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A person jumps from a fourth story window 15 m above a safety net. THe jumper stretches the net 1.0 m before coming to rest. What was the deceleration experienced by the jumper?
Equation:
x = x0 + v0t +.5at^2
15 m = 1 m + 8.6 m/s(2s) + .5(a)(1.75s^2)
15m = 1 m + 17.2 m/s^2 + .875s^2(a)
-3.2 m = .875 s^2
-3.66 m/s^2 = Deceleration
Does this look right? I'm not sure about the 1 m as the final position...
Wait, I already see a problem, forgot to square the time...
Equation:
x = x0 + v0t +.5at^2
15 m = 1 m + 8.6 m/s(2s) + .5(a)(1.75s^2)
15m = 1 m + 17.2 m/s^2 + 1.53s^2(a)
-3.2 m = 1.53 s^2
2.09 m/s^2 = Deceleration
Does this look right? I'm not sure about the 1 m as the final position...That seems like an awfully slow deceleration for jumping out of a window.
Originally posted by Matt
A person jumps from a fourth story window 15 m above a safety net. THe jumper stretches the net 1.0 m before coming to rest. What was the deceleration experienced by the jumper?
Equation:
x = x0 + v0t +.5at^2
15 m = 1 m + 8.6 m/s(2s) + .5(a)(1.75s^2)
15m = 1 m + 17.2 m/s^2 + .875s^2(a)
-3.2 m = .875 s^2
-3.66 m/s^2 = Deceleration
Does this look right? I'm not sure about the 1 m as the final position...
You've got a few errors, and I'm not sure where you got all of your values.
Where did the 8.6m/s , the 2s, and the 1.75s^2 come from?
You're also making mistakes with the units.
'8.6 m/s * s' does not have units of 'm/s^2', it is 'm'
Your tipoff that you are making mistakes comes in the line where you have -3.2m = .875 s^2
those units don't equal each other, therefore you know you must have made a mistake somewhere.
To do this problem correctly, you need to break it into 2 parts.
First part is the freefall. You know starting and ending positions (15m and 0m above the net), you know starting velocity (0m/s), and you know acceleration (-9.8m/s^2). You use those numbers to solve for the velocity before the guy hits the net.
The second part is the deceleration. You have starting and ending positions (0m and -1m), you know starting velocity (from part I), and you know final velocity (0m/s... he is stopped at the bottom). You use those values to solve for acceleration.
Revised: (I always have trouble seeing problems in two distinct parts)
v^2 = v^20 + 2a(x-x0)
v^2 = 0 m/s + 2(9.80 m/s^s)(15m -0m)
v^2 = 294 m^2/s^s
Squareroot(v^2) = Squareroot(294 m^2/s^2)
v = 17.14 m/s
v^2 = v^20 + 2a(x-x0)
0 m^2/s^2 = 17.14 m/s + 2a(-1 - 0)
0 m^2/s^2 = 294 m^2/s^s -2a
-294 m^2/s^2 = -2a
a = 147 m/s^2
Thats more than 14 gs!!! Can that be right? Wouldnt the person be dead?
15 g's.
The net is slowing him down to zero velocity in 1/15th the distance.
Not a very good net - He would probably be hurt, but not neccessarily killed.
15 g's is enough to cause damage, but it won't last for a very long period of time. Aircraft ejector seats pull over 100 g's for a split second.
Is the result reasonable? If you don't have a clear mental picture of meters, convert to feet. This guy is falling from a fourth (probably closer to 5th) story window, and stopping in 3 feet. That's a pretty stiff net.
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