# left and right interval for predicted value r

I'm having trouble finding a solution for a problem. Let's say I have a dataset with two columns, one column are the grades for one course, the other column are the grades for another course.

``````x = c(3,7.5,6.25,5,12.5, ...,n)
y = c(17,2.5,2.0,12.5,...,n)
``````

Now is my question, how is it possible to predict an y-value given a certain x-value and what are the intervals (borders) for this prediction? I tried working with lm() function and then predict() based on that model, but that didn't work. All help appreciated!

Solution found:

``````reg = lm(y~x)
intercept = reg\$coefficients[1]
slope = reg\$coefficients[2]
x = 0 #actually a number given by me
s = summary(reg)
se = s\$sigma
factor = qnorm((1+p)/2) #p=0.95 or 0.99, ...
min.y = (intercept+slope*x)-(factor*se)
max.y = (intercept+slope*x)+(factor*se)
``````
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What does `didn't work` mean for you? Please help us help you by providing us with a reproducible example (i.e. code and example data), see stackoverflow.com/questions/5963269/… for details. –  Paul Hiemstra May 23 at 9:58
It didn't work in the way that I didn't achieve a correct answer, I know how to calculate the intervals left and right of a certain point, but I have absolutely no clue on how to do it up and down of a point. I'm given a certain x value, let's say 16, based on this I must predict where the y value would fall in between [Ymin, Ymax] and this with a reliability of 90%. –  user1929899 May 23 at 10:16
But you need to define what a "correct" answer is. It sure looks like you want to find a fitting function for `y= f(x)` and then calculate the rms error of that fit function. `lm()` may have failed simply because there isn't a linear relation. Start by plotting `y` vs. `x` to get an idea of what you're dealing with. –  Carl Witthoft May 23 at 11:34
I found the solution: Ymin = (intercept + slope * x) - ((qnorm((1+p)/2)*sigma) and for Ymax = (intercept + slope * x) + ((qnorm((1+p)/2)*sigma) –  user1929899 May 23 at 12:01
@Carl Witthoft: lm() may have failed simply because there isn't a linear relation: That sentence could be misunderstood. lm wouldn't fail on a non-linear relation, but the results could be meaningless. –  Dieter Menne May 23 at 12:17

(Edited, first solution was short-sighted)

Cross-check your solution with the canonical version of predict(... se.fit..)

``````x = c(1:20)
y = c(2*x+rnorm(20,0,10))
reg = lm(y~x)
newdata= data.frame(x=x)
p = predict(reg,newdata,se.fit=TRUE)

plot(x,y,col="red")
lines(newdata\$x,p\$fit)
lines(newdata\$x,  p\$fit+p\$se.fit,col="green"   )
lines(newdata\$x,  p\$fit-p\$se.fit,col="green"   )
``````
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