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Expi

Expi is not a single, officially defined term in mathematics or science, but in informal usage it is often seen as a shorthand for the complex exponential function evaluated at an imaginary argument, written as exp(i). The exponential function exp(z) is defined for all complex numbers z as e^z.

In mathematics, exp(iθ) is described by Euler's formula: exp(iθ) = cos θ + i sin θ, for any real θ. When

The exact string "expi" is not a standard mathematical symbol. Proper notation typically uses exp(i) or e^i

Applications of complex exponentials are widespread. They underpin Euler’s formula, enable compact representations of oscillatory functions,

θ
=
1
(radian),
exp(i)
equals
cos(1)
+
i
sin(1),
which
is
approximately
0.540302
+
0.841471
i.
The
magnitude
of
exp(i)
is
1,
and
its
argument
is
1
radian,
placing
it
on
the
unit
circle
in
the
complex
plane.
rather
than
a
combined
word.
In
plain-text
notes,
some
writers
may
temporarily
use
"expi"
to
mean
exp(i),
but
this
is
not
universal
and
can
cause
ambiguity.
When
clarity
is
required,
it
is
best
to
write
exp(i)
or
e^i.
and
appear
in
Fourier
analysis,
signal
processing,
quantum
mechanics,
and
control
theory.
Expressions
such
as
e^{iωt}
model
rotating
phasors
and
propagating
waves,
illustrating
how
exponential
and
trigonometric
forms
are
interconnected
in
the
complex
plane.