Answer:
T(t) [tex]=\frac{\langle-4sin(t),4cos(t),-sin(t)\rangle}{\sqrt{16+sin^2t}}[/tex]
Step-by-step explanation:
To find the unit tangent vector for [tex]r(t)=\langle4cos(t),4sin(t),cos(t)\rangle[/tex]
Unit Tangent Vector = [tex]\frac{r^{I}(t) }{||r^{I}(t) ||}[/tex]
Where[tex]r^{I}(t)[/tex] is the derivative of r(t) and [tex]||r^{I}(t)||[/tex] is its modulus.
[tex]r^{I}(t)=\langle-4sin(t),4cos(t),-sin(t)\rangle[/tex]
[tex]||r^{I}(t)||=\sqrt{(-4sin(t))^2+(4cos(t))^2+(-sin(t))^2}[/tex]
[tex]=\sqrt{16sin^2t+16cos^2t+sin^2t} \\=\sqrt{16(sin^2t+cos^2t)+sin^2t} \\Since sin^2t+cos^2t=1\\=\sqrt{16+sin^2t} \\[/tex]
Therefore, Unit Tangent Vector T(t) [tex]=\frac{\langle-4sin(t),4cos(t),-sin(t)\rangle}{\sqrt{16+sin^2t}}[/tex] for [tex]0\leq t\leq \pi[/tex]
