Properties of logarithms

The three main properties of logarithms are the product property, the quotient property, and the power property.

The table below will help you understand the properties of logarithms quickly.

Now, what do you notice about the following pairs of statements?

log 2 + log 3 and log (2 x 3)

log 4 + log 5 and log (4 x 5)

Here is what we notice about them.

log 2 + log 3 = 0.301 + 0.477 = 0.778 and 0.778 = log (6) = log (2 x 3)

Therefore, log 2 + log 3 = log (2 x 3)

By the same token,

log 4 + log 5 = 0.602 + 0.699 = 1.301 and 1.301 = log (20) = log (4 x 5)

Therefore, log 4 + log 5 = log (4 x 5)

Second, what do you notice about the following pairs of statements?

log (10 / 5) and log 10 - log 5

log (8 / 2)  and log 8 - log 2

Here is what we notice about them.

log 8 - log 2 = 0.903 - 0.301 = 0.602 and 0.602 = log (4) = log (8 / 2)

Therefore, log 8 - log 2 = log (8 / 2)

By the same token,

log 10 - log 5 = 1 - 0.699 = 0.301 and 0.301 = log (2) = log (10 / 5)

Therefore, log 10 - log 5 = log (10 / 5)

Finally, what do you notice about the following pairs of statements?

log (2³) and 3 x log 2

log (3²) and 2 x log 3

Here is what we notice about them.

log (2³) = log 8 = 0.903

3 x log 2 = 3 x 0.301 = 0.903

Therefore, log (2³) = 3 x log 2

log (3²) = log 9 = 0.954

2 x log 3 = 3 x 0.477 = 0.954

log (3²) = 2 x log 3

Other properties of logarithms

Equality property: 

If log_b M = log_b N, then M = N

Change of base property: 

log_b M = (log_a M) / log_a b 

Others

log_b b = 1

log_b 1 = 0

log_b b^M = M