Detailed Solution:

(a) Transformations:

The function \( g(x) \) is obtained from \( f(x) \) through:

1. Horizontal translation: A shift of \( \frac{3\pi}{2} \) units to the right
   This comes from the \( x-\frac{3\pi}{2} \) inside the sine function
2. Vertical translation: A shift of \( q \) units upwards
   This comes from the \( +q \) term added to the function

In vector form, this can be represented as \( \begin{pmatrix} \frac{3\pi}{2} \\ q \end{pmatrix} \).

(b) Finding minimum value of r:

Given \( g(x) \geq 7 \), we first find the minimum value of \( g(x) \):

The minimum value of \( \sin\left(x-\frac{3\pi}{2}\right) \) is -1, so: \[ \text{Minimum of } g(x) = 4(-1) + 2.5 + q = -4 + 2.5 + q \] Set this \( \geq 7 \): \[ -1.5 + q \geq 7 \] \[ q \geq 8.5 \] The smallest possible \( q \) is 8.5.

Now find the y-intercept \( r \) when \( q = 8.5 \): \[ g(0) = 4\sin\left(-\frac{3\pi}{2}\right) + 2.5 + 8.5 \] \[ \sin\left(-\frac{3\pi}{2}\right) = 1 \] (since it’s equivalent to \( \sin\left(\frac{\pi}{2}\right) \)) \[ r = 4(1) + 2.5 + 8.5 = 15 \] Therefore, the smallest possible value of \( r \) is 15.

Markscheme:

(a)

• Horizontal translation \( \frac{3\pi}{2} \) right (A1)
• Vertical translation \( q \) up (A1)
Note: Accept vector form \( \begin{pmatrix} \frac{3\pi}{2} \\ q \end{pmatrix} \) for both marks.

[2 marks]

(b)

• Recognizes minimum of sine function is -1 (M1)
• Sets up inequality \( -4 + 2.5 + q \geq 7 \) (A1)
• Solves to find \( q \geq 8.5 \) (A1)
• Correctly evaluates \( g(0) \) with \( q = 8.5 \) (M1)
• Finds \( r = 15 \) (A1)

[5 marks]

Total: [7 marks]