Question
Weightlifter Mass (kg) Distance (m) Time (s)
A 100.0 2.25 0.151
B 150.0 1.76 0.052
C 200.0 1.50 0.217
D 250.0 1.25 0.206
Which weightlifter has the least power?
Answer (500)
Let Pa, Pb, Pc, and Pd be the powers delivered by weightlifters A, B, C, and D, respectively.
Use this equation to determine each power value:
P = W÷Δt
P is the power, W is the work done by the weightlifter, and Δt is the elapsed time.
A) Determining Pa:
Pa = W÷Δt
The weightlifter does work to lift the weight up a certain distance. Therefore the work done is equal to the weight's gain in gravitational potential energy. The equation for gravitational PE is
PE = mgh
PE is the potential energy, m is the mass of the weight, g is the acceleration of objects due to earth's gravity, and h is the distance the weight was lifted.
We can equate W = PE = mgh, therefore we can make the following substitution:
Pa = mgh÷Δt
Given values:
m = 100.0kg
g = 9.81m/s²
h = 2.25m
Δt = 0.151s
Plug in the values and solve for Pa
Pa = 100.0×9.81×2.25÷0.151
Pa = 14600W (watt is the SI derived unit of power)
B) Determining Pb:
Let us use our new equation derived in part A to solve for Pb:
Pb = mgh÷Δt
Given values:
m = 150.0kg
g = 9.81m/s²
h = 1.76m
Δt = 0.052s
Plug in the values and solve for Pb
Pb = 150.0×9.81×1.76÷0.052
Pb = 49800W
C) Determining Pc:
Pc = mgh÷Δt
Given values:
m = 200.0kg
g = 9.81m/s²
h = 1.50m
Δt = 0.217s
Plug in the values and solve for Pc
Pc = 200.0×9.81×1.50÷0.217
Pc = 13600W
D) Determining Pd:
Pd = mgh÷Δt
Given values:
m = 250.0kg
g = 9.81m/s²
h = 1.25m
Δt = 0.206s
Plug in the values and solve for Pd
Pd = 250.0×9.81×1.25÷0.206
Pd = 14900W
Compare the following power values:
Pa = 14600W, Pb = 49800W, Pc = 13600W, Pd = 14900W
Pc is the lowest value.
Therefore, weightlifter C delivers the least power.