math::polynomials(3tcl) | Tcl Math Library | math::polynomials(3tcl) |

# NAME¶

math::polynomials - Polynomial functions# SYNOPSIS¶

package require**Tcl ?8.3?**

package require **math::polynomials ?1.0.1?**

**::math::polynomials::polynomial** *coeffs*

**::math::polynomials::polynCmd** *coeffs*

**::math::polynomials::evalPolyn** *polynomial*
*x*

**::math::polynomials::addPolyn** *polyn1*
*polyn2*

**::math::polynomials::subPolyn** *polyn1*
*polyn2*

**::math::polynomials::multPolyn** *polyn1*
*polyn2*

**::math::polynomials::divPolyn** *polyn1*
*polyn2*

**::math::polynomials::remainderPolyn** *polyn1*
*polyn2*

**::math::polynomials::derivPolyn** *polyn*

**::math::polynomials::primitivePolyn** *polyn*

**::math::polynomials::degreePolyn** *polyn*

**::math::polynomials::coeffPolyn** *polyn*
*index*

**::math::polynomials::allCoeffsPolyn** *polyn*

# DESCRIPTION¶

This package deals with polynomial functions of one variable:- the basic arithmetic operations are extended to polynomials
- computing the derivatives and primitives of these functions
- evaluation through a general procedure or via specific procedures)

# PROCEDURES¶

The package defines the following public procedures:**::math::polynomials::polynomial***coeffs*- Return an (encoded) list that defines the polynomial. A polynomial

f(x) = a + b.x + c.x**2 + d.x**3

- can be defined via:

set f [::math::polynomials::polynomial [list $a $b $c $d]

- list
*coeffs* - Coefficients of the polynomial (in ascending order)

**::math::polynomials::polynCmd***coeffs*- Create a new procedure that evaluates the polynomial. The name of the polynomial is automatically generated. Useful if you need to evualuate the polynomial many times, as the procedure consists of a single [expr] command.

- list
*coeffs* - Coefficients of the polynomial (in ascending order) or the polynomial
definition returned by the
*polynomial*command.

**::math::polynomials::evalPolyn***polynomial**x*- Evaluate the polynomial at x.

- list
*polynomial* - The polynomial's definition (as returned by the polynomial command). order)
- float
*x* - The coordinate at which to evaluate the polynomial

**::math::polynomials::addPolyn***polyn1**polyn2*- Return a new polynomial which is the sum of the two others.

- list
*polyn1* - The first polynomial operand
- list
*polyn2* - The second polynomial operand

**::math::polynomials::subPolyn***polyn1**polyn2*- Return a new polynomial which is the difference of the two others.

- list
*polyn1* - The first polynomial operand
- list
*polyn2* - The second polynomial operand

**::math::polynomials::multPolyn***polyn1**polyn2*- Return a new polynomial which is the product of the two others. If one of the arguments is a scalar value, the other polynomial is simply scaled.

- list
*polyn1* - The first polynomial operand or a scalar
- list
*polyn2* - The second polynomial operand or a scalar

**::math::polynomials::divPolyn***polyn1**polyn2*- Divide the first polynomial by the second polynomial and return the result. The remainder is dropped

- list
*polyn1* - The first polynomial operand
- list
*polyn2* - The second polynomial operand

**::math::polynomials::remainderPolyn***polyn1**polyn2*- Divide the first polynomial by the second polynomial and return the remainder.

- list
*polyn1* - The first polynomial operand
- list
*polyn2* - The second polynomial operand

**::math::polynomials::derivPolyn***polyn*- Differentiate the polynomial and return the result.

- list
*polyn* - The polynomial to be differentiated

**::math::polynomials::primitivePolyn***polyn*- Integrate the polynomial and return the result. The integration constant is set to zero.

- list
*polyn* - The polynomial to be integrated

**::math::polynomials::degreePolyn***polyn*- Return the degree of the polynomial.

- list
*polyn* - The polynomial to be examined

**::math::polynomials::coeffPolyn***polyn**index*- Return the coefficient of the term of the index'th degree of the polynomial.

- list
*polyn* - The polynomial to be examined
- int
*index* - The degree of the term

**::math::polynomials::allCoeffsPolyn***polyn*- Return the coefficients of the polynomial (in ascending order).

- list
*polyn* - The polynomial in question

# REMARKS ON THE IMPLEMENTATION¶

The implementation for evaluating the polynomials at some point uses Horn's rule, which guarantees numerical stability and a minimum of arithmetic operations. To recognise that a polynomial definition is indeed a correct definition, it consists of a list of two elements: the keyword "POLYNOMIAL" and the list of coefficients in descending order. The latter makes it easier to implement Horner's rule.# BUGS, IDEAS, FEEDBACK¶

This document, and the package it describes, will undoubtedly contain bugs and other problems. Please report such in the category*math :: polynomials*of the

*Tcllib Trackers*[http://core.tcl.tk/tcllib/reportlist]. Please also report any ideas for enhancements you may have for either package and/or documentation.

When proposing code changes, please provide *unified diffs*,
i.e the output of **diff -u**.

Note further that *attachments* are strongly preferred over
inlined patches. Attachments can be made by going to the **Edit** form of
the ticket immediately after its creation, and then using the left-most
button in the secondary navigation bar.

# KEYWORDS¶

math, polynomial functions# CATEGORY¶

Mathematics# COPYRIGHT¶

Copyright (c) 2004 Arjen Markus <arjenmarkus@users.sourceforge.net>

1.0.1 | tcllib |