LOG fractions: Let Log 2=a, log 3=b & log 5=c, express the log terms in a,b & c

[helpmepls!]

LOG fractions: Let Log 2=a, log 3=b & log 5=c, express the log terms in a,b & c

the problem is Log 6/25 (its a fraction, idk how to do those on here). I got the answer but then I was told it is wrong because the question actually is..

"Let Log 2=a, log 3=b & log 5=c, express the log terms in a,b & c" how do I go about that? Thank You!

 

[ksdhart2]

What are your thoughts? What have you tried? Please comply with the rules as laid out in the Read Before Posting thread that's stickied at the top of each sub-forum, and share with us any and all work you've done on this problem, even the parts you know for sure are wrong. Thank you.

As a hint, you may want to review the rules of logarithmshttp://www.rapidtables.com/math/algebra/Logarithm.htm, in particular noting that log(a/b) = log(a) - log(b) and log(ab) = log(a) + log(b).

 

[helpmepls!]

so far all I got is Log 6/25 is equal to log(6)-log(25). Log(25) converts to 2log(5). Log 6 isn't found with a power so I just left it as it. So now I have Log(6)-2Log(5), which would convert to Log(6)-2(c). I don't know if that's the correct answer, but so far I just have the C

 

[HallsofIvy]

Surely you know that 6= 2*3???

 

[helpmepls!]

It doesn't have to be in power form??

 

[stapel]

It doesn't have to be in power form??

Try using the product rule for logs, instead of only the power rule for logs.

 

[mmm4444bot]

It doesn't have to be in power form??

If by "It" you're talking about 6, then no. The 6 does not need to be written as a power.

It would be handy to write 6 as a product. Then you would have:

log(2*3) - 2*log(5)

Earlier, you were told that this property would be useful:

log(a*b) = log(a) + log(b)

Try applying this property to log(2*3), and see what happens. :cool: