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I have number x=[0,n], where n>0. I want to construct a function y=f(x) such that the value increase slowly from 0 and increase very fast when approaching n, and when reach n, y is infinity. What is a good function to model this?

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closed as off topic by woodchips, verdesmarald, Jay Riggs, slugster, David Nehme Oct 11 '12 at 3:21

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4  
y=1/(n-x)-1/n is one option – sinelaw Oct 11 '12 at 2:01
    
Another option: x/(n-x) – krjampani Oct 11 '12 at 2:12
    
Those are the same function algebraically :) – D Stanley Oct 11 '12 at 2:14
1  
Alright.. How about e^(x/n-x) - 1 ? – krjampani Oct 11 '12 at 2:20
up vote 1 down vote accepted

1/(n-x) - 1/n will work.

There are plenty of other functions log, atan, x^(-k),... that goes to infinity at some point.

a^y is another set of functions with fast grows - maybe more suitable for coding as it can reach arbitrary large (but finite) values.

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3  
at x=0, you get 1/n which is why I subtracted 1/n in my comment above. Here's a graph, too: wolframalpha.com/input/?i=y%3D1%2F%285-x%29-1%2F5 – sinelaw Oct 11 '12 at 2:05
    
@sinelaw, thanks. Updated the answer. – Alexei Levenkov Oct 11 '12 at 2:19

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