Question

How do you solve for x in `log_2x-log_2 3=5`?

Answer 1

`x=96`

Explanation:

Let's first combine the left side, using the rule that `log_x(a)-log_x(b)=log_x(a/b)`:

`log_2(x)-log_2(3)=5`

`log_2(x/3)=5`

We can now set these as exponents to a base of 2 (to eliminate the log):

`2^(log_2(x/3))=2^5`

On the left side, this has the effect of taking the inverse function of the log and so cancels out, leaving:

`x/3=32`

`x=96`

And now let's check it:

`log_2(96)-log_2(3)=5=>6.585-1.585=5`

(the logs are rounded to 3 decimal places)