Total mass and Location of the axis of rotation
<h2> Further Explanation
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Moment of inertia (SI unit: kg m2) is a measure of the inertia of an object to rotate about its axis. This quantity is an analog of rotation rather than mass. Moments of inertia play a role in rotational dynamics such as a mass in basic dynamics and determine the relationship between angular momentum and angular velocity, the moment of force and acceleration of angles, and several other quantities. Although the scalar discussion of the moment of inertia, the discussion using the tensor approach allows analysis of more complex systems such as gyroscopic motion.
Based on dimensional analysis alone, the moment of inertia of an object, not a point must take the form:
The magnitude of the moment of inertia (I) of a mass with a rotating point on a known axis is formulated as follows:
I = mR ^ 2
Where, m is the mass of a particle or object (kilograms), and R is the distance between the particle or element's mass of the object to the rotary axis (meters). For solid bodies with non-simple geometries, the magnitude of the moment of inertia is calculated as the mass distribution of the body times the distance of the rotating axis. Look at the picture below to find out more clearly the picture. The dimensions in International Standards (SI) are kg. m ^ 2.
For objects consisting of several particles, the moment of inertia is the sum of all the moments of inertia of each particle. Similarly, if an object has a complex shape or consists of various forms, then the amount of inertia moment is the number of inertia moments from each of its parts.
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Moment of inertia brainly.com/question/13806267
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Grade: College
Subject: Physics
keywords: Moment, inertia.