8. Find r(t) given the following information. r''(t)= 8 i + 12t k, r'(0)=6 j ,...

Find r(t) for the given conditions. r''(t) = −7 cos(t)j − 3 sin(t)k,     r'(0) = 3k,     r(0) =...

Find r(t) for the given conditions. r''(t) = −7 cos(t)j − 3 sin(t)k,     r'(0) = 3k,     r(0) = 7j

Q1 If r(t) = (2t2 - 5)i + (t - 2)j + (4t + 10)k, find...

Q1 If r(t) = (2t2 - 5)i + (t - 2)j + (4t + 10)k, find the curvature k(t) at t = 1. 21733 3433 4173333 3433 Q2 Find the curvature k ( t ) for r ( t ) = 8 sin ⁡ t i + 8 cos ⁡ t j Group of answer choices 1 0 −sin2⁡t+cos2⁡t

Given r(t)=sin(t)i+cos(t)j−ln(cos(t))k, find the unit normal vector N(t) evaluated at t=0,N(0).

Given r(t)=sin(t)i+cos(t)j−ln(cos(t))k, find the unit normal vector N(t) evaluated at t=0,N(0).

Find the curvature, k(t), of the following: r(t) = t i + t^2 j + e^t...

Find the curvature, k(t), of the following: r(t) = t i + t^2 j + e^t k

The position of an object at time t is given by: r(t)=e^−t i + e^t j...

The position of an object at time t is given by: r(t)=e^−t i + e^t j − t√2 k, 0≤ t<∞. (a) Determine the velocity v and the speed of the object at time t. (b) Determine the acceleration of the object at time t. (c) Find the distance that the object travels during the time interval 0≤ t<ln3. Answers: (a) = velocity: v =−e^−t i + e^t j − √2 k; speed: ||v||= e^t + e^−t, (b) = acceleration:...

Given that the acceleration vector is a(t)=(-9 cos(3t))i+(-9 sin(3t))j+(-5t)k, the initial velocity is v(0)=i+k, and the...

Given that the acceleration vector is a(t)=(-9 cos(3t))i+(-9 sin(3t))j+(-5t)k, the initial velocity is v(0)=i+k, and the initial position vector is r(0)=i+j+k, compute: A. The velocity vector v(t) B. The position vector r(t)

find the curvature of the curve r(t). r(t) = (8+8cos5t)i -(4+8sin5t)j + 8k

find the curvature of the curve r(t). r(t) = (8+8cos5t)i -(4+8sin5t)j + 8k

Find the domain of r(t) = 4e^−t i + e^−t j + ln(t − 1)k. (Enter...

Find the domain of r(t) = 4e^−t i + e^−t j + ln(t − 1)k. (Enter your answer using interval notation.)

Given r(t) = (et cos(t) )i + (et sin(t) )j + 2k. Find (i) unit tangent...

Given r(t) = (et cos(t) )i + (et sin(t) )j + 2k. Find (i) unit tangent vector T. (ii) principal unit normal vector N.

(1 point) If C is the curve given by r(t)=(1+5sint)i+(1+2sin2t)j+(1+3sin3t)k, 0≤t≤π2 and F is the radial...

(1 point) If C is the curve given by r(t)=(1+5sint)i+(1+2sin2t)j+(1+3sin3t)k, 0≤t≤π2 and F is the radial vector field F(x,y,z)=xi+yj+zk, compute the work done by F on a particle moving along C.