Standard Normal Distribution Function
Standard Normal Distribution Function is added below:
F(Z) = -∞∫Z / √(2π)
where,
- Z = [(x-μ)/σ]
- mean = μ=0
- Standard Deviation = σ=1
Note: “Standard Normal Distribution Table” is used to easily calculate F(Z).
Standard Normal Distribution
Standard normal distribution, also known as the z-distribution, is a special type of normal distribution. In this distribution, the mean (average) is 0 and the standard deviation (a measure of spread) is 1. This creates a bell-shaped curve that is symmetrical around the mean.
In this article we have covered, Standard Normal Distribution definitions, examples, and others in detail
Before starting with Standard Normal Distribution let’s first learn what is meant by Normal Distribution.
Table of Content
- Normal Distribution Definition
- What is Standard Normal Distribution?
- Standard Normal Distribution Table
- Area of Standard Normal Distribution
- Standard Normal Distribution Function
- Application of Standard Normal Distribution
- Characteristics of Standard Normal Distribution
- Standard Normal Distribution Examples
- FAQs on Standard Normal Distribution