QUESTION IMAGE
Question
the cosmodock 21 ferris wheel in yokohama city, japan, has a diameter of 100 m. its name comes from its 60 arms, each of which can function as a second hand (so that it makes one revolution every 60.0 s). part c what is his apparent weight at the highest point on the ferris wheel? express your answer in newtons.
To solve the problem of finding the apparent weight at the highest point of the Ferris wheel, we need to consider the following:
Step 1: Identify the given values
- Diameter of the Ferris wheel, \( d = 100 \, \text{m} \), so the radius \( r = \frac{d}{2} = 50 \, \text{m} \)
- Time for one revolution, \( T = 60.0 \, \text{s} \)
- Let's assume the mass of the person is \( m \) (we need to know the mass to calculate the weight. Since it's not provided, we'll assume a typical mass, say \( m = 70 \, \text{kg} \) for illustration purposes. If the mass is different, the answer will change accordingly.)
Step 2: Calculate the angular velocity \( \omega \)
The angular velocity \( \omega \) is given by:
\[
\omega = \frac{2\pi}{T}
\]
Substituting \( T = 60.0 \, \text{s} \):
\[
\omega = \frac{2\pi}{60.0} \approx 0.1047 \, \text{rad/s}
\]
Step 3: Calculate the centripetal acceleration \( a_c \)
The centripetal acceleration \( a_c \) is given by:
\[
a_c = \omega^2 r
\]
Substituting \( \omega \approx 0.1047 \, \text{rad/s} \) and \( r = 50 \, \text{m} \):
\[
a_c = (0.1047)^2 \times 50 \approx 0.548 \, \text{m/s}^2
\]
Step 4: Calculate the apparent weight at the highest point
At the highest point of the Ferris wheel, the apparent weight \( w_{\text{highest}} \) is given by:
\[
w_{\text{highest}} = m(g - a_c)
\]
where \( g = 9.8 \, \text{m/s}^2 \) is the acceleration due to gravity.
Substituting \( m = 70 \, \text{kg} \), \( g = 9.8 \, \text{m/s}^2 \), and \( a_c \approx 0.548 \, \text{m/s}^2 \):
\[
w_{\text{highest}} = 70 \times (9.8 - 0.548) = 70 \times 9.252 \approx 647.64 \, \text{N}
\]
Final Answer
If the mass of the person is \( 70 \, \text{kg} \), the apparent weight at the highest point is approximately \(\boxed{648}\) Newtons (rounded to a reasonable number of significant figures).
(Note: If the mass is different, substitute the correct mass into the formula \( w_{\text{highest}} = m(g - \frac{4\pi^2 r}{T^2}) \) to get the accurate result.)
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To solve the problem of finding the apparent weight at the highest point of the Ferris wheel, we need to consider the following:
Step 1: Identify the given values
- Diameter of the Ferris wheel, \( d = 100 \, \text{m} \), so the radius \( r = \frac{d}{2} = 50 \, \text{m} \)
- Time for one revolution, \( T = 60.0 \, \text{s} \)
- Let's assume the mass of the person is \( m \) (we need to know the mass to calculate the weight. Since it's not provided, we'll assume a typical mass, say \( m = 70 \, \text{kg} \) for illustration purposes. If the mass is different, the answer will change accordingly.)
Step 2: Calculate the angular velocity \( \omega \)
The angular velocity \( \omega \) is given by:
\[
\omega = \frac{2\pi}{T}
\]
Substituting \( T = 60.0 \, \text{s} \):
\[
\omega = \frac{2\pi}{60.0} \approx 0.1047 \, \text{rad/s}
\]
Step 3: Calculate the centripetal acceleration \( a_c \)
The centripetal acceleration \( a_c \) is given by:
\[
a_c = \omega^2 r
\]
Substituting \( \omega \approx 0.1047 \, \text{rad/s} \) and \( r = 50 \, \text{m} \):
\[
a_c = (0.1047)^2 \times 50 \approx 0.548 \, \text{m/s}^2
\]
Step 4: Calculate the apparent weight at the highest point
At the highest point of the Ferris wheel, the apparent weight \( w_{\text{highest}} \) is given by:
\[
w_{\text{highest}} = m(g - a_c)
\]
where \( g = 9.8 \, \text{m/s}^2 \) is the acceleration due to gravity.
Substituting \( m = 70 \, \text{kg} \), \( g = 9.8 \, \text{m/s}^2 \), and \( a_c \approx 0.548 \, \text{m/s}^2 \):
\[
w_{\text{highest}} = 70 \times (9.8 - 0.548) = 70 \times 9.252 \approx 647.64 \, \text{N}
\]
Final Answer
If the mass of the person is \( 70 \, \text{kg} \), the apparent weight at the highest point is approximately \(\boxed{648}\) Newtons (rounded to a reasonable number of significant figures).
(Note: If the mass is different, substitute the correct mass into the formula \( w_{\text{highest}} = m(g - \frac{4\pi^2 r}{T^2}) \) to get the accurate result.)