Solving Engineering Problems in Dynamics

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Informationen zum Autor Michael B. Spektor  taught for many years at Oregon Institute of Technology, and before retiring he was the director of the manufacturing engineering technology bachelor degree program at Boeing in Seattle. He has an undergraduate degree in mechanical engineering from Kiev Polytechnic University and a Ph. D. in mechanical engineering from Kiev Construction University. He has worked in both industry and higher education in the United States, Israel, and the former Soviet Union. Spektor holds five U.S. Patents and two U.S.S.R. Inventor’s Certificates. Some of his career highlights include: chief designer of an automobile crane; the design and development of vibratory and impact machines; an analysis of the dynamics of construction safety harnesses that directly led to their improvement; developer of the theory and engineering calculations for the optimization of soil-working vibratory processes for minimum energy consumption; analytical investigations of media deformation under dynamic loading that improved the methodologies for measuring and interpreting experimental data; and the publication of numerous scientific articles on dynamics. Klappentext This new guide takes an analytical approach by using step-by-step universal methodologies to solve problems of motion in Mechanical and Industrial engineering. This is a very useful guide for students in Mechanical and Industrial Engineering, as well practitioners who need to analyze and solve a variety of problems in dynamics. It emphasizes the importance of linear differential equations of motion, using LaPlace Transform, in the process of investigating actual problems. It includes numerous examples for composing differential equations of motion. Zusammenfassung Takes an analytical approach by using step-by-step universal methodologies to solve problems of motion in mechanical and industrial engineering. This is a very useful guide for students in mechanical and industrial engineering, as well practitioners who need to analyse and solve a variety of problems in dynamics. Inhaltsverzeichnis Introduction Differential Equations Of Motion Analysis Of ForcesAnalysis of Resisting ForcesForces of InertiaDamping ForcesStiffness ForcesConstant Resisting ForcesFriction ForcesAnalysis of Active ForcesConstant Active ForcesSinusoidal Active ForcesActive Forces Depending on TimeActive Forces Depending on VelocityActive Forces Depending on Displacement Solving Differential Equations of Motion Using Laplace Transforms Laplace Transform Pairs For Differential Equations of MotionDecomposition of Proper Rational FractionsExamples of Decomposition of FractionsExamples of Solving Differential Equations of MotionMotion by by Inertia with no ResistanceMotion by Inertia with Resistance of FrictionMotion by Inertia with Damping ResistanceFree VibrationsMotion Caused by ImpactMotion of a Damped System Subjected to a Tim Depending ForceForced Motion with Damping and StiffnessForced Vibrations Analysis of Typical Mechanical Engineering Systems Lifting a LoadAccelerationBrakingWater Vessel DynamicsDynamics of an AutomobileAccelerationBrakingAcceleration of a Projectile in the BarrelReciprocation Cycle of a Spring-loaded Sliding LinkForward Stroke Due to a Constant ForceForward Stroke Due to Initial VelocityBackward StrokePneumatically Operated Soil Penetrating Machine Piece-Wise Linear Approximation Penetrating into an Elasto-Plastic MediumFirst IntervalSecond IntervalThird IntervalFourth IntervalNon-linear Damping ResistanceFirst IntervalSecond Interval Dynamics of Two-Degree-of-Freedom Systems Differential Equations of Motion: A Two-Degree-of-Freedom SystemA System with a Hydraulic Link (Dashpot)A System with an Elastic Link (Spring)A System with a Combination of a Hydraulic Link (Dashpot) and an Elastic Link (Spring)Solutions of Differential Equations of Motion for Two-Degree-of-Freedom SystemsSolutions fo...