Find the angle between u = (-4, -1) and v=(-5, - 2) to the nearest tenth of a degree. 0 The angle between u and v is (Round to the nearest tenth.)
two parts! thank you! Find u + v. u = (5, - 4) and v= (-3, -5) u u+v=< 0) (Simplify your answers.) Use the paralelogram de to find the magnitude of the resultant force for the two foroes shown in the figure. The magrouse of the room force Round on the
Problem #5: (a) Let u =(2, -4,-8, -10) and v=(-1, -3, 8, -10). Find ||u – proj,u||. Note: You can partially check your work by first calculating projyu, and then verifying that the vectors projyu and u-proj,u are orthogonal. (b) Consider the following vectors u, v, w, and z (which you can copy and paste directly into Matlab). v = (-8.1 4.2 6.3], w = [-9 -3.7 5.5], u z = = [-8.6 -3.4 -7.1], [-3.2 2 -4.9] Find the...
Find u v, v x u, and v x v. u = (9, -3, -2), v = (4, -5, 6) (a) u v (b) vxu (c) v x V CS anne nScanner
Let u = [1, 3, -2], v = [-1, 1, 1], w = [5, 1, 4]. a) Check if the system of vectors {u,v,w} is an orthogonal or othonormal basis of E3. b) Find the coordinates of the vector [1,0,1] in this basis.
4, =(7,5), u =(-3,-1) 2) Let v = (1,-5), v = (-2,2) and let L be a linear operator on Rwhose matrix representation with respect to the ordered basis {u,,,) is A (3 -1 a) Determine the transition matrix (change of basis matrix) from {v, V, } to {u}. (Draw the commutative triangle). b) Find the matrix representation B, of L with respect to {v} by USING the similarity relation
Viu 1.u For u = v _ -3 1, find viu, l|v||, 4, and a unit vector in the 2 1-1) direction opposite of u.
Help please. (1 point) Let u = | 4 | and v = 1-6 2 Find two different vectors in span((u, v]) that are not multiples of u or v and show the weights on u and v used to generate them u+ v= ˇ- Note: enter vectors using WeBWorK's vector notation.
Find u xv, v xu, and v x v. u = (-2, 9, -3), v = (6, -5, 4) (a) ux v (b) vxu (c) v x
Use a graphing utility with vector capabilities to find u x v. u = (-4, 2, 4), v = (2, 4, 2) Show that u x v is orthogonal to both u and v. (u x V) u = (u x V): V =