I have a continuous variable A=gamrnd(5,0.4,1000,28)
and an output variable Y=lognrnd(7,1.9,1000,28)
A
7.6472 3.4284 6.3352 8.0480 8.1021
12.3371 5.1611 6.3986 9.3687 9.5652
8.7700 5.2980 6.0307 2.8651 12.6011
12.2042 4.5636 6.0570 7.1348 8.6586
7.8960 5.5213 3.7105 6.4875 7.4891
Y
1.9733 14.0951 14.0951 14.0951 14.0951
9.4284 11.7573 15.6730 25.4495 24.6680
3.4724 4.4953 7.1237 9.4191 18.4504
8.9548 8.9548 8.9548 8.9548 8.9548
1.4834 2.5393 2.5393 2.5393 2.5393
I'd like to calculate the variance
of Y
for a specific value of A (or width) of that red box? let's say I split the domain of A
into 20 red boxes, I would like to calculate the variance of Y
for each box. That is to say:
$Var(Y|A=a_i)$
Any thought how I'd do that?
My thoughts so far:
[i j]=find(9.5<=A & A<=10.5)
sig=var(reshape((Y([i j])),length(i)*2,1))
but this is correct but rather ad-hoc. Let's say I had a hundred divisions in A. Is it possible to use something more efficient?