Thank you for visiting The median of the values in a data set is tex h tex If 625 were subtracted from each of the values in the data. This page is designed to guide you through key points and clear explanations related to the topic at hand. We aim to make your learning experience smooth, insightful, and informative. Dive in and discover the answers you're looking for!
Answer :
Let's solve the problem step by step:
1. Understanding the Median: The median is the middle value of a data set when the numbers are arranged in order. If there's an odd number of values, the median is the exact middle number. If there's an even number, the median is the average of the two middle numbers.
2. Effect of Adding/Subtracting a Constant: When you add or subtract the same number from every value in a data set, the median changes by that same number. This is because the relative order of the values does not change; each number is simply shifted up or down by the same amount.
3. Given Problem: We know the median of the original data set is [tex]\( h \)[/tex].
4. Subtracting 625 from Each Value: If 625 is subtracted from every number in the data set, each of those numbers decreases by 625. Hence, the new list of values will be each original value minus 625.
5. Finding the New Median: Since the change (subtracting 625) is applied uniformly across all values, the new median is simply [tex]\( h - 625 \)[/tex].
Therefore, the median of the resulting data set, after subtracting 625 from each number, is [tex]\( h - 625 \)[/tex]. So, the correct answer is:
B. [tex]\( h - 625 \)[/tex]
1. Understanding the Median: The median is the middle value of a data set when the numbers are arranged in order. If there's an odd number of values, the median is the exact middle number. If there's an even number, the median is the average of the two middle numbers.
2. Effect of Adding/Subtracting a Constant: When you add or subtract the same number from every value in a data set, the median changes by that same number. This is because the relative order of the values does not change; each number is simply shifted up or down by the same amount.
3. Given Problem: We know the median of the original data set is [tex]\( h \)[/tex].
4. Subtracting 625 from Each Value: If 625 is subtracted from every number in the data set, each of those numbers decreases by 625. Hence, the new list of values will be each original value minus 625.
5. Finding the New Median: Since the change (subtracting 625) is applied uniformly across all values, the new median is simply [tex]\( h - 625 \)[/tex].
Therefore, the median of the resulting data set, after subtracting 625 from each number, is [tex]\( h - 625 \)[/tex]. So, the correct answer is:
B. [tex]\( h - 625 \)[/tex]
Thank you for reading the article The median of the values in a data set is tex h tex If 625 were subtracted from each of the values in the data. We hope the information provided is useful and helps you understand this topic better. Feel free to explore more helpful content on our website!
- You are operating a recreational vessel less than 39 4 feet long on federally controlled waters Which of the following is a legal sound device
- Which step should a food worker complete to prevent cross contact when preparing and serving an allergen free meal A Clean and sanitize all surfaces
- For one month Siera calculated her hometown s average high temperature in degrees Fahrenheit She wants to convert that temperature from degrees Fahrenheit to degrees
Rewritten by : Jeany
