How do you solve log_(121)44 = x?

1 Answer
GiĆ³
Dec 7, 2015

I found: x=0.789

Explanation:

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

Related questions
See all questions in Logarithmic Models
Impact of this question
1461 views around the world
You can reuse this answer
Creative Commons License