A solid disk (I = 0.5MR2) rotates with constant angular acceleration around its center, from an angular position θ1 = 10.0 rad to an angular position θ2 = 70.0 rad in 6.0 s. If the angular velocity in θ2 is 15.0 rad / s, determine:to. The angular velocity in θ1:Select one:to. 5.0 rad / sb. 10 rad / sc. 0 rad / sd. 15.0 rad / sb. Angular acceleration (rad / s2):Select one:to. 2.50b. 1.67c. 0.83d. 0c. The angular position of the disk when the movement started:Select one:to. 25.0 radb. 0 radc. 65.5 radd. 2.6 radd. If the diameter of the disk is 1.0 m and it has a mass of 1.5 g, the moment of inertia that a particle of negligible mass will experience at the center of rotation:Select one:to. 0 kg m2b. 0.19 kg m2c. 0.00019 kg m2d. 0.0015 kg m2and. If the diameter of the disk is 1.0 m and it has a mass of 1.5 g, the moment of inertia that a particle of negligible mass will experience at the outer edge of the disk:Select one:to. 0.19 kg m2b. 0.0015 kg m2c. 0.00019 kg m2d. 0 kg m2