X-Git-Url: https://git.saurik.com/wxWidgets.git/blobdiff_plain/c6dcefd2b8424bda524cbfb3331da019e2d12674..a9c98d7dd3a089e47a14369dcaf30a5e983079d5:/docs/latex/wx/wxstring.tex?ds=sidebyside diff --git a/docs/latex/wx/wxstring.tex b/docs/latex/wx/wxstring.tex index a4dcdaf4c7..cdd13d86b7 100644 --- a/docs/latex/wx/wxstring.tex +++ b/docs/latex/wx/wxstring.tex @@ -1205,8 +1205,8 @@ powerful means of converting wxString to C string. Attempts to convert the string to a floating point number. Returns \true on success (the number is stored in the location pointed to by \arg{val}) or \false -if the string does not represent such number (the value of \arg{val} shouldn't -be used in this case). +if the string does not represent such number (the value of \arg{val} is not +modified in this case). \wxheading{See also} @@ -1221,8 +1221,8 @@ be used in this case). Attempts to convert the string to a signed integer in base {\it base}. Returns \true on success in which case the number is stored in the location pointed to by \arg{val} or \false if the string does not represent a -valid number in the given base (the value of \arg{val} shouldn't -be used in this case). +valid number in the given base (the value of \arg{val} is not modified +in this case). The value of {\it base} must be comprised between $2$ and $36$, inclusive, or be a special value $0$ which means that the usual rules of {\tt C} numbers are @@ -1262,8 +1262,8 @@ with C99 support and Microsoft Visual C++ version 7 and higher do support this. Attempts to convert the string to an unsigned integer in base {\it base}. Returns \true on success in which case the number is stored in the location pointed to by \arg{val} or \false if the string does not -represent a valid number in the given base (the value of \arg{val} shouldn't -be used in this case). Please notice that this function +represent a valid number in the given base (the value of \arg{val} is not +modified in this case). Please notice that this function behaves in the same way as the standard \texttt{strtoul()} and so it simply converts negative numbers to unsigned representation instead of rejecting them (e.g. $-1$ is returned as \texttt{ULONG\_MAX}).