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Title: EJSS Circular Motion to Simple Harmonic Motion ModelPost by: lookang on February 15, 2015, 01:13:33 pm
EJSS Circular Motion to Simple Harmonic Motion Model
[lookangframe name=SHM03] Example 3: Uniform Circular motion’s one dimensional projection Simple harmonic motion can in some cases be considered to be the one-dimensional projection of uniform circular motion. If an object moves with angular speed ω around a circle of radius A centered at the origin of the x−y plane, then its motion along each coordinate is simple harmonic motion with amplitude A and angular frequency ω. https://dl.dropboxusercontent.com/u/44365627/lookangEJSworkspace/export/ejss_model_SHMcircle/SHMcircle_Simulation.html Q1: given that, a circular motion can be described by x = A cos(ω t) and y A sin(ω t) what is the y-component model-equation that can describe the motion of a uniform circular motion? A1: y = Asin (ωt) Q2: When the x-component of the circular motion is modelled by x = A cos(ω t) and y A sin(ω t) suggest an model-equation for y. A2: y = Acos (ωt) for top position or y = - Acos (ωt) for bottom position Q3: explain why are the models for both x and y projection of a uniform circular motion, a simple harmonic motion? A3: both x = A cos(ω t) and y A sin(ω t) each follow the defining relationship for SHM as ordinary differential equations of d 2 x d t 2 = - ω 2 x and d 2 y d t 2 = - ω 2 y respectively. Run Model: https://dl.dropboxusercontent.com/u/44365627/lookangEJSworkspace/export/ejss_model_SHMcircle/SHMcircle_Simulation.html |