Which diagram best shows the curve described by the position vector $r(t) = -5 ext{cos}(t) extbf{i} + 5 ext{sin}(t) extbf{j} + k$ for $0 ext{ } \leq t \leq 4\pi$. - HSC - SSCE Mathematics Extension 2 - Question 7 - 2021 - Paper 1

For $0 \leq t \leq 4\pi$, we will complete two full revolutions around the origin (0, 0) in the x-y plane since the fundamental period of both $\text{cos}(t)$ and $\text{sin}(t)$ is $2\pi$.

The z-component increases linearly with $t$, implying that as the point makes circular movements in the x-y plane, it also moves upward along the z-axis. Therefore, the complete motion describes a helix.

From the options provided, diagram D is the one that best represents a helix, showing the circular motion in the x-y plane along with the upward movement in the z-axis.