While observing the bounce heights of various kinds of sports balls dropped from different heights onto a variety of surfaces, we thought of the following question: Could measurements of drop and bounce heights of balls of different diameters, but of the same material, falling from different heights, but on the same surface, be expressed by a simple mathematical formula? Our objective was to provide a simple classroom ball-drop experiment that produced robust and interesting data sets from which students could address this question. With a suitable choice of variables, all the ball drop data could be collapsed to a single curve, so that given the mass and drop height of the ball, the bounce height could be reasonably estimated (±10% of measured values).

1.
CENCO Coefficient of Restitution Demonstrator (WL0556)
, http://www.cencophysics.com.
2.
A. D.
Berstein
, “
Listening to the coefficient of restitution
,”
Am. J. Phys.
45
(
1
),
41
44
(
Jan. 1977
).
3.
P. A.
Smith
,
C. D.
Spencer
, and
D. E.
Jones
, “
Microcomputer listens to the coefficient of restitution
,”
Am J. Phys.
49
(
2
),
136
140
(
Feb. 1981
).
4.
I.
Stensgaard
and
E.
Laegsgaard
, “
Listening to the coefficient of restitution—revisited
,”
Am. J. Phys.
69
(
3
),
301
305
(
March 2001
).
5.
F. A.
Morrison
, “
Data Correlation for Drag Coefficient for Sphere
,”
Department of Chemical Engineering
,
Michigan Technological University
,
Houghton, MI
. http://www.chem.mtu.edu/∼fmorriso/DataCorrelationForSphereDrag2010.pdf.
6.
PASCO Freefall Adapter (ME-9207B)
, http://www.pasco.com.
7.
G.
Barnes
, “
Study of collisions Part I. A survey of the periodical literature
,”
Am. J. Phys.
26
(
1
),
5
8
(
Jan. 1958
).
8.
R. L.
Jackson
,
I.
Green
, and
D. B.
Marghitu
, “
Predicting the coefficient of restitution of impacting elastic-perfectly plastic spheres
,”
Nonlinear Dyn.
60
(
3
),
217
229
(
May 2010
). http://link.springer.com/article/10.1007%2Fs11071-009-9591-z#page-1.
9.
D.
Tabor
,
The Hardness of Metals
(
Oxford University Press
,
Oxford, UK
,
2000
), p.
129
.
10.
W.
Goldsmith
,
Impact — The Theory and Physical Behavior of Colliding Solids
(
Dover Publications
,
Mineola, NY
,
2001
), pp.
7
, 262, 263, 91, 4, and 265.
11.
See Ref. 7.
12.
R. K.
Adair
,
The Physics of Baseball
(
Harper & Row
,
New York
,
1990
), p.
56
.
13.
P. J.
Brancazio
,
Sport Science — Physical Laws and Optimal Performance
(
Simon and Schuster
,
New York
,
1984
), p.
222
.
14.
N.
Farkas
and
R. D.
Ramsier
, “
Measurements of coefficient of restitution made easy
,”
Phys. Educ.
41
(
1
),
73
75
(
2006
).
15.
R. G.
Watts
and
A. T.
Bahill
,
Keep Your Eye On the Ball — The Science and Folklore of Baseball
(
W.H. Freeman and Company
,
New York
,
1990
), p.
90
.
16.
G.
Guercio
and
V.
Zanetti
, “
Determination of gravitational acceleration using a rubber ball
,”
Am. J. Phys.
55
(
1
),
59
63
(
Jan. 1987
).
17.
K. C.
Maynes
,
M. G.
Compton
, and
Blane
Baker
, “
Coefficient of restitution measurements for sports balls: An investigative approach
,”
Phys. Teach.
43
,
352
354
(
Sept. 2005
).
18.
K. L.
Johnson
,
Contact Mechanics
(
Cambridge University Press
,
Cambridge, UK
,
1985
), pp.
363
, 361.
19.
C. E.
Aguiar
and
F.
Laudares
, “
Listening to the coefficient of restitution and the gravitational acceleration of a bouncing ball
,”
Am. J. Phys.
71
(
5
),
499
510
(
May 2003
).
20.
K. D.
Supulver
,
F. G.
Bridges
, and
D. N.
Lin
, “
The coefficient of restitution of ice particles in glancing collisions: Experimental results for unfrosted surfaces
,”
ICARUS
113
,
188
199
(
1995
).
21.
W. J.
Stronge
,
Impact Mechanics
(
Cambridge University Press
,
Cambridge, UK
,
2004
), p.
128
.
22.
MythBusters: Fun with Newton's Cradle” and “MythBusters: Massive Newton's Cradle
,” http://www.mythbusters/newtonscradle.
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