Curve given below, find the vectors T, N, and B at the point given. r(t) =...

Find the curvature of the curve r(t) = <etcos(t), etsin(t), t> at the point (1,0,0)

Find the curvature of the curve r(t) = <etcos(t), etsin(t), t> at the point (1,0,0)

Find the vectors T and N and the binormal vector B = T ⨯ N, for...

Find the vectors T and N and the binormal vector B = T ⨯ N, for the vector-valued function r(t) at the given value of t. r(t) = 6 cos(2t)i + 6 sin(2t)j + tk,    t0 = pi/4 find: T(pi/4)= N(pi/4)= B(pi/4)=

Find T, N, and B for the given space curve. r(t) = (t2-9)i + (2t-9)j +...

Find T, N, and B for the given space curve. r(t) = (t2-9)i + (2t-9)j + 4k

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)=

1. (1 point) For the curve given by r(t)=〈−7t,−4t,1+7t2〉r(t)=〈−7t,−4t,1+7t2〉, Find the derivative r′(t)=〈r′(t)=〈, , , 〉...

1. (1 point) For the curve given by r(t)=〈−7t,−4t,1+7t2〉r(t)=〈−7t,−4t,1+7t2〉, Find the derivative r′(t)=〈r′(t)=〈, , , 〉 Find the second derivative r″(t)=〈r″(t)=〈 Find the curvature at t=1t=1 κ(1)=κ(1)= 2. (1 point) Find the distance from the point (-1, -5, 3) to the plane −4x+4y+0z=−3.

find the length of the curve r(t)=(tsint+cost)i+(tcost-sint)j from t=sqrt(2) to 2

find the length of the curve r(t)=(tsint+cost)i+(tcost-sint)j from t=sqrt(2) to 2

15. Find the principle unit normal vector to the curve given below at the specified point....

15. Find the principle unit normal vector to the curve given below at the specified point. r(t)= t i + 4/t j, t=2

1) Find the curvature of the curve r(t)= 〈2cos(5t),2sin(5t),t〉 at the point t=0 Give your answer...

1) Find the curvature of the curve r(t)= 〈2cos(5t),2sin(5t),t〉 at the point t=0 Give your answer to two decimal places 2) Find the tangential and normal components of the acceleration vector for the curve r(t)=〈 t,5t^2,−5t^5〉 at the point t=2 a(2)=? →T +  →N

At a given point on a smooth space curve r(t), T(t) is the unit tangent vector,...

At a given point on a smooth space curve r(t), T(t) is the unit tangent vector, N(t) is the principle unit normal vector and B(t) is the binormal vector. Which of the following are correct? (The multiple-choice question might have more than one correct answer. Circle all correct answers for full credit.) Group of answer choices A)None of the above has to be true. B) T ( t ) ⋅ T ′ ( t ) = 0 C) | B...

For the given parametrized curve C, find the area above the x-y plane that is under...

For the given parametrized curve C, find the area above the x-y plane that is under C (using line integrals) C: r(t) = <3 cost, 3 sint, 2t> for 0 ≤ t ≤ 2π