Math::BigFloat
NAME
Math::BigFloat  Arbitrary size floating point math package
SYNOPSIS
 use Math::BigFloat;
 # Number creation
 my $x = Math::BigFloat>new($str); # defaults to 0
 my $y = $x>copy(); # make a true copy
 my $nan = Math::BigFloat>bnan(); # create a NotANumber
 my $zero = Math::BigFloat>bzero(); # create a +0
 my $inf = Math::BigFloat>binf(); # create a +inf
 my $inf = Math::BigFloat>binf(''); # create a inf
 my $one = Math::BigFloat>bone(); # create a +1
 my $mone = Math::BigFloat>bone(''); # create a 1
 my $pi = Math::BigFloat>bpi(100); # PI to 100 digits
 # the following examples compute their result to 100 digits accuracy:
 my $cos = Math::BigFloat>new(1)>bcos(100); # cosinus(1)
 my $sin = Math::BigFloat>new(1)>bsin(100); # sinus(1)
 my $atan = Math::BigFloat>new(1)>batan(100); # arcus tangens(1)
 my $atan2 = Math::BigFloat>new( 1 )>batan2( 1 ,100); # batan(1)
 my $atan2 = Math::BigFloat>new( 1 )>batan2( 8 ,100); # batan(1/8)
 my $atan2 = Math::BigFloat>new( 2 )>batan2( 1 ,100); # batan(2)
 # Testing
 $x>is_zero(); # true if arg is +0
 $x>is_nan(); # true if arg is NaN
 $x>is_one(); # true if arg is +1
 $x>is_one(''); # true if arg is 1
 $x>is_odd(); # true if odd, false for even
 $x>is_even(); # true if even, false for odd
 $x>is_pos(); # true if >= 0
 $x>is_neg(); # true if < 0
 $x>is_inf(sign); # true if +inf, or inf (default is '+')
 $x>bcmp($y); # compare numbers (undef,<0,=0,>0)
 $x>bacmp($y); # compare absolutely (undef,<0,=0,>0)
 $x>sign(); # return the sign, either +, or NaN
 $x>digit($n); # return the nth digit, counting from right
 $x>digit($n); # return the nth digit, counting from left
 # The following all modify their first argument. If you want to preserve
 # $x, use $z = $x>copy()>bXXX($y); See under L<CAVEATS> for why this is
 # necessary when mixing $a = $b assignments with nonoverloaded math.
 # set
 $x>bzero(); # set $i to 0
 $x>bnan(); # set $i to NaN
 $x>bone(); # set $x to +1
 $x>bone(''); # set $x to 1
 $x>binf(); # set $x to inf
 $x>binf(''); # set $x to inf
 $x>bneg(); # negation
 $x>babs(); # absolute value
 $x>bnorm(); # normalize (noop)
 $x>bnot(); # two's complement (bit wise not)
 $x>binc(); # increment x by 1
 $x>bdec(); # decrement x by 1
 $x>badd($y); # addition (add $y to $x)
 $x>bsub($y); # subtraction (subtract $y from $x)
 $x>bmul($y); # multiplication (multiply $x by $y)
 $x>bdiv($y); # divide, set $x to quotient
 # return (quo,rem) or quo if scalar
 $x>bmod($y); # modulus ($x % $y)
 $x>bpow($y); # power of arguments ($x ** $y)
 $x>bmodpow($exp,$mod); # modular exponentiation (($num**$exp) % $mod))
 $x>blsft($y, $n); # left shift by $y places in base $n
 $x>brsft($y, $n); # right shift by $y places in base $n
 # returns (quo,rem) or quo if in scalar context
 $x>blog(); # logarithm of $x to base e (Euler's number)
 $x>blog($base); # logarithm of $x to base $base (f.i. 2)
 $x>bexp(); # calculate e ** $x where e is Euler's number
 $x>band($y); # bitwise and
 $x>bior($y); # bitwise inclusive or
 $x>bxor($y); # bitwise exclusive or
 $x>bnot(); # bitwise not (two's complement)
 $x>bsqrt(); # calculate squareroot
 $x>broot($y); # $y'th root of $x (e.g. $y == 3 => cubic root)
 $x>bfac(); # factorial of $x (1*2*3*4*..$x)
 $x>bround($N); # accuracy: preserve $N digits
 $x>bfround($N); # precision: round to the $Nth digit
 $x>bfloor(); # return integer less or equal than $x
 $x>bceil(); # return integer greater or equal than $x
 # The following do not modify their arguments:
 bgcd(@values); # greatest common divisor
 blcm(@values); # lowest common multiplicator
 $x>bstr(); # return string
 $x>bsstr(); # return string in scientific notation
 $x>as_int(); # return $x as BigInt
 $x>exponent(); # return exponent as BigInt
 $x>mantissa(); # return mantissa as BigInt
 $x>parts(); # return (mantissa,exponent) as BigInt
 $x>length(); # number of digits (w/o sign and '.')
 ($l,$f) = $x>length(); # number of digits, and length of fraction
 $x>precision(); # return P of $x (or global, if P of $x undef)
 $x>precision($n); # set P of $x to $n
 $x>accuracy(); # return A of $x (or global, if A of $x undef)
 $x>accuracy($n); # set A $x to $n
 # these get/set the appropriate global value for all BigFloat objects
 Math::BigFloat>precision(); # Precision
 Math::BigFloat>accuracy(); # Accuracy
 Math::BigFloat>round_mode(); # rounding mode
DESCRIPTION
All operators (including basic math operations) are overloaded if you declare your big floating point numbers as
 $i = new Math::BigFloat '12_3.456_789_123_456_789E2';
Operations with overloaded operators preserve the arguments, which is exactly what you expect.
Canonical notation
Input to these routines are either BigFloat objects, or strings of the following four forms:

/^[+]\d+$/

/^[+]\d+\.\d*$/

/^[+]\d+E[+]?\d+$/

/^[+]\d*\.\d+E[+]?\d+$/
all with optional leading and trailing zeros and/or spaces. Additionally, numbers are allowed to have an underscore between any two digits.
Empty strings as well as other illegal numbers results in 'NaN'.
bnorm() on a BigFloat object is now effectively a noop, since the numbers are always stored in normalized form. On a string, it creates a BigFloat object.
Output
Output values are BigFloat objects (normalized), except for bstr() and bsstr().
The string output will always have leading and trailing zeros stripped and drop
a plus sign. bstr()
will give you always the form with a decimal point,
while bsstr()
(s for scientific) gives you the scientific notation.
 Input bstr() bsstr()
 '0' '0' '0E1'
 ' 123 123 123' '123123123' '123123123E0'
 '00.0123' '0.0123' '123E4'
 '123.45E2' '1.2345' '12345E4'
 '10E+3' '10000' '1E4'
Some routines (is_odd()
, is_even()
, is_zero()
, is_one()
,
is_nan()
) return true or false, while others (bcmp()
, bacmp()
)
return either undef, <0, 0 or >0 and are suited for sort.
Actual math is done by using the class defined with with => Class;
(which
defaults to BigInts) to represent the mantissa and exponent.
The sign /^[+]$/
is stored separately. The string 'NaN' is used to
represent the result when input arguments are not numbers, as well as
the result of dividing by zero.
mantissa()
, exponent()
and parts()
mantissa()
and exponent()
return the said parts of the BigFloat
as BigInts such that:
 $m = $x>mantissa();
 $e = $x>exponent();
 $y = $m * ( 10 ** $e );
 print "ok\n" if $x == $y;
($m,$e) = $x>parts();
is just a shortcut giving you both of them.
A zero is represented and returned as 0E1
, not 0E0
(after Knuth).
Currently the mantissa is reduced as much as possible, favouring higher exponents over lower ones (e.g. returning 1e7 instead of 10e6 or 10000000e0). This might change in the future, so do not depend on it.
Accuracy vs. Precision
See also: Rounding.
Math::BigFloat supports both precision (rounding to a certain place before or after the dot) and accuracy (rounding to a certain number of digits). For a full documentation, examples and tips on these topics please see the large section about rounding in Math::BigInt.
Since things like sqrt(2)
or 1 / 3
must presented with a limited
accuracy lest a operation consumes all resources, each operation produces
no more than the requested number of digits.
If there is no global precision or accuracy set, and the operation in
question was not called with a requested precision or accuracy, and the
input $x has no accuracy or precision set, then a fallback parameter will
be used. For historical reasons, it is called div_scale
and can be accessed
via:
 $d = Math::BigFloat>div_scale(); # query
 Math::BigFloat>div_scale($n); # set to $n digits
The default value for div_scale
is 40.
In case the result of one operation has more digits than specified, it is rounded. The rounding mode taken is either the default mode, or the one supplied to the operation after the scale:
 $x = Math::BigFloat>new(2);
 Math::BigFloat>accuracy(5); # 5 digits max
 $y = $x>copy()>bdiv(3); # will give 0.66667
 $y = $x>copy()>bdiv(3,6); # will give 0.666667
 $y = $x>copy()>bdiv(3,6,undef,'odd'); # will give 0.666667
 Math::BigFloat>round_mode('zero');
 $y = $x>copy()>bdiv(3,6); # will also give 0.666667
Note that Math::BigFloat>accuracy()
and Math::BigFloat>precision()
set the global variables, and thus any newly created number will be subject
to the global rounding immediately. This means that in the examples above, the
3
as argument to bdiv()
will also get an accuracy of 5.
It is less confusing to either calculate the result fully, and afterwards round it explicitly, or use the additional parameters to the math functions like so:
Rounding
 ffround ( +$scale )
Rounds to the $scale'th place left from the '.', counting from the dot. The first digit is numbered 1.
 ffround ( $scale )
Rounds to the $scale'th place right from the '.', counting from the dot.
 ffround ( 0 )
Rounds to an integer.
 fround ( +$scale )
Preserves accuracy to $scale digits from the left (aka significant digits) and pads the rest with zeros. If the number is between 1 and 1, the significant digits count from the first nonzero after the '.'
 fround ( $scale ) and fround ( 0 )
These are effectively noops.
All rounding functions take as a second parameter a rounding mode from one of the following: 'even', 'odd', '+inf', 'inf', 'zero', 'trunc' or 'common'.
The default rounding mode is 'even'. By using
Math::BigFloat>round_mode($round_mode);
you can get and set the default
mode for subsequent rounding. The usage of $Math::BigFloat::$round_mode
is
no longer supported.
The second parameter to the round functions then overrides the default
temporarily.
The as_number()
function returns a BigInt from a Math::BigFloat. It uses
'trunc' as rounding mode to make it equivalent to:
 $x = 2.5;
 $y = int($x) + 2;
You can override this by passing the desired rounding mode as parameter to
as_number()
:
 $x = Math::BigFloat>new(2.5);
 $y = $x>as_number('odd'); # $y = 3
METHODS
Math::BigFloat supports all methods that Math::BigInt supports, except it calculates noninteger results when possible. Please see Math::BigInt for a full description of each method. Below are just the most important differences:
accuracy
 $x>accuracy(5); # local for $x
 CLASS>accuracy(5); # global for all members of CLASS
 # Note: This also applies to new()!
 $A = $x>accuracy(); # read out accuracy that affects $x
 $A = CLASS>accuracy(); # read out global accuracy
Set or get the global or local accuracy, aka how many significant digits the results have. If you set a global accuracy, then this also applies to new()!
Warning! The accuracy sticks, e.g. once you created a number under the
influence of CLASS>accuracy($A)
, all results from math operations with
that number will also be rounded.
In most cases, you should probably round the results explicitly using one of round(), bround() or bfround() or by passing the desired accuracy to the math operation as additional parameter:
precision()
 $x>precision(2); # local for $x, round at the second digit right of the dot
 $x>precision(2); # ditto, round at the second digit left of the dot
 CLASS>precision(5); # Global for all members of CLASS
 # This also applies to new()!
 CLASS>precision(5); # ditto
 $P = CLASS>precision(); # read out global precision
 $P = $x>precision(); # read out precision that affects $x
Note: You probably want to use accuracy() instead. With accuracy you set the number of digits each result should have, with precision you set the place where to round!
bexp()
 $x>bexp($accuracy); # calculate e ** X
Calculates the expression e ** $x
where e
is Euler's number.
This method was added in v1.82 of Math::BigInt (April 2007).
bnok()
 $x>bnok($y); # x over y (binomial coefficient n over k)
Calculates the binomial coefficient n over k, also called the "choose" function. The result is equivalent to:
 ( n ) n!
    = 
 ( k ) k!(nk)!
This method was added in v1.84 of Math::BigInt (April 2007).
bpi()
 print Math::BigFloat>bpi(100), "\n";
Calculate PI to N digits (including the 3 before the dot). The result is rounded according to the current rounding mode, which defaults to "even".
This method was added in v1.87 of Math::BigInt (June 2007).
bcos()
Calculate the cosinus of $x, modifying $x in place.
This method was added in v1.87 of Math::BigInt (June 2007).
bsin()
Calculate the sinus of $x, modifying $x in place.
This method was added in v1.87 of Math::BigInt (June 2007).
batan2()
Calculate the arcus tanges of $y
divided by $x
, modifying $y in place.
See also batan().
This method was added in v1.87 of Math::BigInt (June 2007).
batan()
Calculate the arcus tanges of $x, modifying $x in place. See also batan2().
This method was added in v1.87 of Math::BigInt (June 2007).
bmuladd()
 $x>bmuladd($y,$z);
Multiply $x by $y, and then add $z to the result.
This method was added in v1.87 of Math::BigInt (June 2007).
Autocreating constants
After use Math::BigFloat ':constant'
all the floating point constants
in the given scope are converted to Math::BigFloat
. This conversion
happens at compile time.
In particular
 perl MMath::BigFloat=:constant e 'print 2E100,"\n"'
prints the value of 2E100
. Note that without conversion of
constants the expression 2E100 will be calculated as normal floating point
number.
Please note that ':constant' does not affect integer constants, nor binary nor hexadecimal constants. Use bignum or Math::BigInt to get this to work.
Math library
Math with the numbers is done (by default) by a module called Math::BigInt::Calc. This is equivalent to saying:
 use Math::BigFloat lib => 'Calc';
You can change this by using:
 use Math::BigFloat lib => 'GMP';
Note: General purpose packages should not be explicit about the library to use; let the script author decide which is best.
Note: The keyword 'lib' will warn when the requested library could not be loaded. To suppress the warning use 'try' instead:
 use Math::BigFloat try => 'GMP';
If your script works with huge numbers and Calc is too slow for them, you can also for the loading of one of these libraries and if none of them can be used, the code will die:
 use Math::BigFloat only => 'GMP,Pari';
The following would first try to find Math::BigInt::Foo, then Math::BigInt::Bar, and when this also fails, revert to Math::BigInt::Calc:
 use Math::BigFloat lib => 'Foo,Math::BigInt::Bar';
See the respective lowlevel library documentation for further details.
Please note that Math::BigFloat does not use the denoted library itself, but it merely passes the lib argument to Math::BigInt. So, instead of the need to do:
you can roll it all into one line:
 use Math::BigFloat lib => 'GMP';
It is also possible to just require Math::BigFloat:
 require Math::BigFloat;
This will load the necessary things (like BigInt) when they are needed, and automatically.
See Math::BigInt for more details than you ever wanted to know about using a different lowlevel library.
Using Math::BigInt::Lite
For backwards compatibility reasons it is still possible to request a different storage class for use with Math::BigFloat:
 use Math::BigFloat with => 'Math::BigInt::Lite';
However, this request is ignored, as the current code now uses the lowlevel math library for directly storing the number parts.
EXPORTS
Math::BigFloat
exports nothing by default, but can export the bpi()
method:
BUGS
Please see the file BUGS in the CPAN distribution Math::BigInt for known bugs.
CAVEATS
Do not try to be clever to insert some operations in between switching libraries:
This will create objects with numbers stored in two different backend libraries, and VERY BAD THINGS will happen when you use these together:
 my $flash_and_bang = $matter + $anti_matter; # Don't do this!
 stringify, bstr()
Both stringify and bstr() now drop the leading '+'. The old code would return '+1.23', the new returns '1.23'. See the documentation in Math::BigInt for reasoning and details.
 bdiv
The following will probably not print what you expect:
 print $c>bdiv(123.456),"\n";
It prints both quotient and remainder since print works in list context. Also, bdiv() will modify $c, so be careful. You probably want to use
instead.
 brsft
The following will probably not print what you expect:
It prints both quotient and remainder, since print calls
brsft()
in list context. Also,$c>brsft()
will modify $c, so be careful. You probably want to useinstead.
 Modifying and =
Beware of:
 $x = Math::BigFloat>new(5);
 $y = $x;
It will not do what you think, e.g. making a copy of $x. Instead it just makes a second reference to the same object and stores it in $y. Thus anything that modifies $x will modify $y (except overloaded math operators), and vice versa. See Math::BigInt for details and how to avoid that.
 bpow
bpow()
now modifies the first argument, unlike the old code which left it alone and only returned the result. This is to be consistent withbadd()
etc. The first will modify $x, the second one won't:  precision() vs. accuracy()
A common pitfall is to use precision() when you want to round a result to a certain number of digits:
 use Math::BigFloat;
 Math::BigFloat>precision(4); # does not do what you think it does
 my $x = Math::BigFloat>new(12345); # rounds $x to "12000"!
 print "$x\n"; # print "12000"
 my $y = Math::BigFloat>new(3); # rounds $y to "0"!
 print "$y\n"; # print "0"
 $z = $x / $y; # 12000 / 0 => NaN!
 print "$z\n";
 print $z>precision(),"\n"; # 4
Replacing precision with accuracy is probably not what you want, either:
 use Math::BigFloat;
 Math::BigFloat>accuracy(4); # enables global rounding:
 my $x = Math::BigFloat>new(123456); # rounded immediately to "12350"
 print "$x\n"; # print "123500"
 my $y = Math::BigFloat>new(3); # rounded to "3
 print "$y\n"; # print "3"
 print $z = $x>copy()>bdiv($y),"\n"; # 41170
 print $z>accuracy(),"\n"; # 4
What you want to use instead is:
In addition to computing what you expected, the last example also does not "taint" the result with an accuracy or precision setting, which would influence any further operation.
SEE ALSO
Math::BigInt, Math::BigRat and Math::Big as well as Math::BigInt::BitVect, Math::BigInt::Pari and Math::BigInt::GMP.
The pragmas bignum, bigint and bigrat might also be of interest because they solve the autoupgrading/downgrading issue, at least partly.
The package at http://search.cpan.org/~tels/MathBigInt contains more documentation including a full version history, testcases, empty subclass files and benchmarks.
LICENSE
This program is free software; you may redistribute it and/or modify it under the same terms as Perl itself.
AUTHORS
Mark Biggar, overloaded interface by Ilya Zakharevich. Completely rewritten by Tels http://bloodgate.com in 2001  2006, and still at it in 2007.