28-29. Unit tangent vectors Find the unit tangent vector T(t) for the following parameterized curves. Then determine the unit tangent vector at the given value of t. 28. r(t) = (8, 3 sin 2t, 3 cos 2t), for 0 < t < n; t =1/4 29. r(t) = (2e', e", t), for 0 < t < 2n; t = 0 %3D 30-31. Velocity and acceleration from position Consider the following position functions.

#28

Transcribed Image Text:

(ot* i + 4t j + 20. dt sin at i+j+ k dt 1+t2 er 21. 22-24. Derivative rules Suppose u and v are differentiable functions at t =0 with u(0) = (2, 7, 0), u'(0) = (3, 1, 2), v(0) = (3,-1, 0), and v'(0) = (5, 0, 3). Evaluate the following expressions. d 22. (u v)t=0 dt d -(u x v) t=0 23. dt d 24. dt (u(et. 25-27. Finding r from r' Find the function r that satisfies the given conditions. 25. r'(t) = (1, sin 2t, sec? t); r(0) = (2, 2, 2) 26. r'(t) = (e', 2e", 6e*); r(0) = (1, 3, – 1) 27. r'(t) = 4 2t + 1, 3t2 ?); r(1) = (0, 0, 0) 1+t2 ' 28-29. Unit tangent vectors Find the unit tangent vector T(t) for the following parameterized curves. Then determine the unit tangent vector at the given value of t. 28. r(t) = (8, 3 sin 2t, 3 cos 2t), for 0 < t < n; t = T/4 29. r(t) = (2e', e2", t), for 0 < t < 2n; t = 0 30-31. Velocity and acceleration from position Consider the following position functions. a. Find the velocity and speed of the object. b. Find the acceleration of the object. 30. r(t) = (t +1, t2 + 10t 3 for t >0 31. r(t) = (e" +1, e* 1 et+1 for t >0