Starting from sest, a baskotbali rols from the top of a hil to the bottom, reaching...
Starting from rest, a basketball rolls from the top to the bottom of a hill, reaching a translational speed of 7.8 m/s. Ignore frictional losses. (a) What is the height of the hill (6) Released from rest at the same height, a can of frozen juice rolls to the bottom of the same hill. What is the translational speed of the frozen juice can when it reaches the bottom? (a) Number Units (b) Number Units Click if you would like...
Starting from rest, a basketball rolls from the top to the bottom of a hill, reaching a translational speed of 6.2 m/s. Ignore frictional losses. (a) What is the height of the hill? (b) Released from rest at the same height, a can of frozen juice rolls to the bottom of the same hill. What is the translational speed of the frozen juice can when it reaches the bottom?
Starting from rest, a basketball rolls from the top to the bottom of a hill, reaching a translational speed of 6.2 m/s. Ignore frictional losses. (a) What is the height of the hill? (b) Released from rest at the same height, a can of frozen juice rolls to the bottom of the same hill. What is the translational speed of the frozen juice can when it reaches the bottom?
Starting from rest, a basketball rolls from the top to the bottom of a hill, reaching a translational speed of 6.0 m/s. Ignore frictional losses. (a) What is the height of the hill? (b) Released from rest at the same height, a can of frozen juice rolls to the bottom of the same hill. What is the translational speed of the frozen juice can when it reaches the bottom?
Starting from rest, a basketball rolls from the top to the bottom of a hill, reaching a translational speed of 6.2 m/s. Ignore frictional losses. (a) What is the height of the hill? (b) Released from rest at the same height, a can of frozen juice rolls to the bottom of the same hill. What is the translational speed of the frozen juice can when it reaches the bottom? (a) Number 2.74 Units
B and D please 4. Starting from rest, a basketball rolls from the top to the bottom of a hill, reaching a translational speed of 6.30 m/s. Ignore frictional losses. 6.30 m/s a) Which moment of inertia formula best represents the basketball? (3 pts) b) What is the height of the hill? (6 pts) 1-23 MR² & 3 mugh the I ugarigh hour = 2mgnan Žmorte 1 (3 m²) (7) since I way ghzu2(5/6) Ź (m + 2 vaugh a...