I have a pair of points and I would like to find a circles of known r that are determined by these two points. I will be using this in a simulation and possible space for `x`

and `y`

have boundaries (say a box of -200, 200).

It is known that square of radius is

```
(x-x1)^2 + (y-y1)^2 = r^2
(x-x2)^2 + (y-y2)^2 = r^2
```

I would now like to solve this non-linear system of equations to get two potential circle centers. I tried using package `BB`

. Here is my feeble attempt which gives only one point. What I would like to get is both possible points. Any pointers into right direction will be met with complimentary beer on first possible occasion.

```
library(BB)
known.pair <- structure(c(-46.9531139599816, -62.1874917150412, 25.9011462171242,
16.7441676243879), .Dim = c(2L, 2L), .Dimnames = list(NULL, c("x",
"y")))
getPoints <- function(ps, r, tr) {
# get parameters
x <- ps[1]
y <- ps[2]
# known coordinates of two points
x1 <- tr[1, 1]
y1 <- tr[1, 2]
x2 <- tr[2, 1]
y2 <- tr[2, 2]
out <- rep(NA, 2)
out[1] <- (x-x1)^2 + (y-y1)^2 - r^2
out[2] <- (x-x2)^2 + (y-y2)^2 - r^2
out
}
slvd <- BBsolve(par = c(0, 0),
fn = getPoints,
method = "L-BFGS-B",
tr = known.pair,
r = 40
)
```

Graphically you can see this with the following code, but you will need some extra packages.

```
library(sp)
library(rgeos)
plot(0,0, xlim = c(-200, 200), ylim = c(-200, 200), type = "n", asp = 1)
points(known.pair)
found.pt <- SpatialPoints(matrix(slvd$par, nrow = 1))
plot(gBuffer(found.pt, width = 40), add = T)
```

*ADDENDUM*

Thank you all for your valuable comments and code. I provide timings for answers by posters who complimented their answers with code.

```
test replications elapsed relative user.self sys.self user.child sys.child
4 alex 100 0.00 NA 0.00 0 NA NA
2 dason 100 0.01 NA 0.02 0 NA NA
3 josh 100 0.01 NA 0.02 0 NA NA
1 roland 100 0.15 NA 0.14 0 NA NA
```