For problem 1 to 3, use r(t)= <e^2t cost, e^2t sint, e^2t> to find each of...

Show that -e^(-t)(sint) +3/2cos^2tsinte^(-t) -e^(t)cost+3/2e^(-t)cos^2(t)sint is equal to -e^(-t)sint +e^(-t)cost

Show that -e^(-t)(sint) +3/2cos^2tsinte^(-t) -e^(t)cost+3/2e^(-t)cos^2(t)sint is equal to -e^(-t)sint +e^(-t)cost

Let r(t) = 1/2t ,4t^1/2 ,2t be a position function for some object. (a) (2 pts)...

Let r(t) = 1/2t ,4t^1/2 ,2t be a position function for some object. (a) (2 pts) Find the position of the object at t = 1. (b) (6 pts) Find the velocity of the object at t = 1. (c) (6 pts) Find the acceleration of the object at t = 1. (d) (6 pts) Find the speed of the object at t = 1. (e) (15 pts) Find the curvature K of the graph C determined by r(t) when...

6. Given vector function r(t) = t2 − 2t, 1 + 3t, 1 3 t 3...

6. Given vector function r(t) = t2 − 2t, 1 + 3t, 1 3 t 3 + 1 2 t 2 i (a) Find r 0 (t) (b) Find the unit tangent vector to the space curve of r(t) at t = 3. (c) Find the vector equation of the tangent line to the curve at t = 3

Find a particular solution to the following equations (d'''y/dt''') + y = t^3 + sint +...

Find a particular solution to the following equations (d'''y/dt''') + y = t^3 + sint + 11e^t (d'' y/dt'') + y = 2tsint (d'''''y/dt''''') − (4d'''y/dt''') = e^2t + t^2 + 5t + 4

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)?

1. a) Get the arc length of the curve. r(t)= (cos(t) + tsin(t), sin(t) - tcos(t),...

1. a) Get the arc length of the curve. r(t)= (cos(t) + tsin(t), sin(t) - tcos(t), √3/2 t^2) in the Interval 1 ≤ t ≤ 4 b) Get the curvature of r(t) = (e^2t sen(t), e^2t, e^2t cos (t))

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

Find the solution for the initial value problem. (sint)y′ +(cost)y=t, y(π/2)=2

Find the solution for the initial value problem. (sint)y′ +(cost)y=t, y(π/2)=2

Find the curvature of r(t) at the point (3, 1, 1). r(t) = <3t, t^2 ,...

Find the curvature of r(t) at the point (3, 1, 1). r(t) = <3t, t^2 , t^3> k=

a) Determine: L{t^3 e^2t+e^2t sin( 5t)} and b) Find L^(-1) {(3s+2)/(s^2+2s+10)}

a) Determine: L{t^3 e^2t+e^2t sin( 5t)} and b) Find L^(-1) {(3s+2)/(s^2+2s+10)}