table of contents
math::exact(n) | Tcl Math Library | math::exact(n) |
NAME¶
math::exact - Exact Real Arithmetic
SYNOPSIS¶
package require Tcl 8.6
package require grammar::aycock 1.0
package require math::exact 1.0.1
::math::exact::exactexpr expr
number ref
number unref
number asPrint precision
number asFloat precision
DESCRIPTION¶
The exactexpr command in the math::exact package allows for exact computations over the computable real numbers. These are not arbitrary-precision calculations; rather they are exact, with numbers represented by algorithms that produce successive approximations. At the end of a calculation, the caller can request a given precision for the end result, and intermediate results are computed to whatever precision is necessary to satisfy the request.
PROCEDURES¶
The following procedure is the primary entry into the math::exact package.
- ::math::exact::exactexpr expr
- Accepts a mathematical expression in Tcl syntax, and returns an object that represents the program to calculate successive approximations to the expression's value. The result will be referred to as an exact real number.
- number ref
- Increases the reference count of a given exact real number.
- number unref
- Decreases the reference count of a given exact real number, and destroys the number if the reference count is zero.
- number asPrint precision
- Formats the given number for printing, with the specified precision. (See below for how precision is interpreted). Numbers that are known to be rational are formatted as fractions.
- number asFloat precision
- Formats the given number for printing, with the specified precision. (See below for how precision is interpreted). All numbers are formatted in floating-point E format.
PARAMETERS¶
- expr
- Expression to evaluate. The syntax for expressions is the same as it is in Tcl, but the set of operations is smaller. See Expressions below for details.
- number
- The object returned by an earlier invocation of math::exact::exactexpr
- precision
- The requested 'precision' of the result. The precision is (approximately) the absolute value of the binary exponent plus the number of bits of the binary significand. For instance, to return results to IEEE-754 double precision, 56 bits plus the exponent are required. Numbers between 1/2 and 2 will require a precision of 57; numbers between 1/4 and 1/2 or between 2 and 4 will require 58; numbers between 1/8 and 1/4 or between 4 and 8 will require 59; and so on.
EXPRESSIONS¶
The math::exact::exactexpr command accepts expressions in a subset of Tcl's syntax. The following components may be used in an expression.
- Decimal integers.
- Variable references with the dollar sign ($). The value of the variable must be the result of another call to math::exact::exactexpr. The reference count of the value will be increased by one for each position at which it appears in the expression.
- The exponentiation operator (**).
- Unary plus (+) and minus (-) operators.
- Multiplication (*) and division (/) operators.
- Parentheses used for grouping.
- Functions. See Functions below for the functions that are available.
FUNCTIONS¶
The following functions are available for use within exact real expressions.
- acos(x)
- The inverse cosine of x. The result is expressed in radians. The absolute value of x must be less than 1.
- acosh(x)
- The inverse hyperbolic cosine of x. x must be greater than 1.
- asin(x)
- The inverse sine of x. The result is expressed in radians. The absolute value of x must be less than 1.
- asinh(x)
- The inverse hyperbolic sine of x.
- atan(x)
- The inverse tangent of x. The result is expressed in radians.
- atanh(x)
- The inverse hyperbolic tangent of x. The absolute value of x must be less than 1.
- cos(x)
- The cosine of x. x is expressed in radians.
- cosh(x)
- The hyperbolic cosine of x.
- e()
- The base of the natural logarithms = 2.71828...
- exp(x)
- The exponential function of x.
- log(x)
- The natural logarithm of x. x must be positive.
- pi()
- The value of pi = 3.15159...
- sin(x)
- The sine of x. x is expressed in radians.
- sinh(x)
- The hyperbolic sine of x.
- sqrt(x)
- The square root of x. x must be positive.
- tan(x)
- The tangent of x. x is expressed in radians.
- tanh(x)
- The hyperbolic tangent of x.
SUMMARY¶
The math::exact::exactexpr command provides a system that performs exact arithmetic over computable real numbers, representing the numbers as algorithms for successive approximation. An example, which implements the high-school quadratic formula, is shown below.
namespace import math::exact::exactexpr proc exactquad {a b c} {
set d [[exactexpr {sqrt($b*$b - 4*$a*$c)}] ref]
set r0 [[exactexpr {(-$b - $d) / (2 * $a)}] ref]
set r1 [[exactexpr {(-$b + $d) / (2 * $a)}] ref]
$d unref
return [list $r0 $r1] } set a [[exactexpr 1] ref] set b [[exactexpr 200] ref] set c [[exactexpr {(-3/2) * 10**-12}] ref] lassign [exactquad $a $b $c] r0 r1 $a unref; $b unref; $c unref puts [list [$r0 asFloat 70] [$r1 asFloat 110]] $r0 unref; $r1 unref
-2.000000000000000075e2 7.499999999999999719e-15
-200.0 1.4210854715202004e-14
CATEGORY¶
Mathematics
COPYRIGHT¶
Copyright (c) 2015 Kevin B. Kenny <kennykb@acm.org> Redistribution permitted under the terms of the Open Publication License <http://www.opencontent.org/openpub/>
1.0.1 | tcllib |