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How might I solve for the roots of an equation of the following form numerically in R:

f(r)=r*c+1-B*c-exp(-M(B-r))

Where M, B and c are known constants.

Thanks in advance.

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Have you tried the rootSolve package? cran.r-project.org/web/packages/rootSolve/rootSolve.pdf –  Stijn Feb 1 '13 at 12:43
    
This really isn't the sort of thing that R is inherently good at. A symbolic package like Maxima is better suited for symbolic work and will be less fuss about it. –  Dinre Feb 1 '13 at 13:25
    
What do you mean by "none constants"? Your function f only has one parameter, if you want to find r such that f(r)=0 then the other things will have to be constants. –  Spacedman Feb 1 '13 at 14:08
    
@Dinre Assuming the OP understands what "numerically" means, he isn't looking for yacas or macsyma -- better to send him to package BB –  Carl Witthoft Feb 1 '13 at 14:17
    
"none" is probably "known" –  Henry Feb 1 '13 at 14:24

1 Answer 1

Since R can not do this functionality you might want to use a superset package like Sage. Sage includes R and many other packages and can do what you want using a webbrowser interface. The site is http://www.sagemath.org/

Examples are located at: http://www.sagemath.org/doc/reference/sage/symbolic/relation.html

You can try stuff like the following at: http://www.sagenb.org/

var('r', 'c', 'B', 'M')
f = r*c+1-B*c-exp(-M(B-r))
print solve(f, r)

The results of this is:

r == (B*c + e^(-B + r) - 1)/c

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