Question
A diver had descended 64 feet underwater after 4 minutes. After 6 minutes, the diver had descended 96 feet under water.
What is the constant of proportionality that relates the number descended y to the number of minutes x
A. 3/2
B. 1/16
C. 24
D. 16
What is the constant of proportionality that relates the number descended y to the number of minutes x
A. 3/2
B. 1/16
C. 24
D. 16
Answers
GPT-4o mini
To determine the constant of proportionality, we can set up the relationship of depth (\(y\)) to time (\(x\)) based on the information given.
From the problem:
- At \(x = 4\) minutes, \(y = 64\) feet.
- At \(x = 6\) minutes, \(y = 96\) feet.
First, let's find the rate of descent per minute between these two points:
1. Calculate the change in depth:
\[
\text{Change in } y = 96 - 64 = 32 \text{ feet}
\]
2. Calculate the change in time:
\[
\text{Change in } x = 6 - 4 = 2 \text{ minutes}
\]
3. Now, find the rate of descent (constant of proportionality):
\[
\text{Rate} = \frac{\text{Change in } y}{\text{Change in } x} = \frac{32 \text{ feet}}{2 \text{ minutes}} = 16 \text{ feet per minute}
\]
Thus, the constant of proportionality that relates the depth descended (\(y\)) to the time in minutes (\(x\)) is \(16\).
So, the answer is **D. 16**.
From the problem:
- At \(x = 4\) minutes, \(y = 64\) feet.
- At \(x = 6\) minutes, \(y = 96\) feet.
First, let's find the rate of descent per minute between these two points:
1. Calculate the change in depth:
\[
\text{Change in } y = 96 - 64 = 32 \text{ feet}
\]
2. Calculate the change in time:
\[
\text{Change in } x = 6 - 4 = 2 \text{ minutes}
\]
3. Now, find the rate of descent (constant of proportionality):
\[
\text{Rate} = \frac{\text{Change in } y}{\text{Change in } x} = \frac{32 \text{ feet}}{2 \text{ minutes}} = 16 \text{ feet per minute}
\]
Thus, the constant of proportionality that relates the depth descended (\(y\)) to the time in minutes (\(x\)) is \(16\).
So, the answer is **D. 16**.