No, it is not correct that trailing digits after 16 digits are zero. Double precision is binary and cannot exactly represent fractions of 10 (except for special ones like 5/10 or 25/100)
fprintf('%.999g\n', cos(10))
When the Symbolic toolbox is asked to convert a double precision number, it goes through the following algorithm:
- is the number close to being a rational multiple of π with denominator no more than 10000 ? If so, the emit the rational fraction time symbolic π
- use a continued-fraction algorithm to determine whether the number is close to being a rational number times the square root of an integer
- use a continued-fraction algorithm to determine whether the number is close to being a rational number
- if none of the above, use the exact binary ratio
So vpa(pi,100) works because the floating point constant returned by pi is recognized as being a multiple of π first, and then vpa() of π can produce an indefinite number of digits of π
vpa(cos(10), 100) calculates cos(10) in double precision, and that gets processed though the algorithm, which gives up and represents it as an exact binary ratio -7557684451371807/9007199254740992 -- which happens to be representable in decimal in fewer than 100 digits.
