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Log20log3

Log20log3 is not a standard mathematical symbol, and its meaning is ambiguous without additional context. In many informal writings it is read as the product of two logarithms: log(20) times log(3), where the base is implied by convention.

If the base is 10 (common logarithms), log10(20) ≈ 1.30103 and log10(3) ≈ 0.477121. Their product is approximately

A different interpretation arises if the expression is intended as a nested logarithm, such as log_20(log_3(x)).

Because of these ambiguities, precise notation is important. To avoid confusion, one should specify the base

0.6207487.
If
the
base
is
e
(natural
logarithms),
ln(20)
≈
2.99573
and
ln(3)
≈
1.09861,
giving
a
product
of
about
3.289.
More
generally,
for
any
base
b,
log_b(20)
·
log_b(3)
=
(ln
20
·
ln
3)
/
(ln
b)^2.
In
that
form,
an
inner
argument
x
is
required;
without
it
the
expression
is
incomplete.
For
example,
with
x
=
10,
log_3(10)
is
a
finite
number,
and
then
one
can
take
log_20
of
that
result.
Without
a
specified
argument,
however,
the
value
cannot
be
determined.
of
the
logarithms
and
whether
the
expression
represents
a
product
or
a
composition,
for
example
log_10(20)
·
log_10(3)
or
log_20(log_3(x)).
See
also
fundamental
logarithm
properties
and
base
change.