Question

How do you prove that `log 12 = log 3 + log 4` ?

Answer 1

See explanation...

Explanation:

Note that as a real valued function of real numbers `10^x` is one to one from `(-oo, oo)` onto `(0, oo)`, with inverse `log x` which is one to one from `(0, oo)` onto `(-oo, oo)`.

Now for any real values of `a`, `b`, we have:

`10^(a+b) = 10^a * 10^b`

So:

`log 12 = log (3 * 4)`

`color(white)(log 12) = log (10^(log 3) * 10^(log 4))`

`color(white)(log 12) = log (10^(log 3 + log 4))`

`color(white)(log 12) = log 3 + log 4`

Answer 2

Below referred....

Explanation:

Let's ,

`log_(10)12=x`
`=>10^x=12" "......(1)`[all base is 10]

Next, let's

`log_(10)3=m`
`=>10^m=3" ".......(2)`

and,

`log_(10)4=n`
`=>10^n=4" "........(3)`

From `(1),(2),(3)`,

`12=3×4`
`=>10^x=10^m×10^n`
`=>10^x=10^(m+n)`
`=>x=m+n`
`=>log12=log3+log4` (proved)