Difference between revisions of "Manuals/calci/UNIFORM"
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*In <math>UNIFORMDISTRIBUTED(x,ll,ul)</math> ,<math> x </math> is the numeric value to find the probability of the distribution, <math>ll </math> is the lower limit value and <math> ul </math> is the upper limit value. | *In <math>UNIFORMDISTRIBUTED(x,ll,ul)</math> ,<math> x </math> is the numeric value to find the probability of the distribution, <math>ll </math> is the lower limit value and <math> ul </math> is the upper limit value. | ||
*The Probability Density Function of the uniform distribution for the interval(a,b) is given by: | *The Probability Density Function of the uniform distribution for the interval(a,b) is given by: | ||
− | + | P(x)=<math>\begin{cases} 0, &for &x<a \\ | |
1/b-a, &for &a<x<b \\ | 1/b-a, &for &a<x<b \\ | ||
0, &for &x>b | 0, &for &x>b |
Revision as of 00:23, 11 February 2014
UNIFORMDISTRIBUTED(x,ll,ul)
- is the value of the function.
- is the lower limit.
- is the upper limit of the function.
Description
- This function gives the probability of the uniform distribution.
- Uniform distribution is a symmetric probability distribution.
- It is also called rectangular distribution.
- In , is the numeric value to find the probability of the distribution, is the lower limit value and is the upper limit value.
- The Probability Density Function of the uniform distribution for the interval(a,b) is given by:
P(x)=
equation
- The Lucas numbers are defined by:
Examples
- UNIFORMDISTRIBUTED(4,2,3) = 4030484680552036 2.6280935418326408 2.2810050058178604 2.97846262995153679
- UNIFORMDISTRIBUTED(5,3,6) = 5.522187389200553 3.566177821950987 5.04674904467538 5.301322509767488 4.9094569575972855