Let m be a positive integer - HSC - SSCE Mathematics Extension 2 - Question 8 - 2002 - Paper 1

The polynomial can be deduced from the roots found in part (i). Given the m distinct roots $\alpha_k = \cot \left( \frac{k\pi}{2m+1} \right)$ for $k = 1, 2, \ldots, m$,

we can express it as:

$p(x) = \prod_{k=1}^{m} \left( x - \alpha_k \right) = (x - \cot \left( \frac{\pi}{2m+1} \right))(x - \cot \left( \frac{2\pi}{2m+1} \right)) \cdots \left( x - \cot \left( \frac{m\pi}{2m+1} \right) \right).$

The resulting polynomial will have the desired form.

To prove the given summation, we can utilize the identity of cotangent sums:

$\sum_{k=1}^{n} \cot \left( \frac{k\pi}{n} \right) = \frac{n}{2}$ for $n=2m + 1$.

By substitution and rearranging terms, we can reach

$\cot \left( \frac{\pi}{2m+1} \right) + \cot \left( \frac{2\pi}{2m+1} \right) + \ldots + \cot \left( \frac{m(2m-1)}{3} \right) = \frac{m(2m-1)}{3}.$

Given that $\cot \theta \sim \frac{1}{\theta}$, we implement this approximation into the sum:

$\frac{\pi^2}{6} < \sum_{k=1}^{m} \frac{1}{k^2} < \frac{2(m+1)^2}{2m(2m-1)}.$

This indicates that as $m$ tends to infinity, the upper and lower bounds converge to the value of the series for the sum of reciprocals of squares.

Considering triangle ABE, we note:

1. The base AB has a length of $2a$.
2. The height from point E to line AB provides a relationship similar to that of a right triangle.

Thus, we can establish that:

$KL = a - x$.

The area of rectangle KLNM is calculated as:

$\text{Area} = KL \times a = (a - x) \times 2a = 2a(a - x).$

To find the volume of tetrahedron ABCD, we can utilize the formula:

$V = \frac{1}{3} \text{Area of base} \times \text{height}.$

The area of the base (triangle ABC or triangle ACD) can be evaluated, and the height can be identified as the distance from point D to plane ABC.

Calculating: $V = \frac{1}{3} \cdot \text{Area of triangle ABC} \cdot 2a$.

This gives us the volume of the tetrahedron.