Given that \( \sin x = \frac{1}{3} \), find the product of all possible exact values of \( \cos x + \tan x \).

A baker believes that the amount of bread \( B \) and the number of muffins \( M \) produced are related by the equation \( M = aB^n \). She collects the data from a day at the bakery and creates a scatter graph with \( \log B \) as the \( x \)-axis, and \( \log M \) on the \( y \)-axis. The results have a straight line gradient of \( 5 \) and \( y \)-intercept \( -1 \). What are the exact values for \( a \) and \( n \)?

A circle has the equation \( x^2 – 12x + y^2 – 10y + 12 = 0 \), and is tangent to two sides of the triangle. Some coordinates on the triangle are labelled. Find the exact value of the shaded area.

The graph of \( y = \sqrt{5x – 2} \) undergoes the below transformations in the given order:

I quad Translated horizontally left by \( 4 \)
II quad Translated vertically down by \( 6 \)
III quad Vertical reflection in the axis \( y = 0 \)
IV quad Stretch factor \( \frac{1}{3} \) in the \( y \)-axis
V quad Stretch factor \( 2 \) in the \( x \)-axis

Which of the following equations describes the transformed graph?

Solve the differential equation, given that when \( y = 5 \) and \( x = 3 \). What is the value of the constant of integration?
\[
\frac{dy}{dx} = \frac{(7x + 3)y^{2/5}}{x}.
\]

On a cheese farm, the mass of cheese produced and measured on the
scales T minutes after the cheese machine has started, is G grams. For any
time, the rate of cheese production is proportional to the mass of cheese
formed. However, cheese is removed from scales at a constant rate of 10
grams per minute. When the mass of cheese on the scales was 150g, and
the rate of change of cheese weight on the scales was 90 g/minute.
When the rate of change of mass of cheese was 50g/min, what was the
mass of cheese formed?
(You may find it beneficial to create a differential equation to show this.)

Find the coefficient of \( x^3 \) in the binomial expansion of
\[
y = (2x – 1)^9.
\]

The function \( f(x) \) has a stationary point at \( (5, 12) \) and \( f”(x) = 18x + 12 \). Find \( f(x) \).

Find the equation of the normal to the curve with the inverse function
\[
y = \frac{\sqrt{x – 10}}{\sqrt{5}} + 7
\]
at the point where \( x = 1 \).

Calculate the exact solution to the equation:
\[
\log_{6}(4x + 3) = \log_{6}(9x – 5) + 2.
\]

How many values satisfy the following equation for \( -2\pi \leq x \leq 2\pi \)?
\[
2 \sin x \cos x = \cos x.
\]

A semi-circle shares its diameter with the unique edge of an isosceles triangle, as shown. The equal sides of the triangle are both \( 7 \,\text{cm} \) long, and the angle between them is \( 30^\circ \).

Calculate the perimeter of the composite shape.

(Hint: It is given that \( \sin 75^\circ = \frac{\sqrt{6} + \sqrt{2}}{4} \).)

Calculate the sum of the real solutions of the following:
\[
9^{2x} + 6 = 3^{2x + 2}.
\]

Two circles \( A \) and \( B \) have the respective equations:
\[
(x – 2)^2 + (y – 4)^2 = 4
\]
\[
x^2 – 6x + y^2 + 8x = 0.
\]
Find the \( x \)-coordinate of the point on \( A \) that is closest to circle \( B \).

A circle, of diameter 4cm, contains a square with two vertices on the
diameter of the circle, and 2 vertices on the circumference of the circle,
as shown below.

Calculate the area of the square.

An arithmetic series has first term a and a common difference d.

The sum of the first 10 terms is 1075.
The third term of the sequence is 15.

Find the values of a and d

Solve:
\[
2^{x+1} – 2^{-x} = 0.
\]

A cubic polynomial satisfies the following conditions:
\[
f(3) = 0.
\]
It can be expressed in the form \( (x – a)(x – 1)(x + 1) \). Find the total area under the curve between \( x = -1 \) and \( x = 1 \).

State the minimum and maximum points of the graph of
\[
y = -2 \sin\left(-3x + \frac{3\pi}{2}\right) + 7, \quad 0 \leq x < \pi. \]

A swimming pool is filled with water such that the volume of the pool in gallons \( G \) over time in minutes \( t \) is given by
\[
G = 30t – 12t^3 + 9.
\]
At what fraction of time \( t \) is the water flowing at the maximum rate?