(1 point) Find the minimum speed of a particle with trajectory c(t)=(t^3−4t,t^2+1)

1. (1 point) For the curve given by r(t)=〈−7t,−4t,1+7t2〉r(t)=〈−7t,−4t,1+7t2〉, Find the derivative r′(t)=〈r′(t)=〈, , , 〉...

1. (1 point) For the curve given by r(t)=〈−7t,−4t,1+7t2〉r(t)=〈−7t,−4t,1+7t2〉, Find the derivative r′(t)=〈r′(t)=〈, , , 〉 Find the second derivative r″(t)=〈r″(t)=〈 Find the curvature at t=1t=1 κ(1)=κ(1)= 2. (1 point) Find the distance from the point (-1, -5, 3) to the plane −4x+4y+0z=−3.

Find y(t) solution of the initial value problem 3ty^2y'-6y^3-4t^2=0, y(1)=1, t>0

Find y(t) solution of the initial value problem 3ty^2y'-6y^3-4t^2=0, y(1)=1, t>0

. Find the length of the trajectory of the curve defined below. r(t) = 〈 t^2...

. Find the length of the trajectory of the curve defined below. r(t) = 〈 t^2 + 2, 2/3 t^3 − 5t + 3, 3t^2 + 4〉 , 0 ≤ t ≤ 3

Find the length of the trajectory of the curve defined below. r(t) = 〈 t 2...

Find the length of the trajectory of the curve defined below. r(t) = 〈 t 2 + 2, 2 3 t 3 − 5t + 3, 3t 2 + 4〉 , 0 ≤ t ≤ 3

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...

Let F⃗=xi⃗+(x+y)j⃗+(x−y+z)k⃗ . Let the line l be x=t−1, y=3−4t , z=1−4t . (a) Find a...

Let F⃗=xi⃗+(x+y)j⃗+(x−y+z)k⃗ . Let the line l be x=t−1, y=3−4t , z=1−4t . (a) Find a point P=(x0,y0,z0) where F⃗ is parallel to l . Find a point Q=(x1,y1,z1) at which F⃗ and l are perpendicular. Give an equation for the set of all points at which F⃗ and l are perpendicular.

3. The parametric curve ~r1(t) = 4t~i + (2t − 2)~j + (6t 2 − 7)~k...

3. The parametric curve ~r1(t) = 4t~i + (2t − 2)~j + (6t 2 − 7)~k is given. (a) Find a parametric equation of the tangent line at the point (4, 0, −1) (b) Find points on the curve at which the tangent lines are perpendicular to the line x = z, y = 0 (c) Show that the curve is at the intersection between a plane and a cylinder

A particle that moves along a straight line has velocity v(t)=4t^(2)e^(-t) meters per second after t...

A particle that moves along a straight line has velocity v(t)=4t^(2)e^(-t) meters per second after t seconds. How far will it travel during the first t seconds?

The coordinates of a point moving in the plane are given as x = 4t- (5t.t),...

The coordinates of a point moving in the plane are given as x = 4t- (5t.t), y = (- 3t.t) (4t.t.t) in x, y meters and t seconds. a) t = 2 seconds, coordinates and location vector, b) average speed and acceleration during the first 2 seconds, c) Find the moment velocity and acceleration at t = 2 seconds.

The trajectory of a particle moving on a straight line is x(t) = A cos ωt...

The trajectory of a particle moving on a straight line is x(t) = A cos ωt + B sin ωt. a) What are the units for the fixed numbers A, B and ω (the greek letter omega), assuming that x is measured in meters and t in seconds? b) There is a shortest non-zero time T such that x(t + T) = x(t); what is it? c) What is the velocity of the particle? d) What are the initial position...