Question

What is the value of log625^5

Answer 1

Answer with explanation:

We have to find the value of :

`\rightarrow\log 625^5\\\\\rightarrow 5 \log625\\\\\rightarrow 5 \log 5^4\\\\\rightarrow 4 * 5 \log 5\\\\ \rightarrow 20 \log 5\\\\\rightarrow 20 * 0.69897\\\\ \rightarrow 13.9794\\\\=13.98\\\\ \text{Used following properties of log}\\\\ \log a^b=b \log a`

Answer 2

Value of log625^5 is 13.95

Explanation:

We need to find the value of log625^5

Using log rule log a^n = nloga

log625^5

= 5log625

=5(2.79)

=13.95

So, value of log625^5 is 13.95