Differentiating a cumulative distribution function
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I am trying to numerically evaluate the integral of the normal density function of x with respect to the cumulative distribution of (x+y-m).
I am currently attempting to solve this by trying to integrate the derivative of the cdf times the pdf with respect to x.
Here is my code so far:
k=100;
m=20;
y=0;
syms x;
f=normpdf(x);
g=diff(normcdf(y-x+m);
D=simple(int(f*g,0,(k-m)))
Q=double(D);
E=normcdf(y+2*m-k)-D
Any suggestions? The error message is Error using NaN Trailing string input must be 'single' or 'double'.
Error in normcdf (line 60)
p = NaN(size(z),class(z));
Accepted Answer
Tom Lane
on 17 Sep 2012
The Statistics Toolbox functions normpdf and normcdf don't accept symbolic inputs. You might be able to use functions like erf, which do operate on symbolic variables, to accomplish what you want to do. Here's a little example where I compute normcdf on a numeric vector, then I use Symbolic Toolbox functions to get the same result:
>> x = [.5 .7 .9];
>> normcdf(x)
ans =
0.6915 0.7580 0.8159
>> syms s;
>> p = erfc(-s/sqrt(2))/2;
>> double(subs(p,'s',x))
ans =
0.6915 0.7580 0.8159
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