Question

How do you evaluate `\log \sqrt{7\times 5\times 2}`?

Answer 1

`= 1/2 ( 1 + log 7 ) approx 0.923`

Explanation:

We must use our log laws:

`alpha log beta = log beta ^ alpha`
`log gamma + log delta = log gamma delta`
`log_alpha alpha = 1`

So hence:

`log sqrt( 7*5*2) = 1/2 log 7*5*2`

`=>1/2 log 7 * 10`

Now using another one of our laws:

`=> 1/2( log 7 + log 10 )`

`=> 1/2 ( log 7+ 1 )`

`approx 0.923`

Answer 2

`log sqrt(7 xx 5 xx 2) = 1/2 log 7 + 1/2 ~~ 0.922549`

Explanation:

Note that:

`log sqrt(7xx5xx2) = log (7xx10)^(1/2)`

`color(white)(log sqrt(7xx5xx2)) = 1/2 log (7xx10)`

`color(white)(log sqrt(7xx5xx2)) = 1/2 (log 7 + log 10)`

`color(white)(log sqrt(7xx5xx2)) = 1/2 (log 7 + 1)`

`color(white)(log sqrt(7xx5xx2)) = 1/2 log 7 + 1/2`

What about `log 7` ?

We could go to a log table or calculator to find:

`log 7 ~~ 0.84509804`

Suppose we do not have access to that, but do know a few standard values:

`ln(10) ~~ 2.302585093`

`log(2) ~~ 0.30103`

and we know:

`ln(1+t) = t - t^2/2 + t^3/3 - t^4/4 +...`

Then note that:

`2 log 7 = log 7^2`

`color(white)(2 log 7) = log 49`

`color(white)(2 log 7) = log (100/2 * 49/50)`

`color(white)(2 log 7) = log 100 - log 2 + log (1 - 1/50)`

`color(white)(2 log 7) = 2 - log 2 + ln (1 - 1/50) / ln 10`

`color(white)(2 log 7) = 2 - log 2 - 1/ln 10 (1/50+1/(2 * 50^2) + 1/(3 * 50^3)+...)`

`color(white)(2 log 7) ~~ 2 - 0.30103 - 1/2.302585093 (1/50+1/5000 + 1/375000) ~~ 1.690196`

So:

`1/2 log 7+1/2 ~~ 1.690196/4+0.5 = 0.922549`