(C(z)-1) - z^2C(z) )
 = $required result$ )
iii) Sum of co-efficients is simply C_n(1), so into C(z) sub in x=1
= \frac{1-z}{1-2z+z^2} = \frac{1}{1-z} = 1 + z + z^2 + z^3 + \dots + z^n + \dots = \sum_{k=0}^{\infty} C_k(1) z^k )
So equating in general the co-efficient of z^n, we get
 = 1 )
So for all polynomials sum of co-efficients is 1.
iv) Straightforward
v) Let
By using the fact that:
 = \sqrt{1-x^2} )
Substitute everything in, note that the LHS becomes simply C_n(x)
 = x^n - \binom{n}{2} x^{n-2} (1-x^2) + \dots )
So indeed every sine term is even, now when we sub in x=1 (to get sum of co-efficients,) all the terms after the first cancel to 0
Leaving with C_n(1) = 1^n = 1
 If$)
 Show that the sum of the zeros of$)
 Hence, prove that$)
^4})