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2. Given the situation as shown in the figure. The hollow sphere is rolling down an...
2. Given the situation as shown in the figure. The hollow sphere is rolling down an...
2. Given the situation as shown in the figure. The hollow sphere is rolling down an inclined plane! Mass of the sphere is M, radius is R and vertical height is H. V is the linear velocity of the center of mass, ICM is the moment of inertia and ω is the angular velocity. Write the conservation of energy for above system; make sure you use the symbols given (use initial as the top and final as before it hits...
2. Given the situation as shown in the figure. The hollow sphere is rolling down an...
2. Given the situation as shown in the figure. The hollow sphere is rolling down an inclined plane! Mass of the sphere is M, radius is R and vertical height is H. V is the linear velocity of the center of mass, IcM is the moment of inertia and w is the angular velocity. Write the conservation of energy for above system; make sure you use the symbols given (use initial as the top and final as before it hits...
2. Given the situation as shown in the figure. The hollow sphere is rolling down an...
2. Given the situation as shown in the figure. The hollow sphere is rolling down an inclined plane! Mass of the sphere is M, radius is R and vertical height is H. V is the linear velocity of mass, IcM is the moment of inertia and w is the angular velocity. the center of Write the conservation of energy for above system; make sure you use the symbols given (use initial as the top and final as before it hits...
Question2 Answer the followings, carry 25 points L. State whether following properties are a vector or...
Question2 Answer the followings, carry 25 points L. State whether following properties are a vector or a scalari? Kinetic energy: Potential energy: Work done: Torque: Pressure: Displacement: Velocity: Momentum: Impulse: Force: Distance Speed: Angular momentum: Angular acceleration: 2. Given the situation as shown in the figure. The hollow sphere is rolling down an inclined plane! Mass of the sphere is M, radius is R and vertical height is H. V is the linear velocity of the center of mass, loe...
Group Activity: Ball rolling down ramp and off cliff As shown in the figure below, a hollow ball ...
Group Activity: Ball rolling down ramp and off cliff As shown in the figure below, a hollow ball with a mass m 5.00 kg and radius r -30.0cm starts from rest and rolls a distance of 1.2 m down a 30° ramp, before reaching a flat section at the bottom of the ramp. The ball then rolls along the flat section for 1.0 m before rolling off a 2.5 m-high cliff. The ball lands a distance d from the bottom...
A hollow sphere of 2.307 kg mass is rolling down an incline without slipping. It starts...
A hollow sphere of 2.307 kg mass is rolling down an incline without slipping. It starts from rest at a vertical height of 50 cm above the bottom. The sphere has a radius of 10 cm. What is the translational speed of the sphere, in m/s, at the bottom? The moment of inertia of a hollow sphere is 2/3mr^2. A. 0.85 B. 1 C. 2.2 D. 2.4 E. 2.6
3. A ball, a solid sphere of radius r and mass m, is positioned at the top of a ramp that makes an angle of 0 with the horizontal. The initial position of the sphere is at a distance of d from its fi...
3. A ball, a solid sphere of radius r and mass m, is positioned at the top of a ramp that makes an angle of 0 with the horizontal. The initial position of the sphere is at a distance of d from its final position at the bottom of the incline. a) Find the velocity of the ball at the bottom of the ramp in terms of m, r, d, 8, and g. The moment of inertia of a sphere...
Figure 6 solution see book, solved problem 12.3, also HW problem, also solved during lecture and...
Figure 6 solution see book, solved problem 12.3, also HW problem, also solved during lecture and recitation, also see attachement 14. A thin hollow spherical shell of mass M, and radius R , rolls down without slipping (condition for rolling without slipping :v, = WR) from the top of the incline of length L The incline makes an angle with horizontal ground. What will be the velocity of the centre of mass (C.M) of the sphere when it reaches at...
Problem 2 (10 pt.) A homogeneous sphere of mass m and radius b is rolling on...
Problem 2 (10 pt.) A homogeneous sphere of mass m and radius b is rolling on an inclined plane with inclination angle ? in the gravitational field g. Follow the steps below to find the velocity V of the center of mass of the sphere as a function of time if the sphere is initially at rest. Bold font represents vectors. There exists a reaction force R at the point of contact between the sphere and the plane. The equations...
A solid sphere of mass M and radius R starts from rest at the top of...
A solid sphere of mass M and radius R starts from rest at the top of an inclined ramp, and rolls to the bottom. The upper end of the ramp is h meters higher than the lower end. (Note: The moment of inertia for a solid sphere rotating about an axis through its center is (2/5)MR2) Draw an energy bar chart & corresponding equation for this situation Symbolically, what is the linear speed of the sphere at the bottom of the ramp...
2. Given the situation as shown in the figure. The hollow sphere is rolling down an inclined plane! Mass of the sphere is M, radius is R and vertical height is H. V is the linear velocity of the center of mass, ICM is the moment of inertia and ω is the angular velocity. Write the conservation of energy for above system; make sure you use the symbols given (use initial as the top and final as before it hits...
2. Given the situation as shown in the figure. The hollow sphere is rolling down an inclined plane! Mass of the sphere is M, radius is R and vertical height is H. V is the linear velocity of the center of mass, IcM is the moment of inertia and w is the angular velocity. Write the conservation of energy for above system; make sure you use the symbols given (use initial as the top and final as before it hits...
2. Given the situation as shown in the figure. The hollow sphere is rolling down an inclined plane! Mass of the sphere is M, radius is R and vertical height is H. V is the linear velocity of mass, IcM is the moment of inertia and w is the angular velocity. the center of Write the conservation of energy for above system; make sure you use the symbols given (use initial as the top and final as before it hits...
Question2 Answer the followings, carry 25 points L. State whether following properties are a vector or a scalari? Kinetic energy: Potential energy: Work done: Torque: Pressure: Displacement: Velocity: Momentum: Impulse: Force: Distance Speed: Angular momentum: Angular acceleration: 2. Given the situation as shown in the figure. The hollow sphere is rolling down an inclined plane! Mass of the sphere is M, radius is R and vertical height is H. V is the linear velocity of the center of mass, loe...
Group Activity: Ball rolling down ramp and off cliff As shown in the figure below, a hollow ball with a mass m 5.00 kg and radius r -30.0cm starts from rest and rolls a distance of 1.2 m down a 30° ramp, before reaching a flat section at the bottom of the ramp. The ball then rolls along the flat section for 1.0 m before rolling off a 2.5 m-high cliff. The ball lands a distance d from the bottom...
3. A ball, a solid sphere of radius r and mass m, is positioned at the top of a ramp that makes an angle of 0 with the horizontal. The initial position of the sphere is at a distance of d from its final position at the bottom of the incline. a) Find the velocity of the ball at the bottom of the ramp in terms of m, r, d, 8, and g. The moment of inertia of a sphere...
Figure 6 solution see book, solved problem 12.3, also HW problem, also solved during lecture and recitation, also see attachement 14. A thin hollow spherical shell of mass M, and radius R , rolls down without slipping (condition for rolling without slipping :v, = WR) from the top of the incline of length L The incline makes an angle with horizontal ground. What will be the velocity of the centre of mass (C.M) of the sphere when it reaches at...
Problem 2 (10 pt.) A homogeneous sphere of mass m and radius b is rolling on an inclined plane with inclination angle ? in the gravitational field g. Follow the steps below to find the velocity V of the center of mass of the sphere as a function of time if the sphere is initially at rest. Bold font represents vectors. There exists a reaction force R at the point of contact between the sphere and the plane. The equations...
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