The road, pushing against the tyres.
Centripetal acceleration = V2/R = (4)2/(0.5) = 32 meters/sec2The centripetal acceleration doesn't depend on the stone's mass.(The centripetal force does.)The centripetal acceleration doesn't "act on" the stone.(The centripetal force does.)The centripetal force acting on the stone is F = M A = (0.25) (32) = 8 newtons.
32meters
80 meters. Since the only force on the car is centripetal force then:Fc = macac = v2/rFc = (mv2)/rSolve for rr = (mv2)/Fcr = (1200)(20)2/(6000)r = 80m(See my work in the link below.)
=(mv*v)/r =(2000*25*25)\80 =15625N
Force is given by Newton's second law: F = ma where F is the force, m is the mass and a is the acceleration. F=2000kg x (25 m/s)2 / 80 meters 15,625n
When you're driving in a car and turn a corner, centripetal force from the door of the car helps you move along the circular path of the corner.
Acceleration in circular motion is the acceleration directed towards the center of the circle, known as centripetal acceleration. It is responsible for keeping an object moving in a circular path rather than in a straight line. The magnitude of centripetal acceleration is given by the formula a = v^2 / r, where v is the velocity of the object and r is the radius of the circle.
1. Whirling of a stone tied to a string: The string provides necessary centripetal force for the rotation of stone.2. Turning of vehicles in a circular track: The friction due to the tyres in case of levelled road and the angle of inclination of tracks in case of banked tracks provides the necessary centripetal force.
centripetal force
Centripetal Force
Centripetal force is a force that keeps an object inwards, in the case of circular motion or similar.
Basically, the centripetal force CAUSES the circular motion in the first place. In other words, without a centripetal force, the moving object would just go straight ahead.
That is called a centripetal force. Such a force is required for the constant change in direction related to the circular movement (Newton's Second Law).
Answer It is the force which keeps a body moving in circular motion. Centripetal force is the force that acts opposite to cetrifugal force. Centripetal force is a real force. Centrifugal force is a pseudo-force
centripetal- Dashun Walden
In any circular movement, including driving in a curve, the centripetal force (and the corresponding centrifugal force, which is often considered a "fictitious force") will increase: * When the speed increases * When the radius of curvature decreases
Centripetal Force