7.5.1.4 Distributions

    Cards (60)

    • What does a distribution in statistics refer to?
      Spread of a data set
    • In a normal distribution, the mean, median, and mode are equal.
    • A positively skewed distribution has a tail to the right
    • What is a bimodal distribution characterized by?
      Two distinct peaks
    • Order the steps to represent distributions using histograms and frequency tables.
      1️⃣ Collect data
      2️⃣ Create a frequency table
      3️⃣ Draw a histogram
    • What is the formula for calculating the mean in statistics?
      Mean=\text{Mean} =i=1nxin \frac{\sum_{i = 1}^{n} x_{i}}{n}
    • The mode is the most frequently occurring value
    • What type of distribution is symmetrical and bell-shaped with the mean, median, and mode equal?
      Normal distribution
    • Match the distribution type with its mean, median, and mode relationship:
      Normal ↔️ Mean = Median = Mode
      Positively Skewed ↔️ Mean > Median > Mode
      Negatively Skewed ↔️ Mean < Median < Mode
    • A bimodal distribution has two distinct peaks.
    • What are the two parameters that characterize a normal distribution?
      Mean and standard deviation
    • In a uniform distribution, all values are equally likely
    • Which two methods are used to represent distributions?
      Histograms and frequency tables
    • The mean is the average of all values in a data set.
    • The median is the middle value when data is sorted.
    • What is the formula for the standard deviation in a normal distribution?
      σ=\sigma =i=1n(xiμ)2n1 \sqrt{\frac{\sum_{i = 1}^{n} (x_{i} - \mu)^{2}}{n - 1}}
    • Match the distribution type with its shape:
      Normal ↔️ Bell-shaped
      Skewed ↔️ Asymmetrical with tail
      Bimodal ↔️ Two distinct peaks
    • What is the shape of a positively skewed distribution?
      Asymmetrical with a tail
    • In a uniform distribution, the mean, median, and mode are approximately equal.
    • A bimodal distribution has two distinct peaks
    • How is the mean calculated in a distribution?
      \frac{\sum_{i = 1}^{n} x_{i}}{n}</latex>
    • The median is the middle value when data is sorted.
    • The mode is the most frequently occurring value
    • For what type of distribution is the mean most useful as a measure of central tendency?
      Normal distributions
    • The median is more useful than the mean for skewed distributions.
    • The mode is particularly useful for bimodal or categorical data
    • Match the measure of central tendency with its definition:
      Mean ↔️ Average of all values
      Median ↔️ Middle value when sorted
      Mode ↔️ Most frequent value
    • What does the range measure in a distribution?
      The spread of data
    • The standard deviation is the square root of the variance.
    • The range is sensitive to outliers
    • Why is the variance difficult to interpret directly?
      Units are squared
    • The standard deviation measures typical deviation from the mean.
    • What is the standard deviation formula based on the variance?
      Variance\sqrt{\text{Variance}}
    • The range is the difference between the maximum and minimum values
    • The range is highly sensitive to outliers.
    • What does the variance measure?
      Total spread of data
    • The units of variance are easy to interpret directly.
      False
    • The standard deviation is the square root of the variance
    • The standard deviation is affected by outliers.
    • What does a distribution in statistics describe?
      Spread or pattern of data