Computing Project 2
Properties of Areas
Posting ID:3124-127
Zhihao Ye
2016/02/23
Posting ID:3124-127
ID:1206853124
Introduction
The computing project Properties of Areas concerns the computation of various
properties of cross sectional areas. In each of o
CEE 213Deformable Solids
Arizona State University
The Mechanics Project
CP 2Properties of Areas
Computing Project 2
Properties of Areas
The computing project Properties of Areas concerns the computation of various properties
of cross sectional areas. In e
Arizona State University
CEE 212Dynamics
The Mechanics Project
CP 1Projectile
Computing Project 1
Projectile
Introduction
The computing project Projectile concerns the theory of particle dynamics. The concept
is to model projectile motion including the no
Arizona State University
CEE 212Dynamics
The Mechanics Project
CP 4Impact
Computing Project 4
Impact
Introduction
The fourth computing project is called Impact. The concept is to model the motion of a two
bars that swinging freely about their hinges, but
CEE 212-Dynamics
CEE 212Dynamics
Lecture 5
rigid bodiesmass distributed over a volume
The Mechanics Project
School for Sustainable Engineering and the Built Environment
Ira A. Fulton Schools of Engineering
Arizona State University
Keith D. Hjelmstad 2013
CEE 212Dynamics
Arizona State University
Dynamics Solutions Library
Keith D. Hjelmstad
Example 4.3 Particle impacting pendulum
C
A uniform rod of length L and mass per unit length hangs at rest
vertically from a frictionless hinge at C. The rod is struck
CEE 212Dynamics
Arizona State University
Dynamics Solutions Library
Keith D. Hjelmstad
Example 4.1 Unbalanced hoop
The light circular hoop carries a uniform heavy band of weight W
around half of its circumference. If the hoop is released from rest
in the
CEE 212Dynamics
Arizona State University
Dynamics Solutions Library
Keith D. Hjelmstad
Example 4.0 Rod with base acceleration
A uniform rod of length L and total weight W is pushed by a
cart on a frictionless surface. The horizontal motion of the cart
is
CEE 212Dynamics
Arizona State University
Dynamics Solutions Library
Keith D. Hjelmstad
Example 3.3 Impact of masses on vertical slider
A
Slider A of mass m is positioned a distance h above slider B of mass M,
which rests on a spring of modulus k. Slider A
CEE 212-Dynamics
CEE 212Dynamics
Contents.
Particles II
power, work, and energy
Keith D. Hjelmstad
The Mechanics Project
Arizona State University
Keith D. Hjelmstad 2013
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Objectives
Kinetic energy of a particle.
Powe
CEE 212Dynamics
Arizona State University
Dynamics Solutions Library
Keith D. Hjelmstad
Example 3.1 Particle sliding on bar with elastic cords
z
The particle P of mass m slides along a frictionless shaft and is
propelled by two elastic bands anchored at E
CEE 212Dynamics
Arizona State University
Dynamics Solutions Library
Keith D. Hjelmstad
Example 3.0 Block on Plane with Spring
The box of mass m slides down the incline that makes an angle with the
horizontal plane. The box is attached to an elastic cord,
CEE 213Deformable Solids
CEE 213Deformable Solids
CP 3Planar Beam
Bernoulli-Euler beam with variable load
Keith D. Hjelmstad
School for Sustainable Engineering and the Built Environment
Ira A. Fulton Schools of Engineering
Arizona State University
Keith