How do you solve ${log}_{121} 44 = x$ $log_(121)44 = x$ ?

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How do you solve ${log}_{121} 44 = x$ $log_(121)44 = x$ ?

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Answer 1 · 2015-12-07T10:21:53

I found: $x = 0.789$ $x=0.789$

Explanation:

We can write (using the definition of log):
$44 = 121^{x}$ $44=121^x$
then
$11 \cdot 4 = 11^{2 x}$ $11*4=11^(2x)$
taking $11$ $11$ to the right:
$4 = \frac{11^{2 x}}{11}$ $4=11^(2x)/11$
using the property of the quotient of exponents with the same base:
$4 = 11^{2 x - 1}$ $4=11^(2x-1)$
now we can take the natural log of both sides:
$ln (4) = ln (11^{2 x - 1})$ $ln(4)=ln(11^(2x-1))$
we can now use the property of the logs:
${log x}^{a} = a log x$ $logx^a=alogx$
to get:
$ln 4 = (2 x - 1) \cdot ln 11$ $ln4=(2x-1)*ln11$
so that:
$2 x - 1 = \frac{ln (4)}{ln (11)}$ $2x-1=ln(4)/ln(11)$
rearranging:
$x = \frac{1}{2} [\frac{ln (4)}{ln (11)} + 1] = 0.789$ $x=1/2[ln(4)/ln(11)+1]=0.789$

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How do you solve ${log}_{121} 44 = x$ $log_(121)44 = x$ ?

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