FormulaDen.com
Physics
Chemistry
Math
Chemical Engineering
Civil
Electrical
Electronics
Electronics and Instrumentation
Materials Science
Mechanical
Production Engineering
Financial
Health
You are here
-
Home
»
Math
»
Statistics
»
Measures of Dispersion
Standard Deviation of Sum of Random Variables in Measures of Dispersion Formulas
Standard Deviation of Sum of Random Variables is the measure of variability of the sum of two or more independent random variables. And is denoted by σ
(X+Y)
.
Formulas to find Standard Deviation of Sum of Random Variables in Measures of Dispersion
f
x
Standard Deviation of Sum of Independent Random Variables
Go
List of variables in Measures of Dispersion formulas
f
x
Standard Deviation of Random Variable X
Go
f
x
Standard Deviation of Random Variable Y
Go
FAQ
What is the Standard Deviation of Sum of Random Variables?
Standard Deviation of Sum of Random Variables is the measure of variability of the sum of two or more independent random variables.
Can the Standard Deviation of Sum of Random Variables be negative?
{YesorNo}, the Standard Deviation of Sum of Random Variables, measured in {OutputVariableMeasurementName} {CanorCannot} be negative.
Let Others Know
✖
Facebook
Twitter
Reddit
LinkedIn
Email
WhatsApp
Copied!