Optimizing Bowling Ball Speed: Comparing 15 lbs and 16 lbs Balls

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The discussion centers on the comparison of bowling ball speeds between a 15 lb and a 16 lb ball, focusing on the kinetic energy and momentum involved. It is established that the 15 lb ball must be bowled at approximately 1.03 times the speed of the 16 lb ball to achieve the same kinetic energy. The calculations reveal that while both momentum and energy are conserved, the energy manifests in different forms, such as sound. The ability to effectively use a heavier ball also depends on the bowler's strength and backswing height. Overall, understanding the relationship between mass, speed, and energy is crucial for optimizing bowling performance.
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I think this is a fairly basic question, but I have been out of physics since high school. Let's assume that I have two identical bowling balls, except that one is 15 lbs and the other is 16 lbs. If we avoid discussion about ball rotation and friction on the lane, how much additional speed does the 15 lbs ball need to match the energy (?) of the 16 pounder.

Possibly more at the heart of my confusion, is whether or not I'm dealing with Force which equals mass times acceleration if I remember right OR transmission of energy. Force seemed right to me to begin with, until I realized that the ball itself doesn't have positive acceleration at the time. So it seems that it may be how much energy the ball has to impart?

Do you guys think I'm on the right track there? Do you have any clarification on the two?

Thanks Folks! I sure do love bowling
 
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First cut at an answer, KE = \frac{1}{2}m v^2

The ball has a lot of rotational energy also, but the initial impact on the pins will mostly involve the straight-line KE being transferred to the pins, I would think.
 
Thanks Berkeman. So kinetic energy is the key. I'll have to try and do some calculations and see how that turns out.
 
I did some for you...using berkeman's formula,^ see above ^

KE=1/2(6.804kg)(8.9408m/s)^2
KE=271.944

6.804kg=15lbs 8.9408m/s=20mph

Now using that same KE found from throwing a 15lb bowling ball that reaches a velocity of 20mph, we will see at what velocity the 16 pounder will reach the same KE

271.944=1/2(7.257kg)(V)^2
135.972=7.257kg(V)^2
V^2=18.735
V=4.33m/s

7.257kg=16lbs

Okay, if this is the correct formula to use there appears to be a huge difference between the kinetic energy levels of each ball. The 16lb ball has the same energy that the 15lb ball has at HALF the speed!
Is this right? Looks fishy to me haha
 
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It would actually be 8.657m/s as you have divided by two initially instead of multiplying the kinetic energy by two. Just a simple algebraic error there. If you take the ratio of the two speed they really are negligible. ratio ofthe speed of the 15ib to 16lb is ~1.03 so really there's not too much difference. In laymans terms you need to bowl the 15 pounder 0.03 times faster than the 16 pounder to achieve the same translational kinetic energy. Hope this helps.
 
I see it as a simple problem of momentum.

Momentum = mass * velocity

In other words, the 15lb ball will have to go 16/15 (sixteen fifteenths) the speed of the 16lb ball.
 
KingNothing said:
I see it as a simple problem of momentum.

Momentum = mass * velocity

In other words, the 15lb ball will have to go 16/15 (sixteen fifteenths) the speed of the 16lb ball.
Yes, the momentum is the key. Both momentum and energy will conserved, but some of the energy will have a different form other than kinetic energy - for example, some of the energy will create sound.

The difference in momentum will determine which ball has more effect on the movement of the pins.

Of course, the momentum the ball has when released depends primarily on how high the backswing is. If a person can't bring a 16 pound ball up as high on the backswing as they can a 14 pound ball or 12 pound ball, the loss of velocity on the release will more than negate the extra mass (actually, I think having enough wrist strength to hold the ball at the proper angle through the whole swing is usually more of an issue than being able to bring the ball back far enough on the backswing).
 
Hahaha I always make those simple algebraic mistakes..like missing one + or - sign on a calculus test question! I knew the answer looked funky..I read over my work again and realized what I had done, at that time I was unable to find this thread again to fix the error, until now.
 
Great discussion guys. Thanks all!
 
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