-
Vedic square,Golden rectangle , MacDonald Codex
Facile by Kevin MacLeod is licensed under a Creative Commons Attribution licence (https://creativecommons.org/licenses/by/4.0/)
Source: http://incompetech.com/music/royalty-free/index.html?isrc=USUAN1100858
Artist: http://incompetech.com/
published: 25 Feb 2019
-
Magic Maths - In a minute - Vedic Square
My first video on this account,
published: 24 Jul 2010
-
Progressive Base Vedic Square
I watched this video, https://www.youtube.com/watch?v=W5mJeRtjPvY and instead of jumping on the "WHOAH MAGIC NUMBERS!!" bandwagon, I looked into this "summing of digits" of the multiplication table.
The digital sum is the sum of the digits of a number. If multiple digits still remain, the process can be repeated until the final digit is called the digital root.
The multiplication table processed in this way is known as the "Vedic Square." It looks like this:
1 2 3 4 5 6 7 8 9
------------------------------------------
1 | 1 2 3 4 5 6 7 8 9
2 | 2 4 6 8 1 3 5 7 9
3 | 3 6 9 3 6 9 3 6 9
4 | 4 8 3 7 2 6 1 5 9
5 | 5 1 6 2 7 3 8 4 9
6 | 6 3 9 6 3 9 6 3 9
7 | ...
published: 24 Jun 2015
-
Fastest way to find Square of two Numbers | Vedic Maths Square Tricks for Fast Calculation
Vedic Mathematics tricks are very important techniques through whuch we can easily find square,cube,squareroo, cube root or can multiply two numbers. In this video we gonna teach you some amzing vedic maths tricks for finding square of any number within 5 seconds.
Bharthi Krishna Tritha, an Indian monk, wrote the book "VEDIC MATHEMATICS", which has a list of mathematical tricks to solve maths calculations faster than traditional methods
Type 1: Squaring of number ending with 5.
Sutra is "BY ONE MORE THAN PREVIOUS ONE"
Step 1: Add 1 to the first digit from the left and multiply by the number itself.
Step 2: Add 52 (25) at the end to the number obtained from step 1.
Number Steps
65
6 × (6 + 1)
= 6 × 7
= 42 Add 1 to the left number (6) and multiply by the number itself and
=4...
published: 14 Feb 2022
-
Yet another Vedic square pattern: 9-pointed star
published: 18 May 2016
-
Learn to Square any number I Vedic Math I Math Tricks and Tips
Here is the fast and easy math trick to find the SQUARE any number close to the power of 10.
Thank you for watching my videos, please subscribe to my channel!
#Mathticks #Square any number #VedicMath
Homework Answers:
14^2 = 196
18^2 = 324
125^2 = 15625
published: 14 Jun 2020
-
Vedic Square
published: 18 Dec 2014
-
88. Algebra Applications: Why Does The Vedic Square Root Algorithm Work?
In this video, we'll quickly go over an example of how to apply the Vedic Square Root algorithm, and go over an explanation of why it works. It's really just 1 explanation, but I'll present it in two different ways in case one of them helps you more.
If you'd like to go over the original presentation, a little more slowly, of how to use the algorithm for finding the square root please see video#15 in this Art of Math (AOM) series: https://youtu.be/3p-M5y-zcVc?list=PLtMJUI0rs4e5BLanthvCYmW5EeFs6wY3z.
Enjoy!
For maximum benefit, I highly recommend following this series, The Art of Math: A No-Nonsense Guide, in the order I designed it using this playlist: https://www.youtube.com/playlist?list=PLtMJUI0rs4e5BLanthvCYmW5EeFs6wY3z
ADDITIONAL RESOURCES:
For those of you that want to delve a l...
published: 04 Feb 2017
-
Learn to Square any 3 digit number I Math Tricks and Tips
Here is the fast and easy math trick to find the SQUARE any 3 digit number.
Thank you for watching my videos, please subscribe to my channel!
#Mathticks #Square any number
published: 04 Aug 2022
-
Learn to Square any 2 digit number I Math Tricks and Tips
Here is the fast and easy math trick to find the SQUARE any 2 digit number.
Thank you for watching my videos, please subscribe to my channel!
#Mathticks #Square any number
Homework Answers:
26^2 = 676
43^2 = 1849
78^2 = 6084
published: 23 Mar 2022
3:40
Vedic square,Golden rectangle , MacDonald Codex
Facile by Kevin MacLeod is licensed under a Creative Commons Attribution licence (https://creativecommons.org/licenses/by/4.0/)
Source: http://incompetech.com/m...
Facile by Kevin MacLeod is licensed under a Creative Commons Attribution licence (https://creativecommons.org/licenses/by/4.0/)
Source: http://incompetech.com/music/royalty-free/index.html?isrc=USUAN1100858
Artist: http://incompetech.com/
https://wn.com/Vedic_Square,Golden_Rectangle_,_Macdonald_Codex
Facile by Kevin MacLeod is licensed under a Creative Commons Attribution licence (https://creativecommons.org/licenses/by/4.0/)
Source: http://incompetech.com/music/royalty-free/index.html?isrc=USUAN1100858
Artist: http://incompetech.com/
- published: 25 Feb 2019
- views: 996
1:25
Progressive Base Vedic Square
I watched this video, https://www.youtube.com/watch?v=W5mJeRtjPvY and instead of jumping on the "WHOAH MAGIC NUMBERS!!" bandwagon, I looked into this "summing o...
I watched this video, https://www.youtube.com/watch?v=W5mJeRtjPvY and instead of jumping on the "WHOAH MAGIC NUMBERS!!" bandwagon, I looked into this "summing of digits" of the multiplication table.
The digital sum is the sum of the digits of a number. If multiple digits still remain, the process can be repeated until the final digit is called the digital root.
The multiplication table processed in this way is known as the "Vedic Square." It looks like this:
1 2 3 4 5 6 7 8 9
------------------------------------------
1 | 1 2 3 4 5 6 7 8 9
2 | 2 4 6 8 1 3 5 7 9
3 | 3 6 9 3 6 9 3 6 9
4 | 4 8 3 7 2 6 1 5 9
5 | 5 1 6 2 7 3 8 4 9
6 | 6 3 9 6 3 9 6 3 9
7 | 7 5 3 1 8 6 4 2 9
8 | 8 7 6 5 4 3 2 1 9
9 | 9 9 9 9 9 9 9 9 9
Straight away, it's clear that any multiple of 9 (such as 360, or the formula for the internal angles of a polygon) has a digital sum that is also equal to 9.
This only occurs because our number system is based on 10, and 9 = 10 - 1
Think about it, when you add 9 to a number, generally you add 1 to a column and take 1 from the column next to it, leaving the digital sum unchanged.
I liked the symmetry of the pattern so I decided to try with different base number systems like binary (which is pointless) :
1
----
1 | 1
and hexadecimal:
1 2 3 4 5 6 7 8 9 A B C D E F
------------------------------------------------------------------------
1 | 1 2 3 4 5 6 7 8 9 A B C D E F
2 | 2 4 6 8 A C E 1 3 5 7 9 B D F
3 | 3 6 9 C F 3 6 9 C F 3 6 9 C F
4 | 4 8 C 1 5 9 D 2 6 A E 3 7 B F
5 | 5 A F 5 A F 5 A F 5 A F 5 A F
6 | 6 C 3 9 F 6 C 3 9 F 6 C 3 9 F
7 | 7 E 6 D 5 C 4 B 3 A 2 9 1 8 F
8 | 8 1 9 2 A 3 B 4 C 5 D 6 E 7 F
9 | 9 3 C 6 F 9 3 C 6 F 9 3 C 6 F
A | A 5 F A 5 F A 5 F A 5 F A 5 F
B | B 7 3 E A 6 2 D 9 5 1 C 8 4 F
C | C 9 6 3 F C 9 6 3 F C 9 6 3 F
D | D B 9 7 5 3 1 E C A 8 6 4 2 F
E | E D C B A 9 8 7 6 5 4 3 2 1 F
F | F F F F F F F F F F F F F F F
You'll notice that F (or 15) is the dominant digit in this table.
But, it's difficult to visualize the pattern made up of numbers and letters so I wrote some code to convert a matrix of numbers into a bitmap of colours. It looked best with different shades of a single colour.
I then did this for every base from 3 to 1080 and compiled them into a video! Enjoy!
https://wn.com/Progressive_Base_Vedic_Square
I watched this video, https://www.youtube.com/watch?v=W5mJeRtjPvY and instead of jumping on the "WHOAH MAGIC NUMBERS!!" bandwagon, I looked into this "summing of digits" of the multiplication table.
The digital sum is the sum of the digits of a number. If multiple digits still remain, the process can be repeated until the final digit is called the digital root.
The multiplication table processed in this way is known as the "Vedic Square." It looks like this:
1 2 3 4 5 6 7 8 9
------------------------------------------
1 | 1 2 3 4 5 6 7 8 9
2 | 2 4 6 8 1 3 5 7 9
3 | 3 6 9 3 6 9 3 6 9
4 | 4 8 3 7 2 6 1 5 9
5 | 5 1 6 2 7 3 8 4 9
6 | 6 3 9 6 3 9 6 3 9
7 | 7 5 3 1 8 6 4 2 9
8 | 8 7 6 5 4 3 2 1 9
9 | 9 9 9 9 9 9 9 9 9
Straight away, it's clear that any multiple of 9 (such as 360, or the formula for the internal angles of a polygon) has a digital sum that is also equal to 9.
This only occurs because our number system is based on 10, and 9 = 10 - 1
Think about it, when you add 9 to a number, generally you add 1 to a column and take 1 from the column next to it, leaving the digital sum unchanged.
I liked the symmetry of the pattern so I decided to try with different base number systems like binary (which is pointless) :
1
----
1 | 1
and hexadecimal:
1 2 3 4 5 6 7 8 9 A B C D E F
------------------------------------------------------------------------
1 | 1 2 3 4 5 6 7 8 9 A B C D E F
2 | 2 4 6 8 A C E 1 3 5 7 9 B D F
3 | 3 6 9 C F 3 6 9 C F 3 6 9 C F
4 | 4 8 C 1 5 9 D 2 6 A E 3 7 B F
5 | 5 A F 5 A F 5 A F 5 A F 5 A F
6 | 6 C 3 9 F 6 C 3 9 F 6 C 3 9 F
7 | 7 E 6 D 5 C 4 B 3 A 2 9 1 8 F
8 | 8 1 9 2 A 3 B 4 C 5 D 6 E 7 F
9 | 9 3 C 6 F 9 3 C 6 F 9 3 C 6 F
A | A 5 F A 5 F A 5 F A 5 F A 5 F
B | B 7 3 E A 6 2 D 9 5 1 C 8 4 F
C | C 9 6 3 F C 9 6 3 F C 9 6 3 F
D | D B 9 7 5 3 1 E C A 8 6 4 2 F
E | E D C B A 9 8 7 6 5 4 3 2 1 F
F | F F F F F F F F F F F F F F F
You'll notice that F (or 15) is the dominant digit in this table.
But, it's difficult to visualize the pattern made up of numbers and letters so I wrote some code to convert a matrix of numbers into a bitmap of colours. It looked best with different shades of a single colour.
I then did this for every base from 3 to 1080 and compiled them into a video! Enjoy!
- published: 24 Jun 2015
- views: 371
5:16
Fastest way to find Square of two Numbers | Vedic Maths Square Tricks for Fast Calculation
Vedic Mathematics tricks are very important techniques through whuch we can easily find square,cube,squareroo, cube root or can multiply two numbers. In this vi...
Vedic Mathematics tricks are very important techniques through whuch we can easily find square,cube,squareroo, cube root or can multiply two numbers. In this video we gonna teach you some amzing vedic maths tricks for finding square of any number within 5 seconds.
Bharthi Krishna Tritha, an Indian monk, wrote the book "VEDIC MATHEMATICS", which has a list of mathematical tricks to solve maths calculations faster than traditional methods
Type 1: Squaring of number ending with 5.
Sutra is "BY ONE MORE THAN PREVIOUS ONE"
Step 1: Add 1 to the first digit from the left and multiply by the number itself.
Step 2: Add 52 (25) at the end to the number obtained from step 1.
Number Steps
65
6 × (6 + 1)
= 6 × 7
= 42 Add 1 to the left number (6) and multiply by the number itself and
=4225 Add 52 (25) at the last of 42
Answer : 652 = 65 × 65 = 4225
85
8 × (8 + 1)
= 8 × 9
= 72 Add 1 to the left number (8) and multiply by the number itself and
= 7225 add 52 (25) at last of 72
Answer : 852 = 85 × 85 = 7225
155
15 × (15 + 1)
= 15 × 16
= 240 Add 1 to the left number (15) and multiply by the number itself and
= 24025 add 52 (25) at last of 240
Answer : 1552 = 155 × 155 = 2402
Type 2: Squaring of numbers less than 50 and numbers not ending with 5.
Number Steps
34 50 - 16 = 34
52 = 25
= 25 + (-16)
= 9 Square the first digit (5) of first part (50) then add part (-16)
162 = 256 Square the second part of number (16)
9 + 256 = 1156 Add the answers got in step 1 (9)and step 2 (256)
Answer : 342 = 34 × 34 = 1156
28 50 - 22 = 28
52 = 25
= 25 + (-22)
= 3 Square the first digit (5) of first part (50) then add second part (-22)
222 = 484 Square the second part of number (22)
3 + 484 = 784 Add the answers got in step 1 (3)and step 2 (484)
Answer : 282 = 28 × 28 = 784
Type 3: Squaring of numbers less than 50 and numbers not ending with 5.
Number Steps
74 50 + 24 = 74
52 = 25 Square the first digit (5) of first part (50) then add
= 25 + 24
= 49 second part (24)
242 = 576 Square the second part of number 24
49 + 576 = 5476 Add the answers got in step 1 (49)and step 2 (576)
Answer : 742 = 74 × 74 = 5476
57 50 + 7 = 57
52 = 25
= 25 + 7
= 32 Square the first digit (5) of first part (50) then add second part 7
72 = 49 Square the second part of number 7
32 + 49 = 3249 Add the answers got in step 1 (32)and step 2 (49)
Answer : 572 = 57 × 57 = 3249
Type 4: Squaring of number near to their base 10,100,1000, and so on:
Number Steps
105 100 + 5 = Divide the given number to their base and number
105 + 5 = 110 Add the second part of number 5 to the given number (105)
52 = 25 Square the second part of the 52
11025 Combine the numbers from step 1 and step 2
Answer : 1052 = 105 × 105 = 11025
986 1000 - 986 = 14
986 - 14
= 972 The given number 986 is less than 14 from its base value 1000, so the deficient number 14 should be subtracted by the given number 986
142 = 196 Square of deficient number 211
972196 Combine the numbers from step 1 and step 2
Answer : 9862 = 986 × 986 = 972196
If the number is lesser than its nearest base number then the deficient number is reduced from the given number.
If the given number is greater than its nearest base number then the surplus number is added to the given number.
Type 5: Squaring of a number near to their sub base:
Number Steps
306 300 + 6 = Divide the given number to their sub base and number
3 × (306 + 6)
= 3 ×312
= 936
Add the second part of number 6 to the given number (306) and multiply it by 3
62 = 36 Square the second part of the 62
93636 Combine the numbers from step 1 and step 2
Answer : 3062 = 306 × 306 = 93636
480 500 - 480 = 20
480 - 20= 5 ×(480 -20)
=5 × 460
= 2300 The given number 480 is less than 20 from its sub base value 500, so the deficient number 20 should be subtracted by the given number 480 and multiplied by 5
202 =400 Square of deficient number 211
230400 Combine the numbers from step 1 and step 2
Answer : 4802 = 480 × 480 = 230400
Keywords: how to find square of any number in mind? | how to calculate square of a number? | vedic maths square tricks | square of numbers ending in 5,9,1 | Shortcut to find square of any number | Best trick to find square of any number | vedic maths for fast calculation | vedic maths square of any number | vedic maths full course
how to find square of any number in mind? how to calculate square of a number? vedic maths square tricks, square of numbers ending in 5,9,1, Shortcut to find square of any number, Best trick to find square of any number, vedic maths for fast calculation, vedic maths square of any number
Scripted By: Ghatak Thakur
Voice over by: Dheemraj
Music: Maestro Tlakaelel
Artist: Jesse Gallagher
Fair Use Copyright Disclaimer: This video is solely made for educational purpose. We do not claim rights over any media all the rights go to their respective owners.
Thank You....
https://wn.com/Fastest_Way_To_Find_Square_Of_Two_Numbers_|_Vedic_Maths_Square_Tricks_For_Fast_Calculation
Vedic Mathematics tricks are very important techniques through whuch we can easily find square,cube,squareroo, cube root or can multiply two numbers. In this video we gonna teach you some amzing vedic maths tricks for finding square of any number within 5 seconds.
Bharthi Krishna Tritha, an Indian monk, wrote the book "VEDIC MATHEMATICS", which has a list of mathematical tricks to solve maths calculations faster than traditional methods
Type 1: Squaring of number ending with 5.
Sutra is "BY ONE MORE THAN PREVIOUS ONE"
Step 1: Add 1 to the first digit from the left and multiply by the number itself.
Step 2: Add 52 (25) at the end to the number obtained from step 1.
Number Steps
65
6 × (6 + 1)
= 6 × 7
= 42 Add 1 to the left number (6) and multiply by the number itself and
=4225 Add 52 (25) at the last of 42
Answer : 652 = 65 × 65 = 4225
85
8 × (8 + 1)
= 8 × 9
= 72 Add 1 to the left number (8) and multiply by the number itself and
= 7225 add 52 (25) at last of 72
Answer : 852 = 85 × 85 = 7225
155
15 × (15 + 1)
= 15 × 16
= 240 Add 1 to the left number (15) and multiply by the number itself and
= 24025 add 52 (25) at last of 240
Answer : 1552 = 155 × 155 = 2402
Type 2: Squaring of numbers less than 50 and numbers not ending with 5.
Number Steps
34 50 - 16 = 34
52 = 25
= 25 + (-16)
= 9 Square the first digit (5) of first part (50) then add part (-16)
162 = 256 Square the second part of number (16)
9 + 256 = 1156 Add the answers got in step 1 (9)and step 2 (256)
Answer : 342 = 34 × 34 = 1156
28 50 - 22 = 28
52 = 25
= 25 + (-22)
= 3 Square the first digit (5) of first part (50) then add second part (-22)
222 = 484 Square the second part of number (22)
3 + 484 = 784 Add the answers got in step 1 (3)and step 2 (484)
Answer : 282 = 28 × 28 = 784
Type 3: Squaring of numbers less than 50 and numbers not ending with 5.
Number Steps
74 50 + 24 = 74
52 = 25 Square the first digit (5) of first part (50) then add
= 25 + 24
= 49 second part (24)
242 = 576 Square the second part of number 24
49 + 576 = 5476 Add the answers got in step 1 (49)and step 2 (576)
Answer : 742 = 74 × 74 = 5476
57 50 + 7 = 57
52 = 25
= 25 + 7
= 32 Square the first digit (5) of first part (50) then add second part 7
72 = 49 Square the second part of number 7
32 + 49 = 3249 Add the answers got in step 1 (32)and step 2 (49)
Answer : 572 = 57 × 57 = 3249
Type 4: Squaring of number near to their base 10,100,1000, and so on:
Number Steps
105 100 + 5 = Divide the given number to their base and number
105 + 5 = 110 Add the second part of number 5 to the given number (105)
52 = 25 Square the second part of the 52
11025 Combine the numbers from step 1 and step 2
Answer : 1052 = 105 × 105 = 11025
986 1000 - 986 = 14
986 - 14
= 972 The given number 986 is less than 14 from its base value 1000, so the deficient number 14 should be subtracted by the given number 986
142 = 196 Square of deficient number 211
972196 Combine the numbers from step 1 and step 2
Answer : 9862 = 986 × 986 = 972196
If the number is lesser than its nearest base number then the deficient number is reduced from the given number.
If the given number is greater than its nearest base number then the surplus number is added to the given number.
Type 5: Squaring of a number near to their sub base:
Number Steps
306 300 + 6 = Divide the given number to their sub base and number
3 × (306 + 6)
= 3 ×312
= 936
Add the second part of number 6 to the given number (306) and multiply it by 3
62 = 36 Square the second part of the 62
93636 Combine the numbers from step 1 and step 2
Answer : 3062 = 306 × 306 = 93636
480 500 - 480 = 20
480 - 20= 5 ×(480 -20)
=5 × 460
= 2300 The given number 480 is less than 20 from its sub base value 500, so the deficient number 20 should be subtracted by the given number 480 and multiplied by 5
202 =400 Square of deficient number 211
230400 Combine the numbers from step 1 and step 2
Answer : 4802 = 480 × 480 = 230400
Keywords: how to find square of any number in mind? | how to calculate square of a number? | vedic maths square tricks | square of numbers ending in 5,9,1 | Shortcut to find square of any number | Best trick to find square of any number | vedic maths for fast calculation | vedic maths square of any number | vedic maths full course
how to find square of any number in mind? how to calculate square of a number? vedic maths square tricks, square of numbers ending in 5,9,1, Shortcut to find square of any number, Best trick to find square of any number, vedic maths for fast calculation, vedic maths square of any number
Scripted By: Ghatak Thakur
Voice over by: Dheemraj
Music: Maestro Tlakaelel
Artist: Jesse Gallagher
Fair Use Copyright Disclaimer: This video is solely made for educational purpose. We do not claim rights over any media all the rights go to their respective owners.
Thank You....
- published: 14 Feb 2022
- views: 809307
10:02
Learn to Square any number I Vedic Math I Math Tricks and Tips
Here is the fast and easy math trick to find the SQUARE any number close to the power of 10.
Thank you for watching my videos, please subscribe to my channel!
#...
Here is the fast and easy math trick to find the SQUARE any number close to the power of 10.
Thank you for watching my videos, please subscribe to my channel!
#Mathticks #Square any number #VedicMath
Homework Answers:
14^2 = 196
18^2 = 324
125^2 = 15625
https://wn.com/Learn_To_Square_Any_Number_I_Vedic_Math_I_Math_Tricks_And_Tips
Here is the fast and easy math trick to find the SQUARE any number close to the power of 10.
Thank you for watching my videos, please subscribe to my channel!
#Mathticks #Square any number #VedicMath
Homework Answers:
14^2 = 196
18^2 = 324
125^2 = 15625
- published: 14 Jun 2020
- views: 323024
9:39
88. Algebra Applications: Why Does The Vedic Square Root Algorithm Work?
In this video, we'll quickly go over an example of how to apply the Vedic Square Root algorithm, and go over an explanation of why it works. It's really just 1 ...
In this video, we'll quickly go over an example of how to apply the Vedic Square Root algorithm, and go over an explanation of why it works. It's really just 1 explanation, but I'll present it in two different ways in case one of them helps you more.
If you'd like to go over the original presentation, a little more slowly, of how to use the algorithm for finding the square root please see video#15 in this Art of Math (AOM) series: https://youtu.be/3p-M5y-zcVc?list=PLtMJUI0rs4e5BLanthvCYmW5EeFs6wY3z.
Enjoy!
For maximum benefit, I highly recommend following this series, The Art of Math: A No-Nonsense Guide, in the order I designed it using this playlist: https://www.youtube.com/playlist?list=PLtMJUI0rs4e5BLanthvCYmW5EeFs6wY3z
ADDITIONAL RESOURCES:
For those of you that want to delve a little further into this and/or just have another great resource, I recommend checking out this video by NJWildberger (as well as the whole series)-- however, please be warned that the information isn't always as condensed so I think my recommendation would be more well suited, on average, for older students who have a little more patience to sit through a long video and who want all the background/nitty gritty details: https://youtu.be/EnxV3_1oaOU?list=PL5A714C94D40392AB
Professor Wildberger has some amazing educational videos. My personal favorite of his is the Math History series: https://www.youtube.com/playlist?list=PL55C7C83781CF4316. I'll probably recommend this again once we get up to the geometry videos (Pythagorean Theorem, etc...).
https://wn.com/88._Algebra_Applications_Why_Does_The_Vedic_Square_Root_Algorithm_Work
In this video, we'll quickly go over an example of how to apply the Vedic Square Root algorithm, and go over an explanation of why it works. It's really just 1 explanation, but I'll present it in two different ways in case one of them helps you more.
If you'd like to go over the original presentation, a little more slowly, of how to use the algorithm for finding the square root please see video#15 in this Art of Math (AOM) series: https://youtu.be/3p-M5y-zcVc?list=PLtMJUI0rs4e5BLanthvCYmW5EeFs6wY3z.
Enjoy!
For maximum benefit, I highly recommend following this series, The Art of Math: A No-Nonsense Guide, in the order I designed it using this playlist: https://www.youtube.com/playlist?list=PLtMJUI0rs4e5BLanthvCYmW5EeFs6wY3z
ADDITIONAL RESOURCES:
For those of you that want to delve a little further into this and/or just have another great resource, I recommend checking out this video by NJWildberger (as well as the whole series)-- however, please be warned that the information isn't always as condensed so I think my recommendation would be more well suited, on average, for older students who have a little more patience to sit through a long video and who want all the background/nitty gritty details: https://youtu.be/EnxV3_1oaOU?list=PL5A714C94D40392AB
Professor Wildberger has some amazing educational videos. My personal favorite of his is the Math History series: https://www.youtube.com/playlist?list=PL55C7C83781CF4316. I'll probably recommend this again once we get up to the geometry videos (Pythagorean Theorem, etc...).
- published: 04 Feb 2017
- views: 301
7:14
Learn to Square any 3 digit number I Math Tricks and Tips
Here is the fast and easy math trick to find the SQUARE any 3 digit number.
Thank you for watching my videos, please subscribe to my channel!
#Mathticks #Square...
Here is the fast and easy math trick to find the SQUARE any 3 digit number.
Thank you for watching my videos, please subscribe to my channel!
#Mathticks #Square any number
https://wn.com/Learn_To_Square_Any_3_Digit_Number_I_Math_Tricks_And_Tips
Here is the fast and easy math trick to find the SQUARE any 3 digit number.
Thank you for watching my videos, please subscribe to my channel!
#Mathticks #Square any number
- published: 04 Aug 2022
- views: 378264
7:10
Learn to Square any 2 digit number I Math Tricks and Tips
Here is the fast and easy math trick to find the SQUARE any 2 digit number.
Thank you for watching my videos, please subscribe to my channel!
#Mathticks #Square...
Here is the fast and easy math trick to find the SQUARE any 2 digit number.
Thank you for watching my videos, please subscribe to my channel!
#Mathticks #Square any number
Homework Answers:
26^2 = 676
43^2 = 1849
78^2 = 6084
https://wn.com/Learn_To_Square_Any_2_Digit_Number_I_Math_Tricks_And_Tips
Here is the fast and easy math trick to find the SQUARE any 2 digit number.
Thank you for watching my videos, please subscribe to my channel!
#Mathticks #Square any number
Homework Answers:
26^2 = 676
43^2 = 1849
78^2 = 6084
- published: 23 Mar 2022
- views: 1502843