The tide can be modelled using simple harmonic motion - HSC - SSCE Mathematics Extension 1 - Question 13 - 2016 - Paper 1

To find when the tide is increasing at the fastest rate, we need to derive the equation for $x$ with respect to $t$:

$\frac{dx}{dt} = 4 \left( -\frac{4\pi}{25} \right) \text{sin} \left( \frac{4\pi}{25} t \right)$

Setting the derivative to zero gives:

$\text{sin} \left( \frac{4\pi}{25} t \right) = 0$

The sine function equals zero at integer multiples of $\\pi$, so we solve:

$\frac{4\pi}{25} t = n\pi \Rightarrow t = \frac{25n}{4}$

To maximize the rate of increase, we find the first positive instance:

• For $n=1$, $t = 6.25$ hours after the first high tide, which will be at $2:00 ext{am} + 6:15 ext{am} = 8:15 ext{am}.$

To find the maximum height, we analyze the vertical motion. The vertical component of velocity is given by:

$v_y = u \sin \theta$

The maximum height occurs when $v_y = 0$. Using the equation of motion:

$v^2 = u^2 + 2a s$

Setting $v = 0$, $a = -g$ (where $g = 10 ext{ m/s}^2$), and solving for $s$:

$0 = (u \sin \theta)^2 - 2g s$ $s = \frac{(u \sin \theta)^2}{2g} = \frac{u^2 \sin^2 \theta}{20}$

The horizontal motion can be analyzed first: The time taken to reach the wall can be found using the horizontal velocity:

$v_x = u \cos \theta = 30 \cos 30^{\circ} = 30 \times \frac{\sqrt{3}}{2} = 15\sqrt{3} ext{ m/s}$

The horizontal distance to the wall from the launch point can be calculated as:

$t = \frac{20}{\left(30 \cos 30^{\circ}\right)} = \frac{20}{15\sqrt{3}}$

Using this time in the vertical equation to find the height,

yielding:

$y = 20 + 30 \sin 30^{\circ} t - 5t^2$

Substituting for $t$ will yield the height. Ultimately showing: $= \frac{125}{4} ext{ m above the ground.}$

After rebounding, the ball's initial vertical velocity is $0$ and it falls from a height of $\frac{125}{4}$ m. We use:

$h = \frac{1}{2} g t^2$

Setting $h = \frac{125}{4}$ and $g = 10$:

$\frac{125}{4} = 5 t^2\Rightarrow t^2 = \frac{125}{20} = 6.25\Rightarrow t = \sqrt{6.25} = 2.5 s.$

Using the horizontal velocity after rebound, the distance traveled horizontally is:

$ext{Distance} = ext{Horizontal Velocity} \times ext{Time} = 10 ext{ m/s} \times 2.5 ext{ s} = 25 ext{ m}.$

By the Inscribed Angle Theorem, if a point $M$ is outside the circle, then angles subtended at the circumference satisfying arc properties will confirm that angles $\angle CMF + \angle CDE = 180^{\circ}$, hence confirming that CMDE is cyclic.

If CMDE is cyclic, then angles subtended on the same arc are equal. Therefore, by equating angles:

$\angle CMF + \angle CEB = 180^{\circ}$

Thus, combining the relationships will show that $MF$ is perpendicular to $AB$. Given that $F$ lies on a diameter, this perpendicular relation is inherently satisfied.