T distribution and T-test.pdf

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T distribution and T-test
Introduction
In health sciences, researchers often need to compare groups or assess
the significance of observed differences.

This is where statistical tools like the t-test come into play.

The t-test is a fundamental tool for hypothesis testing when the sample
size is small or when the population standard deviation is unknown.

To understand the t-test fully, it's crucial to grasp the concept of the
tdistribution.
Definition of T Distribution
The t-distribution, also known as Student's t-distribution, is a
probability distribution that is symmetric and bell-shaped, much like
the normal distribution.

However, unlike the normal distribution, the t-distribution has heavier
tails, making it suitable for smaller sample sizes.
t-distribution approaches vs. standard normal distribution

There are different types of t-distributions, each characterised by its
degrees of freedom (df).

The degrees of freedom in a t-distribution depend on the sample size
and play a crucial role in determining the shape of the distribution.

As the sample size increases, the t-distribution approaches the shape
of the standard normal distribution.
Assumptions of T-Test
1. Normality: The data within each group should be approximately
normally distributed.

2. Independence: Observations within each group must be
independent of each other.

3. Homogeneity of variance: The variance within each group should be
approximately equal.
Types of t-test
1.one-Sample T-Test

2.independent-Samples T-Test

3.Paired-Samples T-Test (Dependent-Samples T-Test)
One-sample T-Test
Definition: The one-sample t-test compares the mean of a single sample to a
known or hypothesised population mean to determine if there is a statistically
significant difference between them.

Use: It is used when researchers have a single sample and want to determine if
the sample mean is significantly different from a known or hypothesised
population mean.

Example: Investigating whether the mean body mass index (BMI) of a sample of
individuals differs significantly from the population mean BMI.
Independent-Samples T-Test
Definition: The independent-samples t-test compares the means of two
independent groups to determine if there is a statistically significant
difference between them.

Example: Comparing the mean blood pressure levels between patients
receiving a new drug and those receiving a placebo.
Paired-Samples T-Test (Dependent-Samples T-Test)
Definition: The paired-samples t-test compares the means of two related
groups to determine if there is a statistically significant difference between
them. Each observation in one group is paired or matched with a
corresponding observation in the other group.

Use: It is used when comparing the means of the same group at two
different time points or under two different conditions, such as before and
after an intervention or treatment.

Example: Assessing the difference in cholesterol levels before and after a
dietary intervention within the same group of participants.
What if I have more than two groups
or more than two time points?