How do I rewrite ln9-3ln(squareroot 3) + ln81 in the form kln3?

AI Thread Summary
To rewrite ln(9) - 3ln(√3) + ln(81) in the form kln(3), the properties of logarithms are essential. The expression can be simplified using the exponent rule and the sum rule of logarithms. By recognizing that ln(√3) equals (1/2)ln(3) and combining the terms, the final result is ln(3^(9/2)), which simplifies to (9/2)ln(3). This process highlights the importance of recalling logarithmic properties when solving such problems. The discussion emphasizes the value of reviewing foundational concepts in mathematics for better understanding.
phy
i need help with this one question; we have to write ln9-3ln(squareroot 3) + ln81 in the form kln3 where k is an exact fraction; i don't remember how to do this at all so any help would be greatly appreciated; thanks
 
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Remember the general rule : ln(a^(b))=b*ln(a)
 
so i could rewrite it as 2ln3-3ln(sqrt3)+4ln3; but then what?
 
Remember that taking the square root is the same as raising to the 1/2 power. You may also want to combine the logs before making the exponents into the coefficients. Do you remember your log properties?
 
um, not really
 
Use Moose352 suggestion of sqrt(3)=3^(1/2). You will now have ln(3) as a common factor.
 
so would the answer just be 4(4/3)ln3?
 
How did you get the 1/3 denominator?
 
well i said that 3ln(sqrt3) is the same as 3ln(3^1/2) which is the same as 3/2(ln3)
 
  • #10
I'm with you there, that's correct.
But it's 2 in the denominator not 3!
 
  • #11
yeah so don't we do 3*1/2 which is 3/2? i'll show you what I've done so far.
2ln3-3/2ln3+4ln3
(4ln3)(2ln3)/(3/2ln3)
4(4/3)ln3
 
  • #12
Allright, I see were you have mixed up:

Sum rule logarithm: ln(x)+ln(y)=ln(x*y)
This is not what you have done.
Exponent rule logarithms: ln(a^(b))=b*ln(a)

If you want to do it with the sum rule, write:

2ln(3)-3/2ln(3)+4ln(3)=ln(3^(2))+ln(1/(3^(3/2)))+ln(3^(4))=
ln(3^(2-3/2+4))=ln(3^(9/2))=9/2ln(3)

I'll check up on this thread tomorrow..
 
  • #13
ok i get it now; i see where i made my mistake. thanks a lot for your help :)
 
  • #14
A good advice:
When doing maths you are not too familiar with, keep the definitions right in front of you while you're working, until you don't need to look at them anymore.
 
  • #15
yeah, that is good advice; it's just that that was a review question from my calculus textbook, stuff that we learned in high school and haven't seen in some time; we were just expected to remember how to do it and i forgot; well, thanks for all your help
 

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