Using the graphing utility the result is
u × v= (-12, 16 , -20)
Now we find the other results.
(u × v) • u = 0
(u × v) • v = 0
Hence orthogonal property satisfied.
Use a graphing utility with vector capabilities to find u x v. u = (-4, 2,...
Exercise Set Chapter 3 Q1) Let u = (2, -2, 3), v = (1, -3, 4), and w=(3,6,-4). a) Evaluate the given expression u + v V - 3u ||u – v| u. V lju – v|w V X W ux (v x W) b) Find the angle 8 between the vector u = (2,-2,3) and v = (1, -3,4). c) Calculate the area of the parallelogram determined by the vector u and v d) Calculate the scalar triple product...
ra Use a graphing utility to complete the table and estimate the limit as x approaches infinity. Then use a g f (x)--3x2- x + 2 10 10 10 10 f (x) 1.5 10 10 T | 29,4| 42.6| 50.5 5aj 58.9 75 90 1051 120 63,0 66,4| 67.3 | 60.0 for the data(Round your coeficents to hee (a) Use the regression capabilities of a graphing ulity to find a model of the form T,-tbe b) Use a graphing utlty...
Find the least squares regression line for the points. Use the regression capabilities of a graphing utility to verify your results. (0,4), (1, 5), (3, 6), (6,9), (8, 10) ya Use the graphing utility to plot the points and graph the regression line. у y 12 12 10 10 8 6A 2 2 2 + 6 8 10 6 8 10 y 12 y 12 10 10 8 2 8 6 10 В 2 10
Find a unit vector orthogonal to both u and v. u = i - 2j V = i + 3k Need Help? Read It Master It Talk to a Tutor Submit Answer Scanned with CamScanner
Use a software program or a graphing utility with matrix capabilities and Cramer's Rule to solve (if possible) the system of linear equations. (If not possible, enter IMPOSSIBLE.) 3x1 - 2x2 + 9x3 + 4x4 = 27 -X1 - 9x3 – 6X4 = -9 3x3 + X4 = 7 2X1 + 2x2 + 8x4 = -36 (x1, x2, x3, x4) = Use Cramer's Rule to solve the system of linear equations for x and y. kx + (1 - k)y...
(Section 11.3) Find the projection of u onto v and find the vector component of u orthogonal to v for: u=8 i+2j v = (2, 1, -2)
USE MATLAB TO ANSWER PLEASE
Let u = | 2 | and v = . Use the MATLAB functions normo, cross(), and dot() , to complete the -6 following tasks: (a) Determine the length of u and v. Write down the answer produced by MATLAB, accurate to 4 decimal places (b) Compute u x v; call this vector w. (c) Verify that w is orthogonal to both u and v
Let u = | 2 | and v = ....
For parts ( a ) − ( c ), let u = 〈 2 , 4 , − 1 〉 and v = 〈 4 , − 2 , 1 〉. ( a ) Find a unit vector which is orthogonal to both u and v. ( b ) Find the vector projection of u onto v. ( c ) Find the scalar projection of u onto v.
TETETTERE Find u xv. u = (0, 1, -6), v= (1, -1,0) Show that u x v is orthogonal to both u and v. (u X v) · u = (u x v) v = Need Help? Read It Talk to a Tutor Solond Answer with CamScanner
please do 5 and 6
Consider the following. u = (10, -5, 0) v = (-4, 5, 0) Find u Times v. Determine if u Times v is orthogonal to both u and v by finding the values below, u middot (u Times v) = V (u Times v) = u Times v is orthogonal to both u and v. u Times v is not orthogonal to both u and v. Find a unit vector that is orthogonal to both...