Magnitude: Difference between revisions
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</source>{{Works in|[[Dyalog APL]]}} | </source>{{Works in|[[Dyalog APL]]}} | ||
== See also == | |||
* [[Circular]] | |||
* [[Negate]] | |||
* [[Conjugate]] | |||
== External links == | == External links == | ||
Revision as of 06:53, 9 July 2020
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Magnitude (|), or Absolute Value, is a monadic scalar function which gives the absolute value of a real or complex number. Magnitude shares the glyph | with the dyadic arithmetic function Residue.
Examples
|0 1 2 ¯1 ¯2
0 1 2 1 2
|0J2 ¯3J¯4
2 5
Properties
The magnitude of any number is a non-negative real number.
For real numbers, the magnitude equals the original number times (or divided by, for non-zero numbers) its sign.
v←0 1E¯100 20 1E300 ¯1E¯100 ¯20 ¯1E300
(|v)≡v××v
1
(|v)=v÷×v
0 1 1 1 1 1 1
For complex numbers, the magnitude is defined as the Euclidean distance from the number 0 on the complex plane.
Dist←{0.5*⍨+.×⍨9 11○⍵} ⍝ Square root of square sum of real and imaginary parts
Dist¨ 0 1J2 ¯3J4
0 2.236067977 5
|0 1J2 ¯3J4
0 2.236067977 5Works in: Dyalog APL
Any real or complex number is equal to the product of its signum and magnitude.
(⊢ ≡ ××|) 0 1 1E¯300 ¯2.5 0J3.5 ¯3J¯4 1
Works in: Dyalog APL