Multivariable & Vectormedium
0:00.0

For the helix r(t)=3cos(t),3sin(t),4t\mathbf{r}(t) = \langle 3\cos(t), 3\sin(t), 4t \rangle, find the curvature κ\kappa using the formula κ=r×rr3\kappa = \frac{|\mathbf{r}' \times \mathbf{r}''|}{|\mathbf{r}'|^3}.