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Comparing Distributions | Mathematics for GCSE/IGCSE - Year 11 PDF Download

What does comparing distributions mean?

  • Many questions present data divided into two related categories.
  • For example, data on daily screen time for children and adults:
  • The data pertains to screen time but is divided into two distributions:
    • One for children.
    • One for adults.
  • To compare these distributions, you should examine two aspects:
    • The average of the distributions.
    • The spread (variation) of the distributions.

How do I compare the averages of two data sets (distributions)?

  • Choose the Appropriate Average (Mode, Median, or Mean):
    • The mean considers all data points.
    • The median is not influenced by extreme values.
    • The mode is suitable for non-numerical data.
  • Consider whether it is better for the average to be bigger or smaller:
    • If you are comparing time to complete a puzzle - the smaller the average the better.
    • If you are comparing test scores - the bigger the average the better.
  • Give numerical values for the average and explicitly compare:
    • For example, The mean for dogs is 17 kg which is bigger than the mean for cats which is 13 kg.
  • Give your comparison in context:
    • For instance, The mean for dogs is bigger which suggests that, on average, dogs are heavier than cats.

How do I compare the spread (variation) of two data sets (distributions)?

  • Select the appropriate measure of range (range or interquartile range):
    • The range is influenced by extreme values.
    • The interquartile range (IQR) focuses on the middle 50% of the data.
  • Consider whether a larger or smaller range is preferable:
    • A smaller range indicates consistency.
    • A larger range indicates more spread.
  • Provide numerical values for the range and make explicit comparisons:
    • For example, "The IQR for dogs is 6 kg, which is larger than the IQR for cats at 4 kg."
  • Contextualize your comparison:
    • For example, "The smaller IQR for cats suggests their weights are more consistent and less spread out compared to dogs."
  • When comparing raw data sets, check for outliers in either distribution:
    • If one or both data sets contain values significantly larger or smaller than the rest, mention this and consider possible reasons.

Question for Comparing Distributions
Try yourself:
How can you compare the averages of two data sets?
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The document Comparing Distributions | Mathematics for GCSE/IGCSE - Year 11 is a part of the Year 11 Course Mathematics for GCSE/IGCSE.
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FAQs on Comparing Distributions - Mathematics for GCSE/IGCSE - Year 11

1. What is the purpose of comparing distributions in statistics?
Ans. Comparing distributions in statistics helps to understand the similarities and differences between two or more sets of data, providing insights into their characteristics and relationships.
2. How can data be visually compared using histograms when comparing distributions?
Ans. Data can be visually compared using histograms by plotting the frequency distributions of the datasets on the same graph, allowing for easy comparison of the shapes, central tendencies, and spreads of the data.
3. What statistical measures are commonly used to compare distributions?
Ans. Common statistical measures used to compare distributions include mean, median, mode, standard deviation, range, and interquartile range, which provide information about the central tendency and spread of the data.
4. When comparing distributions, how can the skewness of the data impact the analysis?
Ans. The skewness of the data, which measures the asymmetry of the distribution, can impact the analysis by influencing the mean and median values, as well as the overall shape of the distribution.
5. How can the presence of outliers affect the comparison of distributions?
Ans. The presence of outliers in a dataset can skew the results of the comparison of distributions, as they can heavily influence measures like the mean and standard deviation, leading to inaccurate conclusions about the similarities or differences between the datasets.
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