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What is the relationship between centripetal acceleration and angular velocity in circular motion?
In circular motion, centripetal acceleration is directly proportional to angular velocity. This means that as the angular velocity increases, the centripetal acceleration also increases.
What is the relationship between centripetal force and velocity in circular motion?
In circular motion, centripetal force is the force that keeps an object moving in a circle. The centripetal force is directly proportional to the velocity of the object in circular motion. This means that as the velocity of the object increases, the centripetal force required to keep it moving in a circle also increases.
What is the relationship between the velocity of an whirling object and the centripetal force that is exerted on it?
The velocity of a whirling object is directly proportional to the centripetal force exerted on it. As the object moves faster, the centripetal force required to keep it in circular motion increases. The equation for centripetal force is Fc = (mv^2)/r, where m is mass, v is velocity, and r is the radius of circular motion.
What is the relationship between radial force and angular velocity squared?
The relationship between radial force and angular velocity squared is described by the centripetal force equation, which states that the radial force required to keep an object moving in a circular path is equal to the mass of the object times the square of its angular velocity, multiplied by the radius of the circular path. This relationship shows that an increase in angular velocity will result in a corresponding increase in the radial force needed to maintain the object's circular motion.
What is the relationship between radius and velocity in circular motion?
In circular motion, the velocity of an object is directly proportional to its radius. This means that the larger the radius, the greater the velocity needed to maintain the circular path. This relationship is described by the equation v = ωr, where v is the velocity, ω is the angular velocity, and r is the radius.
What is the relationship between centripetal acceleration and angular velocity in circular motion?
In circular motion, centripetal acceleration is directly proportional to angular velocity. This means that as the angular velocity increases, the centripetal acceleration also increases.
What is the relationship between centripetal force and velocity in circular motion?
In circular motion, centripetal force is the force that keeps an object moving in a circle. The centripetal force is directly proportional to the velocity of the object in circular motion. This means that as the velocity of the object increases, the centripetal force required to keep it moving in a circle also increases.
What is the relationship between the velocity of an whirling object and the centripetal force that is exerted on it?
The velocity of a whirling object is directly proportional to the centripetal force exerted on it. As the object moves faster, the centripetal force required to keep it in circular motion increases. The equation for centripetal force is Fc = (mv^2)/r, where m is mass, v is velocity, and r is the radius of circular motion.
What is the relationship between centripetal force and velocity?
Centripetal force is = mass * velocity square divided by radius
What is the relationship between radial force and angular velocity squared?
The relationship between radial force and angular velocity squared is described by the centripetal force equation, which states that the radial force required to keep an object moving in a circular path is equal to the mass of the object times the square of its angular velocity, multiplied by the radius of the circular path. This relationship shows that an increase in angular velocity will result in a corresponding increase in the radial force needed to maintain the object's circular motion.
What is the relationship between radius and velocity in circular motion?
In circular motion, the velocity of an object is directly proportional to its radius. This means that the larger the radius, the greater the velocity needed to maintain the circular path. This relationship is described by the equation v = ωr, where v is the velocity, ω is the angular velocity, and r is the radius.
What is the relationship between centripetal acceleration and angular acceleration?
Centripetal acceleration and angular acceleration are related because centripetal acceleration is the linear acceleration experienced by an object moving in a circular path, while angular acceleration is the rate at which the angular velocity of the object changes. The two are connected through the equation a r, where a is the centripetal acceleration, r is the radius of the circular path, and is the angular acceleration.
What is the relationship between tangential acceleration and centripetal acceleration in circular motion?
In circular motion, tangential acceleration and centripetal acceleration are related but act in different directions. Tangential acceleration is the rate of change of an object's tangential velocity, while centripetal acceleration is the acceleration towards the center of the circle. Together, they determine the overall acceleration of an object moving in a circle.
In centripetal force what is the relationship between v and f if r is kept constant?
Centripetal force has the following formula: Fcentripetal = m times V2/r What that says is that for a constant r in an example, the Fcentripetal is proportional to V2. The centripetal force is proportional to the square of the velocity of the object.
What is the relationship between centripetal force and circular motion?
Centripetal force is the force that keeps an object moving in a circular path. It acts towards the center of the circle and is necessary to maintain the object's circular motion. Without centripetal force, the object would move in a straight line instead of a curve.
What is the relationship between velocity, omega, and radius in circular motion?
In circular motion, velocity is directly proportional to the radius and angular velocity (omega). This means that as the radius or angular velocity increases, the velocity of the object in circular motion also increases.
What is the relationship between the normal force and the centripetal force acting on an object in circular motion?
In circular motion, the normal force is the force exerted by a surface on an object to prevent it from falling through. The centripetal force is the force that keeps an object moving in a circular path. The normal force and the centripetal force are related because the normal force provides the centripetal force needed to keep the object in circular motion.
