Heron’s Method of Finding Roots

Today I’m sharing a guest post written by one of the most talented QuickerMaths.com follower Nandeesh H.N. from Kolkata. I’m quoting from his email which he has sent to get his article uploaded on QuickerMaths.com. I’m very thankful to him for sharing such a wonderful method of squaring numbers.

“Dear Vineet,

I am really grateful to you for your blog which makes Mathematics a pleasure. Keep up your good work. As requested by you I am sending a brief note on Heron’s method of finding square root. This method can be easily extended to find any root.

Finding Square Root by Heron’s Method

If n is the square root of N, obviously, dividing N by n gives n.

We can look at the square root as the average of the factor and the quotient.

If you divide N by a number x which is not the square root, you will get the quotient different from the square root.

However the average of the factor and the quotient is closer to the actual root than the starting number x.

This is the principle of Heron’s method of finding square root of a number.

Ex: To find the square root of 500:

Let us guess that the square root is 20.

Divide 500 by 20 to get the quotient 25.

Take the average of the factor 20 and the quotient 25 which is 22.5.

This 22.5 is closer to the actual root of 500 than the initial estimate of 20.

Repeating the above process:

500/22.5 = 22.2222

Average of 22.5 and 22.2222 is 22.3611.

For more accuracy, we can repeat the step once again to get the next estimate as 22.36068.

The actual square root of 500 is 22.36068.

I love to extend this Heron’s method for finding any root of any number.

For finding cube root, divide twice and take the average of the two divisors and the final quotient.

For finding fourth root, divide thrice and take the average of the three divisors and the final quotient.

Ex: To find the cube root of say 78654.

Let the initial guess be 40.

Step 1: 78654 / 40 = 1966.35

Step 2: 1966.35 / 40 = 49.15875

The average of 40, 40 and 49.15875 is 43.05292.

You can repeat the above process with the starting number as 43 (No need to start with 43.05292).

Actual cube root of 78654 is 42.84567.

Even if you start with a very wild initial guess, you will only need a few more iterations to reach the answer.

Ex: To find the fourth root of say 78654.

Let the initial guess be 20.

Step 1: 78654 / 20 = 3932

Step 2: 3932 / 20 = 196

Step 3: 196 / 20 = 10

The average of 20, 20, 20 and 10 is 17.5.

Repeat the above process with the starting number as say 17.

Step 1: 78654 / 17 = 4627

Step 2: 4627 / 17 = 272

Step 3: 272 / 17 = 16

The average of 17, 17, 17 and 16 is 16.75.

Actual 4th root of 78654 is 16.74674.

Ex: To find the fifth root of say 78654.

Let the initial guess be 10.

Step 1: 78654 / 10 = 7865.4

Step 2: 7865.4 / 10 = 786.54

Step 3: 786.54 / 10 = 78.654

Step 4: 78.654 / 10 = 7.8654

The average of 10, 10, 10, 10 and 7.8654 is 9.5731.

Actual 5th root of 78654 is 9.531125.

Our first iteration itself is quite close to the actual root. Is it not great?

Tips: Start with a convenient round figure as the initial guess to make divisions easier. The next starting number can again be rounded or adjusted for easing future divisions.”

This post is contributed by Nandeesh Nagarajaia. He is a Chemical Engineer who did his B.Tech from NIT Suratkal.  He is now in IT field as Assistant General Manager(Systems) in Hindustan Copper Limited. He love Maths and enjoy teaching Maths to his sons.

You can also learn the shortcut of finding the cube root of a given number

Did you find this method interesting? If yes, say thanks to Nandeesh by posting a comment below.

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How to Quickly Find Square of Any Number Ending in 5

Finding square of any number with unit’s digit being 5 is the most common, yet very interesting trick of Vedic Maths.  Using this technique you can find the square of any number ending in 5 very easily.  Also explore a quick method of squaring numbers ending in 9. Given below is the step by step explanation of this Vedic Maths Method.

Let us take a 2 digit number in generic form, say the number is a5 (=10a+5), where a is the digit in ten’s place

Square of a5= a x (a+1) | 25

That means a is multiplied by the next higher number, i.e. (a+1). Now let’s take example of a real number ending in 5, say 45.

452 = Left hand side of the answer will be 4 multiplied by its successor i.e. 5 and the right hand side part will always be 25 for squares of numbers of which the unit’s digit is 5.

Giving the answer a x (a+1) | 25 ( |     stands for concatenation}

i.e. 4  x  (4+1) | 25 = 4 x 5 | 25 = 2025

Similarly we can proceed for 3 digit numbers ending in 5

Few more examples:

952=9 x 10 | 25 =9025

1252 = 12 x 13 | 25 = 15625

5052 = 50 x 51 | 25 = 255025

Test yourself

Find out the square of 85, 245, 145, 35, 15, and 95?

Answer: 7225, 60025, 21025, 1225, 225, 9025

Please let us know if you like this Vedic Maths trick

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