Here are the essential concepts you must grasp in order to answer the question correctly.
Center of Mass
The center of mass is a point that represents the average position of the mass distribution of an object or system. For a rigid body, it can be calculated by taking the weighted average of the positions of all the masses involved. In this problem, the center of mass of the bar is crucial for determining the balance point between the two spheres, allowing us to set up an equation based on their distances and masses.
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Equilibrium Condition
In physics, an object is in equilibrium when the sum of the forces and the sum of the torques acting on it are zero. For this problem, the rigid bar will be in rotational equilibrium, meaning that the moments (torques) created by the weights of the two spheres about the center of mass must balance each other. This condition allows us to derive a relationship between the masses of the two spheres.
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Categorizing Linear Equations
Torque
Torque is a measure of the rotational force applied to an object, calculated as the product of the force and the distance from the pivot point (in this case, the center of mass). In this scenario, the torques generated by the weights of the large and small spheres about the center of mass must be equal for the system to be in equilibrium. Understanding how to calculate and set these torques equal is essential for solving for the unknown mass.