How to et up T-accounts for the accounts? And the whole answer?

Find an arc length parametrization of r(t) = (et sin(t), et cos(t), 10et )

Find an arc length parametrization of r(t) = (et sin(t), et cos(t), 10et )

Let r = < et, sin t, et >. Compute v, a, aT, and aN.

Let r = < et, sin t, et >. Compute v, a, aT, and aN.

17.)Find the curvature of r(t) at the point (1, 0, 0). r(t) = et cos(t), et...

17.)Find the curvature of r(t) at the point (1, 0, 0). r(t) = et cos(t), et sin(t), 3t κ =

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 of the curve r(t)= < et , t , t2 >.

Find the curvature of the curve r(t)= < et , t , t2 >.

Suppose {et : t = −1, 0, 1, . . .} is a sequence of iid...

Suppose {et : t = −1, 0, 1, . . .} is a sequence of iid random variables with mean zero and variance 1. Define a stochastic process by xt = et − 0.5et−1 + 0.5et−2, t = 1, 2, . . . a. Is xt stationary? Show your work. 2. Is xt weakly dependent? Again, show your work.

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

Find the length of the curve. (square root 2) t i + et j + e−t k   0 ≤ t ≤ 6

Differential Equations. ty'+3y=et /t with t > 0 and initial data y(1) = 2

Differential Equations. ty'+3y=et /t with t > 0 and initial data y(1) = 2

Compute the surface area of the surface generated by revolving the curve ?(?)=(?,??)c(t)=(t,et) about the ?-x-axis...

Compute the surface area of the surface generated by revolving the curve ?(?)=(?,??)c(t)=(t,et) about the ?-x-axis for 0≤?≤1.

Considering the set X = {- 1,1}: Define a topology T over X, such that ET...

Considering the set X = {- 1,1}: Define a topology T over X, such that ET (X, T) is T4. Define a sequence {xn} in X such that: The first 20 terms of {xn} correspond to 20 tosses of a coin (coding as -1 the result corresponding to one side of the coin, and as 1 the result corresponding to the opposite side of the same coin)