Distribution Shapes PDF

Summary

This document covers different types of distributions, including normal, skewed, and uniform distributions. It explains the characteristics and properties of each type, and how to measure skewness and kurtosis. It's a helpful resource for understanding data distributions in statistics.

Full Transcript

DISTRIBUTION SHAPES
 Shape of the Distribution

The shape of the distribution provides information about
the central tendency and variability of measurements.

Three common shapes of distributions are:
Normal: bell-shaped curve; symmetrical
Skewed: non-normal; non-symmetrical; can be
positively or negatively skewed
Multimodal: has more than one peak (mode)
 A. SYMMETRICAL DISTRIBUTIONS

A distribution is symmetrical if the frequencies at the right and left tails of
the distribution are (more or less) identical, so that if it is divided into two
halves, each will be the mirror image of the other.

Some special cases of symmetrical distributions are uniform distributions,
where all values (or groups of values) occur with (approximately) equal
frequency and bell-shaped distributions
In a symmetrical distribution the mean, median, and mode are identical
(more or less equal).
 SYMMETRICAL DISTRIBUTIONS

UNIFORM BELL - SHAPED
200
180
160
140
120
100 100 100 100 100
80
60
40
20
0
NORMAL OR BELL – SHAPED DISTRIBUTION

25

20

P
e 15
r
c
e
n 10
t

5

0
80 90 100 110 120 130 140 150 160
POUNDS
 PROPERTIES OF THE NORMAL DISTRIBUTION

1. The mean, median, and mode are equal.
2. The normal curve is bell-shaped and is symmetric about
the mean.
3. The total area under the normal curve is equal to 1.
4. The normal curve approaches, but never touches, the x-
axis as it extends farther and farther away from the
mean.
 B. SKEWED DISTRIBUTIONS

A skewed distribution is asymmetrical.

The distribution has one “tail” stretching out much further
than the other side of the distribution, indicating one or a
few values that are noticeably larger/smaller than the
majority.

A distribution can be skewed either left or right, indicating
the tail’s direction.
1. SKEWED TO THE RIGHT OR
POSITIVELY SKEWED DISTRIBUTION
 CHARACTERISTICS OF SKEWED TO THE RIGHT OR
POSITIVELY SKEWED

Scores are concentrated at the low end of the
distribution
Mean > median > mode
Longer tail to the right or positive side
The majority of the scores fall below the mean
There are more low scores than high
2. SKEWED TO THE LEFT OR
NEGATIVELY SKEWED DISTRIBUTION
 CHARACTERISTICS OF SKEWED TO THE LEFT OR
NEGATIVELY SKEWED
Scores are concentrated at the high end of the
distribution
Mean < median < mode
longer tail to the left or negative side
The majority of the scores fall above or higher than
the mean
More high scores than low
Mean Mean Mean
Mode Mode
Median
Mode
Median Median

Negatively Symmetric Positively
Skewed (Not Skewed) Skewed
MEASURING SKEWNESS:

Skewness is the measure of Pearson’s Coefficient of
the shape of a Skewness Formula:
nonsymmetrical distribution
Sk = mean - mode
Symmetric: skewness = 0
standard deviation
Positive or right skewed:
skewness > 0 Sk = 3(mean – median)
standard deviation
Negative or left skewed:
skewness < 0
PEAKEDNESS OF DISTRIBUTION (KURTOSIS)
Leptokurtic: high and thin
Mesokurtic: normal in shape
Platykurtic: flat and spread out
MEASURING KURTOSIS:

 K > 3: Leptokurtic Let x1 , x2 ,...xn be n observations. Then,
 K = 3: Mesokurtic n

 K < 3: Platykurtic n ( xi  x ) 4

Kurtosis  i 1
2
3
 n 2
  ( xi  x ) 
 i 1 