cf7f52cc-dd19-4384-95a9-be69049e4005 3 4 5 decimal
&[DATE] &[TIME] - &[FILENAME]
&[PAGENUM] / &[COUNT]
 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

same as Mathcad "float -> 32 XP Pro.

a 1.29 1.25 / : 1.032000000000000

as it looks: same has ≠ representation Win 7

290482175965397 281474976710656 / 1.032000000000000

Optimiz => Numeric

a 1.29 1.25 / :

In computing machinery, the rational 1.29/1.25 is "floating representation". To be computed, the system converts in "machine number", i.e: in fixed arithmetic [Smath => 32 bits]

Optimiz => None

c a b / : 290482175965397 281474976710656 / 3 /

Optimiz => Symbolic

c a b / : 290482175965397 844424930131968 /

Optimiz => Symbolic Optimiz => None

a b c 3 1 mat 290482175965397 281474976710656 / 3 290482175965397 844424930131968 / 3 1 mat 0.344000000000000

Optimiz => Numeric

a b c 3 1 mat 1.032 3 0.344 3 1 mat

Optimiz => Numeric

a b c 3 1 mat 1.032000000000000 3.000000000000000 0.344000000000000 3 1 mat