normpdf() and normcdf() are numeric routines. They are coded in a way that cannot succeed if the mu or sigma are symbolic. They internally need to test sigma == 0 & mu < 0 and also mu <= 0, which will fail for symbolic values that have insufficient assertions active (and even then, the assertions might not be enough.) It is okay to use symbolic values for the x for normpdf and normcdf though.
The above is why the vpasolve() is failing; it is failing while looking at the normpdf() expression before even getting into the vpasolve() call.
The solution is to turn it into a numeric system: transform vpasolve(A(r) == B(r),r) into @(r) A(r) - B(r) and apply a numeric solver to that.
Your vpasolve() is for r from 0 to 1. There is no solution to your system in that range. The solution is at approximately r = 1.008849984 .
