How do you solve this logarithm?

ln (3x)- ln 2=4

1 Answer
Jim G.
Nov 26, 2016

x=2/3e^4

Explanation:

Use the following color(blue)"laws of logarithms"

color(red)(bar(ul(|color(white)(2/2)color(black)(logx-logy=log(x/y))color(white)(2/2)|)))
This law applies to logarithms in any base.

rArrln(3x)-ln2=ln((3x)/2)

color(orange)"Reminder " color(red)(bar(ul(|color(white)(2/2)color(black)(log_b x=nhArrx=b^n)color(white)(2/2)|)))

Now the natural log of x, written lnx=log_e x

rArrln(3x)-ln2=4

can be expressed as

ln_e((3x)/2)=4rArr(3x)/2=e^4

multiply by 2 and divide by 3

rArrx=2/3e^4

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