Evaluate the integral. (sec2(t) i + t(t2 + 1)7 j + t3 ln(t) k) dt

Evaluate the integral. 7 t^3i+t(t-6)^1/2j+tsin(pit)k dt 6

Evaluate the integral. 7 t^3i+t(t-6)^1/2j+tsin(pit)k dt 6

Let F(x, y, z)  =  (3x2 ln(6y2 + 2) + 8z3) i  +  (  12yx3 6y2...

Let F(x, y, z)  =  (3x2 ln(6y2 + 2) + 8z3) i  +  (  12yx3 6y2 + 2 + 7z) j  +  (24xz2 + 7y − 10π sin πz) k and let  r(t)  =  (t3 + 1) i  +  (t2 + 2) j  +  t3 k ,  0  ≤  t  ≤  1. Evaluate   C ∫ C F · dr .

Find T, N, B, aT, aN at t=2 (#13) 13. r(t) = (t3/3)i + (t2/2)j when...

Find T, N, B, aT, aN at t=2 (#13) 13. r(t) = (t3/3)i + (t2/2)j when t > 0

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.)

Consider the parametric curve x = t2, y = t3 + 3t, −∞ < t <...

Consider the parametric curve x = t2, y = t3 + 3t, −∞ < t < ∞. (a) Find all of the points where the tangent line is vertical. (b) Find d2y/dx2 at the point (1, 4). (c) Set up an integral for the area under the curve from t = −2 to t = −1. (d) Set up an integral for the length of the curve from t=−1 to t=1.

Find the curvature of ~r(t) = (t3 −5)~ i + (t4 + 2)~ j + (2t...

Find the curvature of ~r(t) = (t3 −5)~ i + (t4 + 2)~ j + (2t + 3)~ k at the point P(−6,3,1)?

Evaluate the following integral: 1. ∫xsec(square)xdx 2. ∫e(power)t{root(1+e(power)2t)}dt

Evaluate the following integral: 1. ∫xsec(square)xdx 2. ∫e(power)t{root(1+e(power)2t)}dt

Find the osculating plane of r(t) =< t2, 32 t3, t > at (1, 2/3, 1)

Find the osculating plane of r(t) =< t2, 32 t3, t > at (1, 2/3, 1)

Let h be the function defined by H(x)= integral pi/4 to x (sin^2(t))dt. Which of the...

Let h be the function defined by H(x)= integral pi/4 to x (sin^2(t))dt. Which of the following is an equation for the line tangent to the graph of h at the point where x= pi/4. The function is given by H(x)= integral 1.1 to x (2+ 2ln( ln(t) ) - ( ln(t) )^2)dt for (1.1 < or = x < or = 7). On what intervals, if any, is h increasing? What is a left Riemann sum approximation of integral...

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).