Imaginary number: Difference between revisions
imported>Peter Schmitt (expanding remark on literal meaning) |
imported>Peter Schmitt (more formal description added) |
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and no mathematical or philosophical conclusions may be drawn from them. | and no mathematical or philosophical conclusions may be drawn from them. | ||
== Numbers: complex, real and imaginary == | |||
Every complex number is the real linear combination of the '''real unit''' | |||
: <math> 1 \quad ( 1 \cdot 1 = 1 ) </math> | |||
and the '''imaginary unit''' | |||
: <math> \textrm i \quad ( \textrm i \cdot \textrm i = -1 ) </math> | |||
that is, a complex number can uniquely be written as | |||
: <math> a \cdot 1 + b \cdot \textrm i \qquad ( a,b \in \mathbb R ) </math> | |||
In this expression, the real number | |||
''a'' is called the '''real''' part and the real number ''b'' the '''imaginary''' part | |||
of the '''complex number''' ''a''+''b''i. | |||
While (real) multiples of 1 | |||
(i.e., complex numbera with imaginary part 0) | |||
are (identified with) the real numbers: | |||
: <math> a \cdot 1 + 0 \cdot \textrm i = a \cdot 1 = a \in \mathbb R </math> | |||
the (real) multiples of i | |||
(i.e., complex numbers with real part 0) | |||
: <math> 0 \cdot 1 + b \cdot \textrm i = b \cdot \mathrm i \in \mathrm i \mathbb R </math> | |||
are the '''imaginary''' numbers, or '''pure imaginary''' numbers, depending on usage. |
Revision as of 20:48, 31 December 2009
The imaginary numbers are a part of the complex numbers. Every complex number can be written as the sum a+bi of a real number a and an imaginary number bi (with real numbers a and b, and the imaginary unit i). In the complex plane the imaginary numbers lie on the imaginary axes. perpendicular to the real axes,
However, sometimes the term "imaginary" is used more generally for all non-real complex numbers, i.e., all numbers with non-vanishing imaginary part (b not 0), are called "imaginary". In this case, the more specific complex numbers bi (with vanishing real part a=0) are called pure(ly) imaginary.
Remark:
The names "imaginary" and "complex" number are of historical origin,
just as the other names for numbers
— "rational", "irrational", and "real" — are.
Thus they must not be interpreted literally,
and no mathematical or philosophical conclusions may be drawn from them.
Numbers: complex, real and imaginary
Every complex number is the real linear combination of the real unit
and the imaginary unit
that is, a complex number can uniquely be written as
In this expression, the real number a is called the real part and the real number b the imaginary part of the complex number a+bi.
While (real) multiples of 1 (i.e., complex numbera with imaginary part 0) are (identified with) the real numbers:
the (real) multiples of i (i.e., complex numbers with real part 0)
are the imaginary numbers, or pure imaginary numbers, depending on usage.