How To Calculate Any Square Root

MindYourDecisions

18 Nov 202413:33

Summary

TLDRThis video explores the ancient Babylonian method for approximating square roots, a technique so precise it’s still used in modern computing. The Babylonians utilized a base 60 number system and developed an efficient algorithm for calculating square roots through simple iterative steps. By starting with the closest perfect square and making small adjustments, they achieved remarkable accuracy. The script covers practical examples, such as approximating the square roots of numbers like 17 and 69, and delves into the historical significance of this method, showing how it has endured for thousands of years in both ancient civilizations and modern algorithms.

Takeaways

😀 Ancient civilizations, like the Babylonians, computed square roots by hand long before modern calculators were invented.
😀 The Babylonians used a base-60 number system, which still influences our timekeeping system today (e.g., 60 minutes in an hour).
😀 The Babylonian clay tablet is an important mathematical text that reveals how they approximated square roots using an efficient algorithm.
😀 The Babylonians' square root approximation method is still used by modern computers and can be easily learned.
😀 To approximate the square root of a number, the Babylonians began by finding the closest square number.
😀 The method involves making adjustments using fractions, based on the difference between the number and the square number, divided by twice the square root estimate.
😀 The Babylonian method can quickly lead to accurate results, often within just one or two iterations.
😀 Examples of using this method include calculating the square root of 17 (approx. 4.125) and 69 (approx. 8.312).
😀 Even when the initial estimate is not perfect, the Babylonian algorithm works by refining the guess through further iterations.
😀 The algorithm for calculating square roots is visually explained through geometric principles, showcasing its efficiency and logic.

Q & A

What mathematical concept were the Babylonians computing thousands of years ago?
-The Babylonians were computing square roots by hand, using a technique that is remarkably similar to modern algorithms used for square root calculations.
What was the Babylonian number system based on?
-The Babylonian number system was based on base 60, which has left a legacy in modern timekeeping, such as the 60 minutes in an hour.
How did the Babylonians represent numbers?
-The Babylonians represented numbers using cuneiform numerals, which were inscribed on clay tablets.
What was the Babylonian method for calculating square roots based on?
-The Babylonian method for calculating square roots was based on finding the closest square number and adjusting the estimate with a simple fraction.
How accurate was the Babylonian approximation of the square root of 2?
-The Babylonian approximation for the square root of 2 was accurate to five decimal places, which is remarkable considering the technology of the time.
What is the basic idea behind the Babylonian method for computing square roots?
-The method involves starting with an initial guess (typically the closest square number), calculating the difference from the target number, and adjusting the guess using a fraction based on that difference.
Can the Babylonian method for square roots work with negative adjustments?
-Yes, the method works even with negative adjustments. For example, when estimating the square root of 23, a negative numerator was used, yet the estimate remained accurate.
What happens when you refine the Babylonian method over multiple iterations?
-Refining the estimate over multiple iterations leads to increasingly accurate results. For instance, applying the method to the square root of 2, the approximation becomes accurate to five decimal places after three iterations.
What is the formula behind the Babylonian algorithm for square roots?
-The formula for the Babylonian method is: sqrt(s) ≈ a + (b / 2a), where 'a' is the closest square number, and 'b' is the difference between the number and the square of 'a'.
Why is the Babylonian square root method geometrically intuitive?
-The method is geometrically intuitive because it visualizes the difference in areas between two squares, and uses that difference to adjust the initial estimate. The adjustment is proportional to the difference between the squares, which simplifies the calculation.