EPHD203 Lecture 8 Fall 2024 Normal Distribution PDF

Summary

This document is a set of lecture notes on normal distribution and the central limit theorem. It discusses the properties of normal distributions, how to calculate Z-scores, and provides examples.

Full Transcript

EPHD203:
Lecture 8:
Normal
Distribution and
the standard
normal curve

C O UR S E INST RUCTOR S

D R. M O N I Q U E C H A AYA , D R. P H

J O S L E E N A L B A R AT H I E , P H D ( S )

Acknowledgment: Slides provided by Khalil El Asmar, PhD & Lilian Ghandour, PhD
Session Learning Objectives

Understand the properties of the normal distribution

Compute Z-scores

Understand the concept of the Central Limit Theorem
Normal Distribution
Model for continuous outcome

Mean=median=mode
 Normal distribution
The normal distribution is defined by its probability density function (or It makes life a
pdf), which is given as
lot easier for us
1  1 2
f ( x) = exp  − 2 ( x −  )  −  x   if
2  2  we standardize
for some parameters μ (mean of the normal distribution), σ (standard
our normal
deviation of the normal distribution) with σ > 0 curve, with a
mean of zero
The density function follows a bell-shaped curve. and a standard
The curve is symmetric about the mean μ. deviation of 1
A normal distribution with mean μ and variance σ2 is referred to as an unit.
N(μ, σ2 ) distribution
4
 Normal Distribution
Notation: m=mean and s=standard deviation

−3 −2 −  + +2 +3
 Normal Distribution
Properties of Normal Distribution
I) The normal distribution is symmetric about the mean
(i.e., P(X > ) = P(X < ) = 0.5).
ii) The mean and variance,  and 2, completely characterize the normal distribution.
iii) The mean = the median = the mode.
P( -  < X <  + ) = 0.68,
P( - 2 < X <  + 2) = 0.95,
P( - 3 < X <  + 3) = 0.99
iv) P(a < X < b) = the area under the normal curve from a to b.
Example 5.11.Normal Distribution
Body mass index (BMI) for men age 60 is normally distributed with a mean of 29 and standard
deviation of 6.

What is the probability that a male has BMI less than 29?
Example 5.11.Normal Distribution

P(X