It is given that $2 \cos A \sin B = \sin(A + B) - \sin(A - B)$ - HSC - SSCE Mathematics Extension 2 - Question 8 - 2008 - Paper 1

The total area, $A$, of the surface formed is the sum of the areas of each individual cone segment:

$A = \sum_{k=1}^{n} A_k = \sum_{k=1}^{n} 2\pi R^2 \sin \delta \cos\left( \frac{(2k-1)\delta}{2} \right).$

This can be expressed more compactly using summation notation once the boundaries are set.

As $n$ increases without bound, the terms in the summation should approach a limit. If we calculate:

$\lim_{n \to \infty} A = 2\pi R^2 \sin\delta \int_{0}^{\frac{\pi}{2}} \cos\left( \frac{(2k-1)\delta}{2} \right) dk.$

Assuming $\delta$ is small, we simplify further to determine the final area limit.

To show this, we differentiate: $f'(t) = a \cos(a+nt) \sin b - n \sin(a+nt) \sin(b - nt).$

Calculating $f''(t)$ gives: $f''(t) = -n^2 f(t)$ and for $f(0)$: $f(0) = \sin(a) \sin b - \sin a \sin b = 0.$

Integrating $f''(t) = -n^2 f(t)$ leads us to a solution of the form: $f(t) = C_1 \sin(nt) + C_2 \cos(nt).$

Using boundary conditions, particularly $f(0) = 0$, reveals: $f(t) = \sin(a + b) \sin nt.$

To solve: $\frac{\sin(a + nt)}{\sin a} = \frac{\sin(b - nt)}{\sin b},$

we rewrite it and find common solutions: $\sin(a + nt) \sin b = \sin(b - nt) \sin a.$ Applying trigonometric identities leads us to derive values in $t$ through simplification and specific trigonometrical transformations.