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Although I think this is a basic question, I can't seem to find out how to calculate this in R:

the point of intersection (I need the x-value) of 2 or more normal distributions (fitted on a histogram) which have for example the following parameters:

d=data.frame(mod=c(1,2),mean=c(14,16),sd=c(0.9,0.6),prop=c(0.6,0.4))

With the mean and standard deviation of my 2 curves, and prop the proportions of contribution of each mod to the distribution.

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up vote 12 down vote accepted

You can use uniroot:

f <- function(x) dnorm(x, m=14, sd=0.9) * .6 - dnorm(x, m=16, sd=0.6) * .4

uniroot(f, interval=c(12, 16))

$root
[1] 15.19999

$f.root
[1] 2.557858e-06

$iter
[1] 5

$estim.prec
[1] 6.103516e-05


ETA some exposition:

uniroot is a univariate root finder, ie given a function f of one variable x, it finds the value of x that solves the equation f(x) = 0.

To use it, you supply the function f, along with an interval within which the solution value is assumed to lie. In this case, f is just the difference between the two densities; the point where they intersect will be where f is zero. I got the interval (12, 16) in this example by making a plot and seeing that they intersected around x=15.

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+1, but can you add some explanation of what this does/how it works? Thanks – Simon O'Hanlon Jun 7 '13 at 10:50
    
Thanks for the text. This is great! – Simon O'Hanlon Jun 7 '13 at 10:55
    
thanks, works perfectly!! – Wave Jun 7 '13 at 11:22

Sorry, but the accepted answer is not good. See also: intersection of two curves in matlab

You can get both roots using a function like this:

intersect <- function(m1, s1, m2, s2, prop1, prop2){

B <- (m1/s1^2 - m2/s2^2)
A <- 0.5*(1/s2^2 - 1/s1^2)
C <- 0.5*(m2^2/s2^2 - m1^2/s1^2) - log((s1/s2)*(prop2/prop1))

(-B + c(1,-1)*sqrt(B^2 - 4*A*C))/(2*A)
}

in your case:

> intersect(14,0.9,16,0.6,0.6,0.4)
[1] 20.0 15.2
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