Mathematics 1229A/B Lecture Notes - Lecture 3: Parallelogram, Dot Product, Cross Product

For the three vectors v = (1, 5, 7), u = (2, -3, -4), w =(0, -2,-2) and four points O=(0, 0, 0), A=(l, 6, 4), B=(2, 4, -1), and C=(-l, 2, 5) in R3 Find: The angles between (u,v), (v,w), and (u, w) then classify the angle if it is right angle, acute, or obtuse. The length s from the figure above The vector component of u along v and the vector component of u orthogonal to v. The vector component of v along w and the vector component of v orthogonal to w. The vector component of w along u and the vector component of w orthogonal to u.

Which of u and -u is equal to v times w? Which of the following form a right - handed system? {v, w, u} {w, v, u} {v, u, w} {u, v, w} {w, v, -u}{v, -u, w} Let v = {3, 0, 0} and w = {0,1, -1}. Determine u = v times w using the geometric properties of the cross product rather than the formula. What are the possible angles theta between two unit vectors e and f if ||e times f|| = 1/2? Show that if v and w lie in the yz - plane, then v times w is a multiple of i. Find the two unit vectors orthogonal to both a = {3, 1, 1} and b = {-1, 2, 1}. Let e and e' be unit vectors in R3 such that e e'. Reason geometrically to find the cross product e times (e' times e). Calculate he force F on an electron (charge q = -1.6 times 10 - 19 C) moving with velocity 105 m/s in the direction I in a uniform mag