Using logarithm table evaluate 0.085^3
Using a logarithm table, we need to find the logarithm of 0.085 first.
The logarithm of 0.085 is -1.0702 (approximately), as shown in the logarithm table.
Now, we need to multiply this logarithm by 3 because we want to evaluate 0.085^3.
-1.0702 * 3 = -3.2106 (approximately)
Finally, we need to take the antilogarithm (or exponentiation) of -3.2106 to find the value of 0.085^3.
The antilogarithm of -3.2106 is approximately 0.0006315.
Therefore, 0.085^3 is approximately equal to 0.0006315.
To evaluate 0.085^3 using a logarithm table, follow these steps:
1. Take the logarithm of 0.085 to the base 10. This can be denoted as log10(0.085).
2. Look up the value of log10(0.085) in the logarithm table. Let's assume that the value is -1.070.
3. Multiply the value obtained in step 2 by 3. -1.070 * 3 = -3.210.
4. Take the antilogarithm of the result obtained in step 3. The antilogarithm of -3.210 to the base 10 is 10^-3.210.
5. Calculate the value of 10^-3.210 using the logarithm table. Let's assume the value is 0.00060.
6. Therefore, 0.085^3 is approximately equal to 0.00060.