How To Find The Square Root of Large Numbers Mentally

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You can also add the digits of the numbers until you get one digit like if you add the digits of 13 you get 4. If you take the square of 13, it has to add to the same amount as 4x4. 4x4 is 16. 1+6 is 7. So the digits of the square of 13 also have to add to 7. The square of 13 is 169. Add the digits: 1+6+9=16, 1+6=7. So if you can’t tell by looking which is closer, add the digits of the numbers until you get one digit. Take the square and add the digits until you get one number. Look at your two choices and add their digits until you get one number and see which one matches.
Let’s say you’re deciding between 43 and 47. The number that is the square of one of these numbers is 2209. 2+2+0+9=13, 1+3=4. What’s the square root of 4? 2. So when you add the digits of the square root of 2209, it has to add to 2: 4+3=7 so it can’t be 43. 4+7=11, 1+1=2. It’s definitely 47.
The only time this doesn’t work is when you are choosing between multiples of 3. For example, 42 and 48. The digits of both their squares will add to 9. So you have to guess.
These one digit numbers that all numbers add down to are called digital roots. You can add the digits as I did or you can enter a number on a scientific calculator and hit mod 9 to get the digital root. These digits are also the remainders when you divide by 9.
Adding them and multiplying them is part of modular arithmetic.

as long as you only ever run into perfect squares you'll be golden

The big problem with your method is that it only works if you are sure that the given root has an integer solution. If you don't know this, you should use the approximation formula Sqrt(n² + a) ≈ n + a/(2n) and (n + 0.5)² = n * (n+1) + 0.25 for better squares between the squares of natural numbers.
*RULESET*
Given: Sqrt(x)
*(1) Remove redundant powers of 10*
If x > 1000: 10 * Sqrt(x/100)
If x > 100,000: 100 * Sqrt(x/10,000)
If x > 10 * 10^(2k): 10^k * Sqrt(x/10^(2k))
New Radikand: y = x/10^(2k)
Advantage: 10 < y < 1000
You only need Square numbers of 1 to 31.
*(2) Find the closest square number n*
Bonus: If the number is relatively centered between two square numbers n1 and n2, you can form the product of these and add 0.25 (n1 * n2 + 0.25) to use the square number (n1 + 0.5)².
*(3) Calculate the difference*
a = y - n²
*(4) Use approximation formula*
Sqrt(y) = Sqrt(n² + a) ≈ n + a/(2n)
-------------------------------------
Examples:
Sqrt(1156) = Sqrt(11.56 * 100) = 10 * Sqrt(11.56) = 10 * Sqrt(12.25 - 0.69) = 10 * Sqrt(3.5² - 0.69) ≈ 10 * (3.5 - 0.69/(2*3.5)) ≈ 10 * 3.4 = 34
Sqrt(2304) = Sqrt(23.04 * 100) = 10 * Sqrt(23.04) = 10 * Sqrt(25 - 1.96) = 10 * Sqrt(5² - 1.96) ≈ 10 * (5 - 1.96/(2*5)) = 10 * 4.8 = 48
Sqrt(4489) = Sqrt(44.89 * 100) = 10 * Sqrt(44.89) = 10 * Sqrt(42.25 + 2.64) = 10 * Sqrt(6.5² + 2.64) ≈ 10 * (6.5 + 2.64/(2*6.5)) ≈ 10 * 6.7 = 67
Sqrt(12996) = Sqrt(129.96 * 100) = 10 * Sqrt(129.96) = 10 * Sqrt(132.25 - 2.29) = 10 * Sqrt(11.5² - 2.29) ≈ 10 * (11.5 - 2.29/(2*11.5)) ≈ 10 * 11.4 = 114
Sqrt(24649) = Sqrt(246.49 * 100) = 10 * Sqrt(246.49) = 10 * Sqrt(240.25 + 6.24) = 10 * Sqrt(15.5² + 6.24) ≈ 10 * (15.5 + 6.24/(2*15.5)) ≈ 10 * 15.7 = 157
And for error estimation for the approximation formula you can use the following term:
Error = a²/(8n³)
With a < n:
Error < n²/(8n³) = 1/(8n)
-------------------------------------
Without the 0.5 formula:
Sqrt(1156) = Sqrt(11.56 * 100) = 10 * Sqrt(11.56) = 10 * Sqrt(9 + 2.56) = 10 * (3² + 2.56) ≈ 10 * (3 + 2.56/(2*3)) ≈ 10 * 3.4 = 34
Sqrt(4489) = Sqrt(44.89 * 100) = 10 * Sqrt(44.89) = 10 * Sqrt(49 - 4.11) = 10 * Sqrt(7² - 4.11) ≈ 10 * (7 - 4.11/(2*7)) ≈ 10 * 6.7 = 67
Sqrt(12996) = Sqrt(129.96 * 100) = 10 * Sqrt(129.96) = 10 * Sqrt(121 + 8.96) = 10 * Sqrt(11² + 8.96) ≈ 10 * (11 + 8.96/(2*11)) ≈ 10 * 11.4 = 114
Sqrt(24649) = Sqrt(246.49 * 100) = 10 * Sqrt(246.49) = 10 * Sqrt(256 - 9.51) = 10 * Sqrt(16² - 9.51) ≈ 10 * (16 - 9.51/(2*16)) ≈ 10 * 15.7 = 157

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Lovely teaching! Also instead of doing: For example on the square root of 2304:
its either 42 or 48 and instead of finding the square root of 40 and 50, you can find the square root of 45 which is in the middle of both numbers.
An easy way to work out how to square numbers ending in 5:
5 x 5 is *25,* then keep that.
for 45, you have done the 5 and you have 4 left.
Add one to that number then times both numbers: 4 times 5 which gives you *20.*
Put the numbers together in the order they were in:
4 5
20 25
Your answer is 2025
The original number was 2304 (The number that you had to work out the square root of) which is higher than 2025 so the answer has to be higher too. The answer is 48.
Sorry If I didnt explain well, I just think this is a helpful way to do it. It is a bit faster. :)

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There’s another way to do it, too. After determining the two possible digits in the ones column, ignore the last two digits, and find the nearest square below the remaining numbers and find the root. That’s the number for the tens column.
Multiply that number by the next number up. If the product is smaller than the number left of the ignored digits, pick the larger number for the ones column.

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An easier way to find the unit digit is to multiply the 10s digit by its next consecutive number. That is 3*4=12. Since 12 is larger than 11 you take the smaller digit 3. If 11 was larger than this product you would take the larger 6.

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This totally works for any digit number, you just need to expand the lines. Each starts one more digit to the right. The first line is digits right next to each other, the next is numbers one apart, the next 2 apart and so on until the last line is the first digit times the last digit. With a little practice, I was squaring a 6 digit number in under a minute.

There was a mistake in the 15^2 it is actually 225 for people who are confused or thought they remembered wrong but very good method overall!thanks for sharing

Let's use your last example - 24649
Now last digit or we say the digit at unit place is 9 so unit digit of sqrt. Of the given no. Should be either 3 or 7, now the nearest square of a no. is 225 which is equal or smaller than 246, so we take the sqrt of 225, i.e 15 now the desired answer could be either 153 or 157 for that we have to just multiply 15 by 16 i.e 240 (now we will check if 240 is smaller or equal to 246) 240

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There is also another method mentioned by Presh Talwalkar
While finding a root of a number by this method, you may get 2 numbers to decide on.
You can take the sqaure of the middle number which would be tge 5th term
For example: For root of 24649
You have 2 options: 153 or 157
Now you can take the sqaure of the middle term which would be 155.
There is a brilliant trick to find the square of a number ending in 5
Suppose 45 sqaured. Now leave the last digit which would be 5, so you have 4. Now multiply 4 with the number after itself, so: 4*5 which is 20. Now add 25 as the last 2 digits of the number so 45 squared is 2025

How did you get square root 9 and 16 from square root 11? This part confused me a lot.
For anyone who is confused, Square root 11 is between perfect square root of 9 and 16 . If it was square root of 30, it would be between perfect squares of 25 and 36.
All perfect squares are:
1
4
9
16
25
36
49
64
81
etc...

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A useful trick is that a square of #5 number is # x (# + 1) +25, eg 65 squared is 4225 so you quickly see if you go up or down.

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One more trick, that really should be here... Taking the example of the square root of 4489, rather than asking if this is closer to 60^2 or 70^2, we consider 65^2 = 60*70 + 25

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You could also use 25^2 45^2 or etc since its easy to calculate it like for example 45^2 = (4x5)x100 +25= 2025
So for example square root of 1764 since the last digit is 4 it could be either 42 or 48 but since its lower than 2025(45^2) then the answer is 42.
I don't know i just came up with this idea and i don't know if I'm right or wrong

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Additionally, as for the square root of 1156, it's either 34 or 36, knowing the square of 35 is 3*(3+1)+25 at the end i.e. 1225, therefore the solution for the square root of 1156 is smaller than 35, meaning 34. Similarly, for the square root of 2304, it's either 42 or 48, knowing the square of 45 is 4*(4+1)+25 at the end i.e. 2025, therefore the solution for the square root of 2304 is larger than 45, meaning 48.

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1:50 i found something wrong take a look at the 15² it says 215 but the correct one is actually 225

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MR. Organic Chemistry Tutor, thank you for another monster video/lecture on How to find the square root of large numbers mentally. This topic shows some mathematical tricks that all students should know in Mathematics. There are different methods for computing the square root of large numbers.

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I start with a series of easy guesses. 100^2=10000, too small. 200^2 = 40000, too large. 150^3 = 22500 too small but pretty close. Since the square must end in 9 the last digit must end in 3 or 7. So we are down to 153 or 157. Try 155, whose square is 24025, which is too small. So the answer is 157.

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4^2=16(approximately 20 ) , 6^2=36(approximately 40) , 14^2=196(approximately 200) , 16^2=256(approximately 300) and they all end in 6(approximately 10).

Thank you sir ,it is very easy now to calculate any large value of square root ....

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1156: wrong method. The fastest way is to see that 4 divides 1156 and since 1156/4=289 and we already know that 289=17², 1156=34². Destroyed.
2304: wrong method. We directly see that 2304=2500-200+4, which is the developed form of (50-2)² so 2304=48². Destroyed.
4489: right approach but you don't have the proof that this is a square. It's very easy to verify with a ittle trick: we know that 3x67=201. Let's substract 60x67=4020 to our number. We obtain 469. And 469=402+67=2x201+67=7x67. So we know that 4489=67². Destroyed.
12996: wrong method. Again we divide this by 4 and obtain 3249. Our suspect is 57 and we just develop (50+7)²=2500+700+49. So 12996=114². Destroyed.
24649: again, verifying that we have a square is quite easy. We know how to calculate quickly 155²=(15x16x100)+25=24025. Now to validate our candidate we develop (155+2)²=24025+620+4=24649. Easy. Destroyed.

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I'm learning from you, but I'm using my own math tricz as well,
√2304=42
6×6=9
50²=2500
Stop @ 5:17

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Explaining about squares...etc..
Me: 😐
After trying it to 1156.
Me: 🤯

So SR of 24,649 first part = 15 (15^2=225, 16^2=256). 246 closest to the larger. Digit roots of 49 are 3/7, ans= 157