Question

In: Math

Consider the vector function given below. r(t) = 2t, 3 cos(t), 3 sin(t) (a) Find the...

Consider the vector function given below.
r(t) =

2t, 3 cos(t), 3 sin(t)

(a) Find the unit tangent and unit normal vectors T(t) and N(t).
T(t)   =   

N(t)   =   


(b) Use this formula to find the curvature.
κ(t) =

Solutions

Expert Solution

The answer sheet has three pages.it is the first pageThis is the second pageand this is the third/last page

milcah answered 2 years ago
Next > < Previous

Related Solutions

Consider the helix r(t)=(cos(2t),sin(2t),−3t)r(t)=(cos(2t),sin(2t),−3t). Compute, at t=π/6 A. The unit tangent vector T=T= ( , ,...
Consider the helix r(t)=(cos(2t),sin(2t),−3t)r(t)=(cos(2t),sin(2t),−3t). Compute, at t=π/6 A. The unit tangent vector T=T= ( , , ) B. The unit normal vector N=N= ( , , ) C. The unit binormal vector B=B= ( , , ) D. The curvature κ=κ=
Given r(t) = <2 cos(t), 2 sin(t), 2t>. • What is the arc length of r(t)...
Given r(t) = <2 cos(t), 2 sin(t), 2t>. • What is the arc length of r(t) from t = 0 to t = 5. SET UP integral but DO NOT evaluate • What is the curvature κ(t)?
Given the vector function r(t)=〈√t , 1/(t-1) ,e^2t 〉 a) Find: ∫ r(t)dt b) Calculate the...
Given the vector function r(t)=〈√t , 1/(t-1) ,e^2t 〉 a) Find: ∫ r(t)dt b) Calculate the definite integral of r(t) for 2 ≤ t ≤ 3 can you please provide a Matlab code?
Consider the spiral path x(t) = (cos^2t,sin^2t,t) for 0 ≤ t ≤ π/2. Evaluate the integral...
Consider the spiral path x(t) = (cos^2t,sin^2t,t) for 0 ≤ t ≤ π/2. Evaluate the integral x dx−y dy + z^2 dz
3. Consider the parametric curve x = sin 2t, y = − cos 2t for −π/4...
3. Consider the parametric curve x = sin 2t, y = − cos 2t for −π/4 ≤ t ≤ π/4. (a) (2 pts) Find the Cartesian form of the curve. (b) (3 pts) Sketch the curve. Label the starting point and ending point, and draw an arrow on the curve to indicate the direction of travel. (c) (5 pts) Find an equation for the curve’s tangent line at the point √2/2, −√2/2 .
Consider the vector functions ?(?) and ?(?), where ?(?) = 〈? sin ? , ? cos...
Consider the vector functions ?(?) and ?(?), where ?(?) = 〈? sin ? , ? cos ? , ?^2〉, ?(?) = 〈1, −1, 1〉, and ?′(?) = 〈1, 0, −1〉. Define ?(?) = ?(?) × ?(?) and find ?′(?)
For this parametrized curve: x = e^(2t) sin t , y = cos(4t) find tangent line...
For this parametrized curve: x = e^(2t) sin t , y = cos(4t) find tangent line to curve when t=1
3sin(t)+3sin(t)sin(2t)=3cos(t)-cos(3t). I'm trying to solve for t.
3sin(t)+3sin(t)sin(2t)=3cos(t)-cos(3t). I'm trying to solve for t.
Determine whether the curve denoted by the vector function r(t) = <2 + sin(5t), -6, 3/2...
Determine whether the curve denoted by the vector function r(t) = <2 + sin(5t), -6, 3/2 (cos(5t))> lies on the surface 9x^2 - 36x - y^2 + 4z^2 = -36.
Let r(t) = (cos(πt), sin(πt), 3t). Calculate r'(t), T(t) and evaluate T(1).
Let r(t) = (cos(πt), sin(πt), 3t). Calculate r'(t), T(t) and evaluate T(1).
ADVERTISEMENT
Subjects
ADVERTISEMENT
Latest Questions
ADVERTISEMENT