Using logarithm table evaluate e4√0.007

1 answer

In order to evaluate e^4√0.007 using a logarithm table, we can follow these steps:

1. Take the natural logarithm of both sides:
ln(e^4√0.007) = ln(x)

2. Apply the logarithm rule for exponents:
(4√0.007) ln(e) = ln(x)

3. Evaluate the natural logarithm of e:
(4√0.007) * 1 = ln(x)

4. Simplify the expression:
(4√0.007) = ln(x)

5. Use the logarithm table to find the logarithm value for (4√0.007). Locate 0.007 in the table and find its corresponding logarithm value. Then, multiply it by 4 and take the square root.

6. Once you have the value of (4√0.007) from the logarithm table, substitute it back into the equation:
(4√0.007) = ln(x)

It is important to note that using a logarithm table may not be the most efficient way to evaluate this expression. It is recommended to use a calculator or a computer software to get a more accurate and precise result.