I didn't understand this (sorry):
I am trying to set a random number on either side of 1: .98, 1.02, .94, 1.1, etc.
So, I'll provide a general solution for the problem instead.
Converting a random number generator
If you have a random number generator in a give range [0, 1)* with uniform distribution you can convert it to any distribution using the following method:
1 - Describe the distribution as a function defined in the output range and with total area of 1. So this function is f(x) = the probability of getting the value x.
2 - Integrate** the function.
3 - Equate it to the "randomic"*.
4 - Solve the equation for x. So ti gives you the value of x in function of the randomic.
*: Generalization for any input distribution is below.
**: The constant term of the integrated function is 0 (that is, you just discard it).
**: That is a variable the represents the result of generating a random number with uniform distribution in the range [0, 1). [I'm not sure if that's the correct name in English]
Example:
Let's say you want a value with the distribution f(x)=x^2 from 0 to 100
. Well that function is not normalized because the total area below the function in the range is 1000000/3 not 1. So you normalize it scaling the curve in the vertical axis (keeping the relative proportions), that is dividing by the total area: f(x)=3*x^2 / 1000000 from 0 to 100
.
Now, we have a function with the a total area of 1. The next step is to integrate it (you may have already have done that to get the area) and equte it to the randomic.
The integrated function is: F(x)=x^3/1000000+c
. And equate it to the randomic: r=x^3/1000000
(remember that we discard the constant term).
Now, we need to solve the equation for x, the resulting expression: x=100*r^(1/3)
. Now you can use this formula to generate numbers with the desired distribution.
Generalization
If you have a random number generator with a custom distribution and want another different arbitrary distribution, you first need the source distribution function and then use it to express the target arbirary random number generator. To get the distribution function do the steps up to 3. For the target do all the steps, and then replace the randomic with the expression you got from the source distribution.
This is better understood with an example...
Example:
You have a random number generator with uniform distribution in the range [0, 100) and you want.. the same distribution f(x)=3*x^2 / 1000000 from 0 to 100
for simplicity [Since for that one we already did all the steps giving us x=100*r^(1/3)
].
Since the source distribution is uniform the function is constant: f(z)=1
. But we need to normalize for the range, leaving us with: f(z)=1/100
.
Now, we integrate it: F(z)=z/100
. And equate it to the randomic: r=z/100
, but this time we don't solve it for x, instead we use it to replace r in the target:
x=100*r^(1/3) where r = z/100
=>
x=100*(z/100)^(1/3)
=>
x=z^(1/3)
And now you can use x=z^(1/3)
to calculate random numbers with the distribution f(x)=3*x^2 / 1000000 from 0 to 100
starting with a random number in the distribution f(z)=1/100 from 0 to 100
[uniform].
Note: If you have normal distribution, use the bell function instead. The same method works for any other distribution. Take care of possible asymptote some distributions make create, you may need to try different ways to solve the equations.
On discrete distributions
Some times you need to express a discrete distribution, for example, you want to get 0 with 95% chance and 1 with 5% chance. So how do you do that?
Well, you divide it in rectangular distributions in such way that the ranges join to [0, 1) and use the randomic to evaluate:
0 if r is in [0, 0.95)
f(r) = {
1 if r is in [0.95, 1)
Or you can take the complex path, which is to write a distribution function like this (making each option exactly a range of length 1):
0.95 if x is in [0, 1)
f(x) = {
0.5 if x is in [1, 2)
Since each range has a length of 1 and the assigned values sum up to 1 we know that the total area is 1. Now the next step would be to integrate it:
0.95*x if x is in [0, 1)
F(x) = {
(0.5*(x-1))+0.95 = 0.5*x + 0.45 if x is in [1, 2)
Equate it to the randomic:
0.95*x if x is in [0, 1)
r = {
0.5*x + 0.45 if x is in [1, 2)
And solve the equation...
Ok, to solve that kind of equation, start by calculating the output ranges by applying the function:
[0, 1) becomes [0, 0.95)
[1, 2) becomes [0.95, {(0.5*(x-1))+0.95 where x = 2} = 1)
Now, those are the ranges for the solution:
? if r is in [0, 0.95)
x = {
? if r is in [0.95, 1)
Now, solve the inner functions:
r/0.95 if r is in [0, 0.95)
x = {
2*(r-0.45) = 2*r-0.9 if r is in [0.95, 1)
But, since the output is discrete, we end up with the same result after doing integer part:
0 if r is in [0, 0.95)
x = {
1 if r is in [0.95, 1)
Note: using random to mean pseudo random.
Edit: Found it on wikipedia (I knew I didn't invent it).