Let V1,Vk be the points in R³ and suppose that forj = 1, ..., k an object with mass m; is located at point vj.Physicists call such objects point masses. The total mass ofthe system of point masses is m = m₁ + ... + mk. The center ofgravity (or center of mass) of the system is1PointV₁ = (3,-5,3)V₂ = (6,3,-3)Mass6915gV3 ( 4, 3, 2)6 gV4 = (-6,9,7)3 gv =+...Compute the center of gravity of the system consisting of the point masses above.

Step 1: Step 2: Step 3: Step 4:

Answered: Let V1, Vk be the points in R³ and…

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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4. a. If 37– 2ỷ = đ and 53 – 3ỷ = b, express the vectors i and y in terms of a and b. %3D b. Solve for a, b, and c: (2, –1, c) + (a, b, 1) – 3(2, a, 4) = (-3, 1, 2c). %3D
Given the points A(-1, 2, 0), B(1, 0, 3) and С(1, 0, 2), find AB - AC x BС.
Given the vectors vi = (x,1, 1), v2 = (1,x,1) and v3 = (1,1,x). S = {v1, v2, V3} Find the solution set of x so that the %3D set R3 is a base.
6. Show that the points A, B and C with position vectors d = 3î – 4) – 4k, 6 = 2î – ĵ + k and č = i – 33 – 5k, respectively form the vertices of a right-angled triangle.
14. Given that a and bare two vectors, then the vector (a + b) x (a – b) is A. perpendicular to (a – b) B. parallel to (a – b) C. parallel to (a + b) D. equal to (2a – b)
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