Difference between revisions of "Factors Command"

Factors[ <Polynomial> ]

Returns list of lists {factor,exponent} such that product of all these factors raised to corresponding exponents equals the given polynomial.

Example:

Factors[x^8 - 1] yields {{x - 1, 1}, {x + 1, 1}, {x^2 + 1, 1}, {x^4 + 1, 1}}.

Note: Not all of the factors are irreducible over the reals.

Factors[ <Number> ]

Returns list of lists {prime, exponent} such that product of all these primes raised to corresponding exponents equals the given number. Primes are sorted in ascending order.

Example:

• Factors[1024] yields {{2, 10}}, because 1024 = 2¹⁰.
• Factors[42] yields {{2, 1}, {3, 1}, {7, 1}}, because 42 = 2¹ 3¹ 7¹.

CAS Syntax

Factors[ <Polynomial> ]

Returns list of lists {factor, exponent} such that product of all these factors raised to corresponding exponents equals the given polynomial.

Example:

Factors[x^8 - 1] yields {{x - 1, 1}, {x + 1, 1}, {x^2 + 1, 1}, {x^4 + 1, 1}}, displayed as \begin{pmatrix} x-1&1\\ x+1&1\\ x^2+1&1\\ x^4+1&1

\end{pmatrix}.

Note: Not all of the factors are irreducible over the reals.

Factors[ <Number> ]

Returns list of lists {prime, exponent} such that product of all these primes raised to corresponding exponents equals the given number. Primes are sorted in ascending order.

Example:

• Factors[1024] yields {{2, 10}}, displayed as \begin{pmatrix} 2&10 \end{pmatrix}, because 1024 = 2¹⁰.

  • Factors[42] yields {{2, 1}, {3, 1}, {7, 1}}, displayed as \begin{pmatrix} 2&1\\ 3&1\\ 7&1
    \end{pmatrix}, because 42 = 2¹ 3¹ 7¹.

Note: See also PrimeFactors Command and Factor Command.