![]() To understand the material in this course you should have taken Mechanics: Kinematics and Dynamics, Mechanics: Momentum and Energy, and Mechanics: Rotational Dynamics. Mechanics: Simple Harmonic Motion and Non-Inertial Reference Frames.The complete series of modules is based on the MIT subject 8.01: Physics I, required of all MIT undergraduates. You will then study applications, such dynamics in the Earth’s atmosphere. where is the angular frequency and can be determined either by knowing the period ( 2/T) or the frequency ( 2f). From its definition, the acceleration, a, of an object in simple harmonic motion is proportional to its displacement, x: a w 2 x. In particular, you will learn about the centrifugal and Coriolis fictitious forces. The period of a simple harmonic oscillator is also independent of its amplitude. Next, you will learn how to modify Newton’s second law for both linear and rotational non-inertial reference frames. Following that lesson, you learn to solve the SHM differential equation and to use the Taylor Formula for small oscillations. ![]() You will first explore simple harmonic motion through springs and pendulums. This is the fourth of a series of modules that cover calculus-based mechanics.
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