Let r(t) = < 2cost, 3t, 2sint > represent a parameterized curve. Find the: a) unit...

Find the unit tangent vector T(t) and the curvature κ(t) for the curve r(t) = <6t^3...

Find the unit tangent vector T(t) and the curvature κ(t) for the curve r(t) = <6t^3 , t, −3t^2 >.

Find a unit tangent vector to the curve r = 3 cos 3t i + 3...

Find a unit tangent vector to the curve r = 3 cos 3t i + 3 sin 2t j at t = π/6 .

6. Given vector function r(t) = t2 − 2t, 1 + 3t, 1 3 t 3...

6. Given vector function r(t) = t2 − 2t, 1 + 3t, 1 3 t 3 + 1 2 t 2 i (a) Find r 0 (t) (b) Find the unit tangent vector to the space curve of r(t) at t = 3. (c) Find the vector equation of the tangent line to the curve at t = 3

For the curve given by r(t)=〈6sin(t),−3t,−6cos(t)〉 Find the unit normal N(t)=

For the curve given by r(t)=〈6sin(t),−3t,−6cos(t)〉 Find the unit normal N(t)=

Consider the following vector function. r(t) = <9t,1/2(t)2,t2> (a) Find the unit tangent and unit normal...

Consider the following vector function. r(t) = <9t,1/2(t)2,t2> (a) Find the unit tangent and unit normal vectors T(t) and N(t). (b) Use this formula to find the curvature. κ(t) =

Consider the following vector function. r(t) = (3sqrt(2)t, e3t, e−3t ) Find the Curvature.

Consider the following vector function. r(t) = (3sqrt(2)t, e3t, e−3t ) Find the Curvature.

Write the curve given by r(t)=((3/2)t)i+(t^3/2)j as a function r(s) parameterized by the arc length s...

Write the curve given by r(t)=((3/2)t)i+(t^3/2)j as a function r(s) parameterized by the arc length s from the point where t=0. Write your answer using standard unit vector notation.

Find the curvature of the space curve x=(3t^2)-t^3 y=3t^2 z=(3t)+t^3

Find the curvature of the space curve x=(3t^2)-t^3 y=3t^2 z=(3t)+t^3

Find the unit tangent vector T and the principle unit normal vector N of ⃗r(t) =...

Find the unit tangent vector T and the principle unit normal vector N of ⃗r(t) = cos t⃗i + sin t⃗j + ln(cos t)⃗k at t = π .

Find the unit tangent vector T and the principal unit normal vector N for the following...

Find the unit tangent vector T and the principal unit normal vector N for the following curve. r(t) = (9t,9ln(cost)) for -(pi/2) < t < pi/2