# Solve simple equation in R

I have a probably really basic question concerning the possibility to solve functions in R, but to know the answer would really help to understand R better.

I have following equation:

0=-100/(1+r)+(100-50)/(1+r)^2+(100-50)/(1+r)^3+...(100-50)/(1+r)^10

How can I solve this equation in R finding the variable r?

I tried sth. like this:

``````n <- c(2:10)
0 = -100/(r+1)+sum((100-50)/((1+r)^n))
``````

But got an error message:

``````Error in 0 = -100/(r + 1) + sum((100 - 50)/((1 + r)^n)) :
invalid (do_set) left-hand side to assignment
``````

What's the problem and how can I find r?

There are plenty of optimization and root finding libraries for R link here. But in native R:

``````fnToFindRoot = function(r) {
n <- c(2:10)
return(abs(-100/(r+1)+sum((100-50)/((1+r)^n))))
}
# arbitrary starting values
r0 = 0
# minimise the function to get the parameter estimates
rootSearch = optim(r0, fnToFindRoot,method = 'BFGS', hessian=TRUE)
str(rootSearch)
fnToFindRoot(rootSearch\$par)
``````

That function is very volatile. If you are willing to bracket the root, you are probably better off with `uniroot`:

``````fnToFindRoot = function(r,a) {
n <- c(2:10)
return((-100/(r+1)+sum((100-50)/((1+r)^n)))-a)
}
str(xmin <- uniroot(fnToFindRoot, c(-1E6, 1E6), tol = 0.0001, a = 0))
``````

The `a` argument is there so you can look for a root to any arbitrary value.

• Grothendieck's library is nicely self-contained. I would check that out and uniroot. The optimization answer is from me doing too many of those lately. Commented Jan 20, 2014 at 21:45
• Doesn't `optim` do the wrong thing when one wants to find the root (zero) of the function? `optim` tries to find the minimum, right? Commented Dec 14, 2017 at 9:35
• I am not sure if I understood what the `a` parameter does Commented Nov 2, 2022 at 7:59

Try bisection. This converges to `r = 0.4858343` in 25 iterations:

``````library(pracma)
bisect(function(r) -100/(1+r) + sum(50/(r+1)^seq(2, 10)), 0, 1)
``````

giving:

``````\$root
[1] 0.4858343

\$f.root
[1] 8.377009e-07

\$iter
[1] 25

\$estim.prec
[1] 1.490116e-08
``````
• It seems much slower than `uniroot` Commented Nov 2, 2022 at 8:07

Let `x = 1/(1+r)`, so your equation should be:

0-100x + 50x^2 + 50x^3 + ... + 50x^10 = 0.

then in R:

``````x <- polyroot(c(0, -100, rep(50, 9)))
(r <- 1/x - 1)
``````

`````` [1]        Inf+      NaNi  0.4858344-0.0000000i -1.7964189-0.2778635i