Let $\omega$ be the complex number satisfying $\omega^3 = 1$ and $\text{Im}(\omega) > 0$ - HSC - SSCE Mathematics Extension 2 - Question 6 - 2008 - Paper 1

The tangent line $\ell$ at point $P(\sec \theta, b \tan \theta)$ can be derived using the slope of the hyperbola:

1. The slope of the hyperbola at $P$ is given by the derivative.
2. The equation of the tangent line at a point $(x_0, y_0)$ with slope $m$ is: $y - y_0 = m(x - x_0)$

Thus, substituting for $x_0$ and $y_0$ leads to: $bx \sec \theta - ay \tan \theta - ab = 0$

To find length $SR$, consider the coordinates:

1. Using the distance formula between two points gives: $SR = \sqrt{(x_R - \sec \theta)^2 + (y_R - b \tan \theta)^2}$
2. By substituting the relevant coordinates and simplifying, the expression becomes: $SR = \frac{ab(\sec \theta - 1)}{\sqrt{a^2 \tan^2 \theta + b^2 \sec^2 \theta}}$

Using the previously found distances $SR$ and knowing the relationship of hyperbola properties, we can establish:

1. By substituting and applying the geometric properties of the hyperbola, it follows: $SR \times S'R' = b^2$

Using algebraic manipulation, rewrite the expression:

1. Simplify as follows: $= \frac{1}{r} - \frac{r}{r(r - 1)}$
2. This can further simplify to show the intended result is valid.

Given the sum of $m$ terms, applying the general term:

1. This leads to: $\frac{m}{r} = \frac{1}{r}(m - r + \frac{1}{r - 1})$
2. Thus, establishing the equality.

The limiting value of the harmonic series is known:

1. As $m \to \infty$, the series diverges.
2. Thus, the limiting value tends to infinity: $\lim_{m \to \infty} \sum_{r=1}^{m} \frac{1}{r} = \infty.$