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So I know fundamental circular motion is \rightharpoonup{p} = /langle{cos(t)},/rangle{sin(t)} and we are given the equation: p(t) = /langle{t} + cos(4t), /rangle{− sin(4t)} and t=pi/3. I want to know how from fundamental motion we can write out a parametrization equation and with that find a line tangent to that point.

So I know fundamental circular motion is \rightharpoonup{p} = /langle{cos(t)},/rangle{sin(t)} and we are given the equation: p(t) = /langle{t} + cos(4t), /rangle{− sin(4t)} and t=pi/3. I want to know how from fundamental motion we can write out a parametrization equation and with that find a line tangent to that point.

So I know fundamental circular motion is \rightharpoonup{p} $\rightharpoonup{p} = /langle{cos(t)},/rangle{sin(t)} \langle{\cos(t)},{\sin(t)}\rangle$ and we are given the equation: p(t) $p(t) = /langle{t} \langle{t} + cos(4t), /rangle{− sin(4t)} \cos(4t), {− sin(4t)}\rangle$ and t=pi/3. $t=\pi/3$. I want to know how from fundamental motion we can write out a parametrization equation and with that find a line tangent to that point.

So I know fundamental circular motion is $\rightharpoonup{p} $\vec{p} = \langle{\cos(t)},{\sin(t)}\rangle$ and we are given the equation: $p(t) $\vec{p}(t) = \langle{t} + \cos(4t), {− sin(4t)}\rangle$ and $t=\pi/3$. I want to know how from fundamental motion we can write out a parametrization equation and with that find a line tangent to that point.

So I know fundamental circular motion is $\vec{p} = \langle{\cos(t)},{\sin(t)}\rangle$ and we are given the equation: $\vec{p}(t) = \langle{t} + \cos(4t), {− sin(4t)}\rangle$ \sin(4t)}\rangle$ and $t=\pi/3$. I want to know how from fundamental motion we can write out a parametrization equation and with that find a line tangent to that point.

So I know fundamental circular motion is $\vec{p} = \langle{\cos(t)},{\sin(t)}\rangle$ and we are given the equation: $\vec{p}(t) = \langle{t} + \cos(4t), {− \sin(4t)}\rangle$ and $t=\pi/3$. I want to know how from fundamental motion we can write out a parametrization equation and with that find a line tangent to that point.