<Dl> <Dd> <Dl> <Dd> log ⁡ (F 1 / F 0) = m log ⁡ (x 1 / x 0) = log ⁡ ((x 1 / x 0) m). (\ displaystyle \ log (F_ (1) / F_ (0)) = m \ log (x_ (1) / x_ (0)) = \ log ((x_ (1) / x_ (0)) ^ (m)). \,) </Dd> </Dl> </Dd> </Dl> <Dd> <Dl> <Dd> log ⁡ (F 1 / F 0) = m log ⁡ (x 1 / x 0) = log ⁡ ((x 1 / x 0) m). (\ displaystyle \ log (F_ (1) / F_ (0)) = m \ log (x_ (1) / x_ (0)) = \ log ((x_ (1) / x_ (0)) ^ (m)). \,) </Dd> </Dl> </Dd> <Dl> <Dd> log ⁡ (F 1 / F 0) = m log ⁡ (x 1 / x 0) = log ⁡ ((x 1 / x 0) m). (\ displaystyle \ log (F_ (1) / F_ (0)) = m \ log (x_ (1) / x_ (0)) = \ log ((x_ (1) / x_ (0)) ^ (m)). \,) </Dd> </Dl> <Dd> log ⁡ (F 1 / F 0) = m log ⁡ (x 1 / x 0) = log ⁡ ((x 1 / x 0) m). (\ displaystyle \ log (F_ (1) / F_ (0)) = m \ log (x_ (1) / x_ (0)) = \ log ((x_ (1) / x_ (0)) ^ (m)). \,) </Dd>

Which logarithmic graph can be used to approximate the value of y in the equation 3^y = 4