Question

How do you evaluate `log_25 5`?

Answer 1

We have

`log_25 5=log5/(log25)=log5/(log5^2)=log5/(2*log5)=cancellog5/(2*cancellog5)=1/2`

Answer 2

`log_25 5 = 1/2`

Explanation:

You can find the answer by inspection if you understand what question is being asked when you are working in log form.

`log_color(red)(10) color(blue)(100)` asks the question........,

`" What power of "color(red)(10)" will give the number " color(blue)(100)`?"

The answer is obviously 2. Because `10^2 = 100`

`:. log_10 100 = 2 and log_10 1000 = 3`

Can you see that in the same way....

`log_3 27 = 3, and log_5 125 = 3 and log_8 64 = 2 ?`

A square root can also be written as an index.

`sqrtx = x^(1/2) " " and " " sqrt49 = 49^(1/2) =7`

`log_25 5 " asks the question 'what power of 25 will give 5'? "`

As 5 is the square root of 25, the index we need is `1/2`

`log_25 5 = 1/2`

Can you answer these as well?

`log_36 6 ," " log_81 3, " " log_32 2`

`1/2 " " 1/4, " " 1/5`