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logaritmica

Logaritmica refers to the concept and study of logarithms and logarithmic functions. A logarithm is the exponent to which a fixed base must be raised to yield a given positive number. For a base b > 0, b ≠ 1, the logarithm of x is log_b(x) = y if b^y = x. The base 10 logarithm is known as the common logarithm, the base e logarithm as the natural logarithm (written ln), and the base 2 logarithm as the binary logarithm.

Key laws express how logarithms interact with multiplication, division, and powers: log_b(xy) = log_b(x) + log_b(y); log_b(x^k) = k

Logarithms are the inverse functions of the corresponding exponential functions b^x, which makes them useful for

Calculus and analysis: the derivative d/dx log_b(x) = 1 / (x ln b), and the integral ∫(1/x) dx =

Applications span data transformation and normalization, pH and decibel scales, the Richter scale for earthquakes, and

log_b(x);
log_b(x/y)
=
log_b(x)
-
log_b(y).
Change
of
base
is
log_b(x)
=
log_k(x)
/
log_k(b)
for
any
positive
base
k
≠
1.
solving
equations
where
the
unknown
appears
as
an
exponent.
The
domain
of
log_b(x)
is
x
>
0,
and
the
base
must
satisfy
b
>
0,
b
≠
1.
ln|x|
+
C.
Graphically,
log_b(x)
is
increasing
if
b
>
1
and
decreasing
if
0
<
b
<
1;
it
has
a
vertical
asymptote
at
x
=
0
and
passes
through
(1,
0).
information
measures
where
log
base
2
yields
quantities
in
bits.
The
concept
originated
in
the
17th
century
with
Napier
and
Briggs
and
later
became
central
to
mathematical
analysis
through
the
constant
e.