studypersist
Mar7-08, 10:21 AM
1. The problem statement, all variables and given/known data
An overhead view of the path taken by a ball of mass m as it bounces from the rail of a pool table. The ball's initial speed is v and the angle is a. The bounce reverses the y component of the ball's velocity but does not alter the x component. ... (b) What is the change in the ball's linear momentum in unit - vector notation?
2. Relevant equations
Change in momentum (DP)
DP(J) = mvcos(a)(-j^) - mvcos(a))+j^)
DP(I) = mvsin(a)(-i^) - mvsin(a))+i^)
3. The attempt at a solution
I know that the initial and final angles are the same. I thought I needed to use a form like this to get the answer
DP(I) + DP (J)
Both of my answers are negative. I'm not sure if that's the problem or if I have my sin and cos for j and i mixed up.
An overhead view of the path taken by a ball of mass m as it bounces from the rail of a pool table. The ball's initial speed is v and the angle is a. The bounce reverses the y component of the ball's velocity but does not alter the x component. ... (b) What is the change in the ball's linear momentum in unit - vector notation?
2. Relevant equations
Change in momentum (DP)
DP(J) = mvcos(a)(-j^) - mvcos(a))+j^)
DP(I) = mvsin(a)(-i^) - mvsin(a))+i^)
3. The attempt at a solution
I know that the initial and final angles are the same. I thought I needed to use a form like this to get the answer
DP(I) + DP (J)
Both of my answers are negative. I'm not sure if that's the problem or if I have my sin and cos for j and i mixed up.