p.s : the answer given in question for part b is incorrect.
2. Given A -4ax 2ay 3az and B 3ax 4ay az, find a. magnitude of 5A...
are Prove that Ā = 4ax – 2ay – az, B = ax + 4ay – 4az perpendicular to each other.
Q3/A Prove that Ā = 4ax – 2ay – az, B = ax + 4ay – 4az are perpendicular to each other. Q3/B Answer the questions with True on the right phrase and false on the wrong phrase with correct the wrong if you found it. Answer five only 1. – sin Ø Is the result of dot product for unit vectors ā, dotāz. 2. Vector field that each point in its region is described by a magnitude as well...
Q3/A Prove that Ā = 4ax – 2ay – az, B = ax + 4ay – 4az are perpendicular to each other. Q3/B Answer the questions with True on the right phrase and false on the wrong phrase with correct the wrong if you found it. Answer five only 1. – sin Ø Is the result of dot product for unit vectors ā, dotāz. 2. Vector field that each point in its region is described by a magnitude as well...
Let P = 2ax - 4ay + az and Q = ax + 2ay. Find R which has magnitude 4 and is perpendicular to both P and Q.
Given three vectors A-a,+2a, +3a, B-3a,+4a,+5a, and C-2a,-2ay +7a, compute (a) the scalar product A.B (b) the angle between A and B (c) the scalar projection of A on B (d) the vector product AxB (e) the area of the parallelogram whose sides are specified by A andB () the volume of a parallelepiped defined by vectors A, B and C (g) the vector triple product A x (Bx C) Given three vectors A-a,+2a, +3a, B-3a,+4a,+5a, and C-2a,-2ay +7a, compute...
Initials Given the following vectors A and B, A = 4i + 7j B-3i-6j, find the magnitude and direction for vector C- 5A-2B
5. For parts i, ii, and ii, find the vector's (a) magnitude and (b) angle relative to the positive x-axis: i) (150 N, 320 N) i) (0.251 lb, -1.34 Ib) i) (-4.5 kN, -1.2 kN) Use the following figure to answer problems 6 through 11: 5 35° 20° 6. Draw vector R P+Q (note: drawing does not need to be to scale, but think carefully about the sense of the components of R). 7. Using the law of cosines and...
5. Given vectors A 2âx - âv +3âz and B = 3âx - 2â^, find vector C whose magnitude is 6 and direction is perpendicular to both A and B. Hint C is orthogonal to both A and B 6. Determine Az so that vectors A = -2âx 3ây +A2âz and B = 3âx + ây +3âz are orthogonal
b) Calculate the components of the vector C c) Find the magnitude and direction of the vector C 1.) The vector A is given by the magnitude |A4.4 cm and the direction with respect to the +1-axis θΑ-140°. The vector B is given by the r-component Bz-4.4 cm and the y-component By3.2 cm
1. Given the vectors ū=(1,-2,-6) and v = (0,-3,4), a) Find u 6v. b) Find a unit vector in the opposite direction to ū. c) Find (ü.v)v. d) Find 11: e) Find the distance between ū and v. f) Are ū and y parallel, perpendicular, or neither? Explain. g) Verify the Triangle Inequality for ū and ū.