A tennis ball is a hollow sphere with a thin wall. It is set rolling without sli
ID: 2017547 • Letter: A
Question
A tennis ball is a hollow sphere with a thin wall. It is set rolling without slipping at 3.98 m/s on a horizontal section of a track as shown in the figure below. It rolls around the inside of a vertical circular loop of radius r = 46.5 cm. As the ball nears the bottom of the loop, the shape of the track deviates from a perfect circle so that the ball leaves the track at a point h = 19.0 cmbelow the horizontal section.
Explanation / Answer
speed of the ball at the bottom of the loop v= 3.98 m/sradius r = 46.5 cm = 0.465 m h = 19.0 cm = 0.19 m (a). from law of conservation of energy , K.E at bottom = P.E at top + K.E at top ( 1/ 2) mv^ 2*[1+(2/3)] = mg*2r + ( 1/ 2) mv'^ 2 * [1+( 2/ 3)] ( 5/ 6) v^ 2 = 2gr + ( 5/6) v'^ 2 v^ 2 = ( 6/5) 2gr + v'^ 2 v'^ 2= v^ 2-( 12/5)gr = 6.7264 v ' = 2.593 m / s (b).if the speed at the top is greater than [gr ] then it continue in circular path value of [gr ]= 2.134 m / s v ' > [gr] (c). required speed v " =? from law of conservation of energy , ( 1/ 2) mv^ 2*[1+( 2/ 3) ] = ( 1/ 2) mv"^ 2*[1+( 2/ 3)] -mgh ( 5/ 3) v^ 2= ( 5/ 3) v"^ 2- 2gh v^ 2= v"^ 2 -( 3/5) *2gh v"^ 2= v^ 2+(6/5)gh = v^2 + 2.2344 = 18.07 v" = 4.25 m / s (d). lower
Related Questions
Hire Me For All Your Tutoring Needs
Integrity-first tutoring: clear explanations, guidance, and feedback.
Drop an Email at
drjack9650@gmail.com
drjack9650@gmail.com
Navigate
Integrity-first tutoring: explanations and feedback only — we do not complete graded work. Learn more.