Concept explainers
A system consists of three identical 19.32-lb particles A, B, and C. The velocities of the particles are, respectively, vA = vA j, vB = vBi, and vC = vCk. Knowing that the angular momentum of the system about O expressed in ft · lb · s is HO = −1.2k, determine (a) the velocities of the particles, (b) the angular momentum of the system about its mass center G.
Fig. P14.11 and P14.12
(a)
Find the velocities of the particles.
Answer to Problem 14.11P
The velocity of particles A is
The velocity of particles B is
The velocity of particles C is
Explanation of Solution
Given information:
The angular momentum about point O is
Calculation:
The mass of three particles A, B, and C is equal.
Determine the weight of the identical particle.
Here, W is weight of each particle,
Substitute
Write the position vectors for the particles based on the given coordinate system:
Determine the angular momentum of the system about the origin using the Equation.
Here,
Substitute
Equating i, j, k components.
Find the velocity at point B as follows:
Thus, the velocity of particles B is
Find the velocity at point C as follows:
Substitute
Thus, the velocity of particles C is
Find the velocity at point A as follows:
Substitute
Thus, the velocity of particles A is
Determine position vector
Here,
Substitute
Find the position vector from the particles
Here,
Substitute
Find the position vector from the particles
Here,
Substitute
Find the position vector from the particles
Here,
Substitute
Express the linear momentum of particle A as follows:
Express the linear momentum of particle B as follows:
Express the linear momentum of particle C as follows:
(b)
Find the angular momentum
Answer to Problem 14.11P
The angular momentum
Explanation of Solution
Calculation:
Calculate the angular momentum about point G using the relation:
Here,
Substitute
Thus, the angular momentum
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Chapter 14 Solutions
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