Find the length of the curve. (square root 2) t i + et j + e−t ...

Find the length of the curve ?(?) = ? + ?^2 j + t^3 k in...

Find the length of the curve ?(?) = ? + ?^2 j + t^3 k in [0.2]

Consider the curve r(t) = cost(t)i + sin(t)j + (2/3)t2/3k Find: a. the length of the...

Consider the curve r(t) = cost(t)i + sin(t)j + (2/3)t2/3k Find: a. the length of the curve from t = 0 to t = 2pi. b. the equation of the tangent line at the point t = 0. c. the speed of the point moving along the curve at the point t = 2pi

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

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.

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:...

find the equation of a tangent line to the curve x = ( square root of...

find the equation of a tangent line to the curve x = ( square root of t) / (1+t^2) at t = 4

Find the length L of the curve R(t)=5cos(t)i−5sin(t)j+3tk over the interval [2,5]. L= ?

Find the length L of the curve R(t)=5cos(t)i−5sin(t)j+3tk over the interval [2,5]. L= ?

for a and b use x= Square root x and g(x)=x/2 a)      Find the arc length...

for a and b use x= Square root x and g(x)=x/2 a)      Find the arc length of the curve of f(x) for 0≤x≤4.                   b)      Find the surface area of the solid of revolution revolved about the x-axis of             f(x) for 0≤x≤4.

Calculate the arc length of the indicated portion of the curve r(t). r(t) = 6√2 t^((3⁄2)...

Calculate the arc length of the indicated portion of the curve r(t). r(t) = 6√2 t^((3⁄2) )i + (9t sin t)j + (9t cos t)k ; -3 ≤ t ≤ 7