I have 5 (x,y) data points and I'm trying to find a best fit solution consisting of two lines which intersect at a point (x0,y0), and which follow these equations:
y1 = (m1)(x1 - x0) + y0 y2 = (m2)(x2 - x0) + y0
Specifically, I require that the intersection must occur between x=2 and x=3. Have a look at the code:
#Initialize x1, y1, x2, y2 x1 <- c(1,2) y1 <- c(10,10) x2 <- c(3,4,5) y2 <- c(20,30,40) g <- c(TRUE, TRUE, FALSE, FALSE, FALSE) q <- nls(c(y1, y2) ~ ifelse(g == TRUE, m1 * (x1 - x0) + y0, m2 * (x2 - x0) + y0), start = c(m1 = -1, m2 = 1, y0 = 0, x0 = 2), algorithm = "port", lower = c(m1 = -Inf, m2 = -Inf, y0 = -Inf, x0 = 2), upper = c(m1 = Inf, m2 = Inf, y0 = Inf, x0 = 3)) coef <- coef(q) m1 <- coef m2 <- coef y0 <- coef x0 <- coef #Plot the original x1, y1, and x2, y2 plot(x1,y1,xlim=c(1,5),ylim=c(0,50)) points(x2,y2) #Plot the fits x1 <- c(1,2,3,4,5) fit1 <- m1 * (x1 - x0) + y0 lines(x1, fit1, col="red") x2 <- c(1,2,3,4,5) fit2 <- m2 * (x2 - x0) + y0 lines(x2, fit2, col="blue")
So, you can see the data points listed there. Then, I run it through my nls, get my parameters m1, m2, x0, y0 (the slopes, and the intersection point).
But, take a look at the solution:
Clearly, the red line (which is supposed to only be based on the first 2 points) is not the best line of fit for the first 2 points. This is the same case with the blue line (the 2nd fit), which supposed to be is dependent on the last 3 points). What is wrong here?