In the diagram, the graphs of $f(x) = -3 ext{sin}rac{x}{2}$ and $g(x) = 2 ext{cos}(x - 60^ op)$ are drawn in the interval $x ext{ } ext{ } ext{ } ext{ } ext{ } ext{ } ext{ } ext{ } ext{ } ext{ } ext{ }$ $[-180^ op; 180^ op]$ - NSC Mathematics - Question 6 - 2018 - Paper 2

The function $g(x) = 2 ext{cos}(x - 60^ op)$ has a range that can be derived from its amplitude. The amplitude is 2, so the range of $g$ is: $[-2, 2]$.

To calculate $f(p) - g(p)$, substitute the value of $p$ into both functions:

1. Calculate f(p) = -3 ext{sin}rac{p}{2}.
2. Calculate $g(p) = 2 ext{cos}(p - 60^ op)$.

Thus, the difference is: f(p) - g(p) = -3 ext{sin}rac{p}{2} - 2 ext{cos}(p - 60^ op).

From the graph of $g(x)$, identify intervals where the curve is above the x-axis. Based on the graph, the values of $x$ for which $g(x) > 0$ are found to be:

• Between $-60^ op$ and $60^ op$.

From the graph of $f(x)$, determine the intervals where the curve is above the x-axis. The values of $x$ satisfying $f(x) > 0$ include:

• Between $-90^ op$ and $90^ op$.