Raising a Small Number to a Power: (0.01)^4 as a Decimal
When working with small numbers and exponents, it's essential to understand how to calculate the result accurately. In this article, we'll explore the calculation of (0.01)^4 as a decimal.
What is (0.01)^4?
To calculate (0.01)^4, we need to raise 0.01 to the power of 4. This means multiplying 0.01 by itself four times:
(0.01) × (0.01) × (0.01) × (0.01)
Calculating the Result
To calculate the result, we can start by multiplying 0.01 by itself:
(0.01) × (0.01) = 0.0001
Then, we multiply the result by 0.01 again:
0.0001 × (0.01) = 0.000001
Finally, we multiply the result by 0.01 once more:
0.000001 × (0.01) = 0.00000001
(0.01)^4 as a Decimal
Therefore, (0.01)^4 as a decimal is equal to:
0.00000001
This result shows that raising a small number like 0.01 to a power of 4 results in an even smaller number. Understanding how to calculate exponents accurately is crucial in various mathematical and real-world applications.