QUESTION IMAGE
Question
a sample of 100 clients of an exercise facility was selected. let x = the number of days per week that a randomly selected client uses the exercise facility.
| x | frequency |
|---|---|
| 1 | 13 |
| 2 | 30 |
| 3 | 29 |
| 4 | 10 |
| 5 | 7 |
| 6 | 8 |
find the 80th percentile.
Step1: Calculate cumulative frequency
First, we calculate the cumulative frequency. The cumulative frequency for each \( X \) is the sum of frequencies up to that \( X \).
- For \( X = 0 \): Cumulative Frequency (\( CF \)) = \( 3 \)
- For \( X = 1 \): \( CF = 3 + 13 = 16 \)
- For \( X = 2 \): \( CF = 16 + 30 = 46 \)
- For \( X = 3 \): \( CF = 46 + 29 = 75 \)
- For \( X = 4 \): \( CF = 75 + 10 = 85 \)
- For \( X = 5 \): \( CF = 85 + 7 = 92 \)
- For \( X = 6 \): \( CF = 92 + 8 = 100 \)
Step2: Find the position of the 80th percentile
The formula for the position of the \( p \)-th percentile is \( i=\frac{p}{100}\times n \), where \( n \) is the total number of observations. Here, \( p = 80 \) and \( n = 100 \). So, \( i=\frac{80}{100}\times100 = 80 \).
Step3: Identify the class with cumulative frequency ≥ 80
We look for the smallest \( X \) such that the cumulative frequency is at least 80.
- For \( X = 3 \), \( CF = 75 < 80 \)
- For \( X = 4 \), \( CF = 85 \geq 80 \)
So the 80th percentile is the smallest \( X \) where the cumulative frequency is at least 80, which is \( X = 4 \). Wait, but let's check again. Wait, the cumulative frequency at \( X = 3 \) is 75, at \( X = 4 \) is 85. The position \( i = 80 \) falls within the class where \( X = 4 \) (since 75 < 80 ≤ 85). But wait, actually, in percentile calculation for discrete data, sometimes we use the formula: the \( p \)-th percentile is the smallest value \( x \) such that \( \text{Cumulative Frequency}(x)\geq\frac{p}{100}\times n \). Here, \( \frac{80}{100}\times100 = 80 \). The cumulative frequency at \( X = 3 \) is 75, at \( X = 4 \) is 85. So the smallest \( x \) with \( CF(x)\geq80 \) is \( x = 4 \)? Wait, no, wait. Wait, let's recalculate the cumulative frequencies again:
Wait, the frequencies are:
\( X = 0 \): 3, \( CF = 3 \)
\( X = 1 \): 13, \( CF = 3 + 13 = 16 \)
\( X = 2 \): 30, \( CF = 16 + 30 = 46 \)
\( X = 3 \): 29, \( CF = 46 + 29 = 75 \)
\( X = 4 \): 10, \( CF = 75 + 10 = 85 \)
\( X = 5 \): 7, \( CF = 85 + 7 = 92 \)
\( X = 6 \): 8, \( CF = 92 + 8 = 100 \)
So \( i = 80 \). We need to find the value of \( X \) such that the cumulative frequency is at least 80. The cumulative frequency at \( X = 3 \) is 75, which is less than 80. The cumulative frequency at \( X = 4 \) is 85, which is greater than 80. So the 80th percentile is the smallest \( X \) where \( CF(X)\geq80 \), which is \( X = 4 \)? Wait, but wait, maybe I made a mistake. Wait, another way: the 80th percentile is the value where 80% of the data is less than or equal to it. So we need to find the smallest \( x \) such that at least 80% of the data is ≤ \( x \). So 80% of 100 is 80. So we need the smallest \( x \) where the number of data points ≤ \( x \) is at least 80. The number of data points ≤ 3 is 75, ≤ 4 is 85. So 85 ≥ 80, so the smallest \( x \) with ≤ \( x \) having at least 80 data points is 4? Wait, but let's check the cumulative frequency again. Wait, maybe I messed up the cumulative frequency. Wait, \( X = 0 \): 3, \( X = 1 \): 13 (total 16), \( X = 2 \): 30 (total 46), \( X = 3 \): 29 (total 75), \( X = 4 \): 10 (total 85), \( X = 5 \): 7 (total 92), \( X = 6 \): 8 (total 100). So when \( X = 4 \), the cumulative frequency is 85, which means 85% of the data is ≤ 4. So the 80th percentile is the smallest \( x \) where the cumulative frequency is at least 80. Since 75 (at \( X = 3 \)) is less than 80, and 85 (at \( X = 4 \)) is at least 80, so the 80th percentile is 4? Wait, but wait, maybe the correct answer is 4? Wait, no, wait, let's check with another approach. The formula…
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