Question

How do you solve `Log(2x+1)=6+log(x-1)`?

Answer 1

Since the logs are in a common base we can put all logs to one side an simplify by using the logarithm law `log_an - log_am = log_a(n/m)`

Explanation:

`log(2x + 1) - log(x - 1) = 6`

`log((2x + 1)/(x - 1)) = 6`

Since nothing is noted in subscript, the log is in base 10.

`10^6 = ((2x + 1)/(x - 1))`

`1 000 000(x - 1) = 2x + 1`

`1 000 000x - 1 000 000 = 2x + 1`

`999 998x = 1 000 001`

`x = (1000001/(999 998))`

Your teacher may want you to keep the answer in fractional form, but he/she may want it rounded off, so keep that in mind.

Practice exercises:

1. Solve for x. Leave answers in exact form.

a) `log_7x = 3`

b) `log_3(x + 1) =5 - log_3(4x^2 - 4)`

Good luck!