Two objects, a solid disk and a solid sphere, both with the same mass and radius, are released from rest at the top of an identical incline. Which statement best explains why one reaches the bottom first?
A rod of length L and mass M is pivoted at one end and released from rest at an angle \( \theta \) above the horizontal. What is the angular acceleration immediately after release?
A solid sphere (mass m, radius R) rolls without slipping down an incline of height h. What is its speed at the bottom?
A disk (I = 0.5MR2) is at rest. A constant torque \( \tau \) is applied for time t. What is the final angular speed?
A uniform rod (length L, mass M) is pivoted at its center. Two equal and opposite forces F are applied at the ends, perpendicular to the rod. What is the angular acceleration?
A solid cylinder (mass m, radius R) is spinning at angular speed \( \omega_0 \). A constant frictional torque \( \tau_f \) acts for time t, bringing it to rest. What is the total angle (in radians) through which the cylinder turns before stopping?
A uniform rod (length L, mass M) is pivoted at one end and released from rest horizontally. What is the linear speed of the free end as it passes through the vertical?
A disk (I = 0.8 kg·m2) is spinning at 10 rad/s. A constant torque of 2 N·m is applied in the opposite direction. How long does it take to stop?
A particle of mass m moves in a circle of radius R under a central force \( F = -kr \). What is the angular frequency of small oscillations about the equilibrium radius?
A flywheel (I = 1.5 kg·m2) is rotating at 20 rad/s. How much work is required to bring it to rest?
A disk (I) is spinning at \( \omega_0 \). A constant torque \( \tau \) is applied in the opposite direction for time t, bringing it to rest. What is the total angle (in radians) through which the disk turns before stopping?
A uniform rod (length L, mass m) is pivoted at its center. Two equal and opposite forces F are applied at the ends, perpendicular to the rod. What is the angular acceleration?
A solid sphere (I = 2/5 mR^2) is rolling without slipping. If its center of mass has speed v, what is its total kinetic energy?
A particle of mass m moves in a circle of radius R under a central force F = -kr. What is the angular frequency of small oscillations about the equilibrium radius?
A disk (I) is spinning at \( \omega_0 \). A constant frictional torque \( \tau_f \) acts for time t, bringing it to rest. What is the work done by friction?
A uniform disk (I = ½MR²) of mass 4 kg and radius 0.5 m is spun up from rest by a constant torque of 3.2 N·m. How long does it take to reach 16 rad/s?
A solid cylinder (mass 3 kg, radius 0.2 m) is spinning at 8 rad/s. A time-dependent torque \( \tau(t) = 2t \) N·m is applied for 3 seconds. What is the cylinder's angular velocity at t = 3 s? (Assume I = 0.5MR2.)
A solid sphere and a solid cylinder (same mass and radius) roll down a ramp. Which reaches the bottom first?
A rod of length L and mass M is pivoted about one end. A force F is applied perpendicular to the free end. Derive the angular acceleration in terms of F, M, and L.
A particle of mass m moves in a circle of radius R under a central force F = -kr. If the radius is slowly increased, what happens to the angular momentum and kinetic energy? (Assume no external torque.)
A wheel (I = 2 kg·m2) is initially at rest. A torque \( \tau(t) = 4e^{-t} \) N·m is applied for 3 seconds. What is the angular velocity at t = 3 s? (Use calculus to solve.)
A flywheel (I = 0.4 kg·m²) is spinning at 12 rad/s. A constant torque of -0.8 N·m is applied. How many radians does it rotate before stopping?
A solid sphere (I = 2/5 mR²) and a hollow sphere (I = 2/3 mR²) of equal mass and radius roll down the same incline. Which arrives first and why?
A disk (I = ½MR²) is rotating at \( \omega_0 \). A constant power P is applied to increase its speed. What is the time required to double its angular speed?
A uniform rod (length L, mass m) is pivoted at one end and released from rest horizontally. What is the linear speed of the free end as it passes through the vertical?
A disk (I = ½MR²) is rotating at \( \omega_0 \). A constant torque \( \tau \) is applied. How much work is done by the torque to triple the angular speed?
A particle of mass m moves in a circle of radius R with a speed v. If a constant tangential force F is applied, what is the angular acceleration?
A uniform disk and a ring (same mass and radius) are released from rest at the top of an incline. Which reaches the bottom first?
A disk (I = ½MR²) is spinning at \( \omega_0 \). A constant torque \( \tau \) is applied in the opposite direction. How long does it take to bring the disk to rest?
A system of particles is subject to no external torque. If the moment of inertia decreases by a factor of 4, what happens to the angular speed?