Let $f(x) = ext{sin}^{-1}(x + 5)$ - HSC - SSCE Mathematics Extension 1 - Question 2 - 2006 - Paper 1

To find the gradient of the graph at $x = -5$, we differentiate $f(x) = ext{sin}^{-1}(x + 5)$ with respect to $x$. The derivative is given by the formula: $f'(x) = \frac{1}{\sqrt{1 - (x+5)^{2}}}$
Substituting $x = -5$, we can deduce: $f'(-5) = \frac{1}{\sqrt{1 - (0)^{2}}} = 1$
Thus, the gradient at the point where $x = -5$ is 1.

To sketch the graph of $y = f(x)$, we begin with the domain of $-6 \leq x \leq -4$ and determine the corresponding range values. The endpoints yield:

• For $x = -6$, $f(-6) = ext{sin}^{-1}(-1) = -\frac{\pi}{2}$
• For $x = -4$, $f(-4) = ext{sin}^{-1}(1) = \frac{\pi}{2}$
  From this, we can draw a curve starting from the point $(-6, -\frac{\pi}{2})$, smoothly moving to $(-4, \frac{\pi}{2})$, reflecting the characteristics of the arcsin function.

Using the Binomial Theorem:
$(1+x)^{n} = \sum_{k=0}^{n} {n \choose k} x^{k}$
Differentiating both sides gives:
$n(1+x)^{n-1} = {n \choose 1} + 2{n \choose 2} x + \cdots + n{n \choose n} x^{n-1}$.

By substituting $x=1$ into the previous result, we obtain:
$n3^{n-1} = {n \choose 0} + {n \choose 1}(2) + {n \choose 2}(1^{2}) + \cdots + {n \choose n}(2^{n})$
thus leading to the required expression.

To find the coordinates of $U$, we first set the equation of the chord $PR$ to meet the $y$-axis. Since the equation of the line is given as:
$y = \frac{1}{2}(p + r)x - apr$
Setting $x = 0$, we then find:
$y = -apr = U.$
Therefore, $U$ is at $(0, -apr)$.

From the tangents' equations, we can find the intersection point. The two tangents are given as:
$y = px - aq^{2}$
$y = qx - ap^{2}$
Equating and solving for $x$, results in the coordinates of $T$ being determined as:
$T = (a(p + q), aq).$

To show that line $TU$ is perpendicular to the parabola's axis, we can demonstrate their slopes to be negative reciprocals. The slope of line $TU$ can be determined from $T$ and $U$ coordinates while the slope of the parabola's axis is vertical.
Since the axis slope is undefined and the product of slopes must equal -1, we conclude that $TU$ is indeed perpendicular to the axis of the parabola.