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Logarithmic

Logarithmic refers to logarithms, the inverse functions of exponentiation. For a base b > 0 with b ≠ 1, the logarithm of a positive number x is written log_b(x) and is defined by log_b(x) = y if and only if b^y = x. The natural logarithm uses base e and is denoted log_e(x) or ln(x).

Key identities follow from the laws of exponents. log_b(xy) = log_b x + log_b y, and log_b(x^k) = k

Calculus interacts with logarithms as well. The derivative of log_b x is 1/(x ln b). The integral

Behavior and graph. For base b > 1, log_b x is increasing; for 0 < b < 1, it

Applications and scales. Logarithms compress large ranges of values and underpin logarithmic scales used in science

log_b
x.
The
change
of
base
formula
is
log_b
x
=
log_k
x
/
log_k
b
for
any
positive
base
k
≠
1.
These
properties
allow
solving
exponential
equations
and
transforming
multiplicative
relationships
into
additive
ones.
∫
log_b
x
dx
=
x
log_b
x
−
x/ln
b
+
C.
The
natural
log
ln
x
has
the
series
expansion
ln(1+x)
=
x
−
x^2/2
+
x^3/3
−
…
for
-1
<
x
≤
1
(x
≠
-1).
is
decreasing.
The
graph
is
defined
on
x
>
0,
with
a
vertical
asymptote
at
x
=
0
and
a
point
(1,
0).
The
function
crosses
the
point
(e,
1)
when
b
=
e.
and
engineering,
such
as
pH,
decibels,
and
the
Richter
scale.
They
also
linearize
exponential
growth,
aiding
data
analysis,
modeling,
and
solving
equations
involving
exponential
functions.