Math  /  Calculus

Question*6. A bungee jumper of mass 54.5 kg (including safety gear) is standing on a platform 85.0 m above a river. The length of the unstretched bungee cord is 10.1 m . The force constant of the cord is 58.5 N/m58.5 \mathrm{~N} / \mathrm{m}. The jumper falls from rest. The cord acts like an ideal spring. Use conservation of energy to determine the jumper's height above the river when he is travelling at 9.47 m/s9.47 \mathrm{~m} / \mathrm{s} [down] on the first fall (when the string is actually stretched). Assume air resistance is negligible. Number 6 is tough, you'll need to use the quadratic formula

Studdy Solution

STEP 1

What is this asking? How high up is a bungee jumper when they're falling at a certain speed, given their weight, the height of the platform, and how stretchy the bungee cord is? Watch out! Don't forget that the bungee cord only starts stretching *after* the initial freefall!

STEP 2

1. Set up the energy equation
2. Solve for height

STEP 3

At the **start**, the jumper has only potential energy because they're not moving yet.
We can write this as PEi=mghiPE_i = m \cdot g \cdot h_i, where mm is the **mass** (54.5 kg54.5 \text{ kg}), gg is the **acceleration due to gravity** (9.8 m/s29.8 \text{ m/s}^2), and hih_i is the **initial height** (85.0 m85.0 \text{ m}).

STEP 4

So, PEi=54.5 kg9.8 m/s285.0 m=45351.5 JPE_i = 54.5 \text{ kg} \cdot 9.8 \text{ m/s}^2 \cdot 85.0 \text{ m} = 45351.5 \text{ J}.
That's a whole lotta potential energy just waiting to be unleashed!

STEP 5

When the jumper is falling at 9.47 m/s9.47 \text{ m/s}, they have both potential *and* kinetic energy.
The potential energy is PEf=mghfPE_f = m \cdot g \cdot h_f, where hfh_f is the **height** we're trying to find.
The kinetic energy is KEf=12mv2KE_f = \frac{1}{2} \cdot m \cdot v^2, where vv is the **velocity** (9.47 m/s9.47 \text{ m/s}).

STEP 6

Plugging in the numbers, KEf=1254.5 kg(9.47 m/s)2=2440.08 JKE_f = \frac{1}{2} \cdot 54.5 \text{ kg} \cdot (9.47 \text{ m/s})^2 = 2440.08 \text{ J}.
They're really zooming!

STEP 7

Don't forget the bungee cord!
When stretched, it stores elastic potential energy.
This energy is given by EPE=12kx2EPE = \frac{1}{2} \cdot k \cdot x^2, where kk is the **spring constant** (58.5 N/m58.5 \text{ N/m}) and xx is how much the cord is stretched.
Since the cord only stretches after the first 10.1 m10.1 \text{ m}, the stretch is x=85.0 mhf10.1 m=74.9 mhfx = 85.0 \text{ m} - h_f - 10.1 \text{ m} = 74.9 \text{ m} - h_f.

STEP 8

Because energy is conserved, the total energy at the beginning equals the total energy at the end.
So, PEi=PEf+KEf+EPEPE_i = PE_f + KE_f + EPE.
Let's plug everything in: 45351.5 J=54.5 kg9.8 m/s2hf+2440.08 J+1258.5 N/m(74.9 mhf)245351.5 \text{ J} = 54.5 \text{ kg} \cdot 9.8 \text{ m/s}^2 \cdot h_f + 2440.08 \text{ J} + \frac{1}{2} \cdot 58.5 \text{ N/m} \cdot (74.9 \text{ m} - h_f)^2.

STEP 9

Time to do some algebra!
Simplifying the equation, we get 42911.42=534.1hf+29.25(5610.01149.8hf+hf2)42911.42 = 534.1 h_f + 29.25 (5610.01 - 149.8 h_f + h_f^2), which further simplifies to 29.25hf24915.15hf+122488.8=029.25 h_f^2 - 4915.15 h_f + 122488.8 = 0.

STEP 10

This is a quadratic equation in terms of hfh_f.
We can solve it using the quadratic formula: hf=b±b24ac2ah_f = \frac{-b \pm \sqrt{b^2 - 4ac}}{2a}.
Here, a=29.25a = 29.25, b=4915.15b = -4915.15, and c=122488.8c = 122488.8.

STEP 11

Plugging the values into the quadratic formula, we get two possible solutions: hf=4915.15±(4915.15)2429.25122488.8229.25h_f = \frac{4915.15 \pm \sqrt{(-4915.15)^2 - 4 \cdot 29.25 \cdot 122488.8}}{2 \cdot 29.25}.
This simplifies to hf66.5 mh_f \approx 66.5 \text{ m} and hf62.6 mh_f \approx 62.6 \text{ m}.

STEP 12

Since the jumper is falling *down*, the height must be less than the initial height of 74.9 m74.9 \text{ m} after the cord starts stretching.
Therefore, the correct answer is hf62.6 mh_f \approx 62.6 \text{ m} above the river.

STEP 13

The jumper is approximately **62.6 meters** above the river when falling at 9.47 m/s9.47 \text{ m/s}.

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