The curve $y = f(x)$ is shown on the diagram - HSC - SSCE Mathematics Advanced - Question 28 - 2023 - Paper 1

Now we need to find the y-coordinate of $R$. We substitute $x = 3$ back into the original curve equation, which we will first need to find:

We know the point $T (-1, 6)$ and the tangent line at $T$ is given by $y = x + 7$. This can help us find the original function $y = f(x)$.

Using the known derivative, we find: $y = ax^3 - 3x^2 - 8x + k$ where $k$ can be found using the value of $y$ at $x = -1$:

$6 = a(-1)^3 - 3(-1)^2 - 8(-1) + k$ $6 = -a - 3 + 8 + k$ $k = 6 + a - 5 = 1 + a$

Now substitute $x = 3$ into the equation:

$y = a(3)^3 - 3(3)^2 - 8(3) + (1 + a)$ $y = 27a - 27 - 24 + 1 + a$ $y = 28a - 50$

Using the fact that we assumed a slope of 1, solve for $y$: Set $a = 3$, the original point gives: $R(3, -22)$ Therefore the coordinates of $R$ are:

$$\text{Coordinates of } R$ are (3, -22).