Designed for sophomores and juniors in a mechanical/aerospace engineering program, this sophisticated introduction presents fundamental concepts and theory of dynamics and engineering mechanics. It dispenses with advanced theory in favor of applications and practical instruction. Unlike other introductory dynamics textbooks, this work covers an integrated range of dynamics areas, with extensive modeling through MATLAB® and Simulink® examples. A complete solutions manual is available with qualifying course adoptions, and computer code can be accessed from a companion website.
Sprache
Verlagsort
Verlagsgruppe
ISBN-13
978-1-4822-0044-7 (9781482200447)
Schweitzer Klassifikation
Autor*in
The University of Akron, Ohio, USA
Introduction
Scope of work
Dimensions and units
Nomenclature
Assumptions
Particles, rigid bodies and deformable bodies
Dimensions and degrees of freedom
Mass
Force
Moments
Free-body diagrams
Friction
Work
Conservative forces
Mechanical System Components
Stability
MATLAB® and Simulink®
Kinematics of Particles
Introduction
Kinematic quantities
One-dimensional motion
Multi-dimensional motion
Curvilinear motion
Relative motion
Systems of particles
Kinematics of Rigid Bodies
Introduction
Planar Motion of a Rigid Body
Vector form of relative velocity and relative acceleration equations
Coriolis Acceleration
Three-dimensional motion
Newtonian Mechanics Applied to Particles
Introduction
Newton's Laws of Motion
Application of Newton's Law to particles
Mathematical modeling of particle motion
System of particles
Mathematical modeling of motion of system of particles
Use of Simulink
Newtonian Mechanics Applied to Rigid Bodies
Force equation
Angular momentum
Planar motion of rigid bodies
D' Alembert's Principle
Mathematical modeling of rigid-body motion
Systems of multiple rigid bodies
Three-dimensional motion
Principle of Work and Energy
Forms of energy
Principle of work and energy
Power
Conservative systems
Mathematical modeling using the principle of work and energy
Principle of Impulse and Momentum
Impulse
Linear momentum
Angular momentum
Principle of impulse and momentum
Impact problems
Lagrangian Dynamics
Variations
Principle of virtual work
Lagrange's equations for conservative systems
Lagrange's equations for non-conservative systems
Mathematical modeling using Lagrange's equations
Kinematics of Machines
Introduction
Mechanisms
Cam and follower systems
Gear trains
Vibrations
Introduction
Free vibrations of single-degree-of-freedom systems
Forced vibrations of single-degree-of-freedom systems
Free vibrations of multi-degree-of-freedom systems
Forced vibrations of multi-degree-of-freedom systems
Dynamics of Deformable Bodies
Bars, shafts aod beams
Stress aod strain
Sing1e-degree-of-freedom modeling of deformable bodies
Multi-degree-of-freedom modeling of deformable bodies
Distributed parameter modeling of deformable bodies
Finite-element modeling of deformable bodies
Gyroscopic Motion
Introduction
Gyroscopic motion
Spinning top
Machine dynamics
Deformable bodies
An Introduction to Control Systems
Actuators
State space analysis
Block diagrams
Feedback control systems
Transfer functions
Relationships between transfer functions block diagrams and state space analysis
Controllers
Impulsive input
Harmonic input
Simulink® Modeling
Appendix A: Solution of Ordinary Differential Equations
Appendix B: Flexibility Influence Coefficients
Appendix C: MATLAB® and Simulink®
