Question 7 Let r(t) = ( 11t, cos 5t, sin 5t> Find the unit tangent vector and the unit normal vector of r(t) at + = (Round to 2 decimal places) TE == NG) = < bic rocnonse
Let r(t) = <cos(5t), sin(5t), v7t>. (a) (7 points) Find |r'(t)|| (b) (7 points) Find and simplify T(t), the unit tangent vector. Upload Choose a File
Question 9 Let r(t)={cos 2t, sin 2t, V5t) a) Find the unit tangent vector and the unit normal vector of r(t) at += TI (Round to 2 decimal places) TE)= NG) = < b) Find the binormal vector of r(t) at t = TT 2 (Round to 2 decimal places) BC) =< A Moving to another question will save this response.
Find the Laplace transform F(s) L(f(t)) given f(t) = 5e-4 sin(5t) + 2e cos(6t). F(8) =
Find the curvature of the curve defined by F(t) = 227 + 5tj K= Evaluate the curvature at the point P(54.598, 10). Find the Tangent vector, the Normal vector, and the Binormal vector (T, Ñ and B) for the curve F(t) = (4 cos(5t), 4 sin(5t), 2t) at the point t = 0 T(0) - N(0) = BO) - Find the Tangent, Normal and Binormal vectors (T, Ñ and B) for the curve F(t) = (5 cos(4t), 5 sin(4t), 3t)...
Find the Tangent vector, the Normal vector, and the Binormal vector (T, Ñ and B) for the curve ř(t) = (2 cos(5t), 2 sin(5t), 4t) at the point t = 0 T(0) = ÑO) = B(0) =
Find the unit tangent vector to the curve defined by T F(t) = (2 cos(t), 2 sin(t), – 4 sin?(t)) at t 6 1 (6) (-1/4 + sqrt(3)*, sqrt(3)/4 + 11 * , sqrt(3)/2 -1t * Preview + 3t = undefined. Preview 4 ✓3 4 V3 + 1t = undefined. Preview 1t = undefined. 2
all parts -2t e - (13 points) Let f(t) cos 2t, sin 2t) for t 2 0. F() (a) (4 points) Find the unit tangent vector for the curve d (F(t)-v(t)) using the product rule for dt (b) (5 points) Let v(t) = 7'(t). Calculate the dot product and simplify v(t) (c) (4 points) For an arbitrary vector-valued function 7 (t) with velocity vector = 1, what can be said about the relationship between F(t) and v(t)? if F(t) (t)...
Consider the following vector function. r(t) = 5t, ed, e) (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. k(t) =
7.(16 points) Consider the curve F(t) = 4 cos(t)ī + 4 sin(t); +3tk. (a) Find the unit tangent vector T(t) and the unit normal vector function Ñ (t) at the point (-4,0,37). (b) Compute the curvature k at the point (-4,0,31).