Vedic Maths is based on sixteen sutras or principles. These principles are general in nature and can be applied in many ways. In practice many applications of the sutras may be learned and combined to solve actual problems. These tutorials will give examples of simple applications of the sutras, to give a feel for how the Vedic Maths system works.
For detailed tutorials and practice questions go to www.geocities.com/shivam1003/vedic.html
If you are having problems using the tutorials then you could always read the instructions.
Tutorial 1 Tutorial 2 Tutorial 3 Tutorial 4 Tutorial 5 Tutorial 6 Tutorial 7
Tutorial 1
Use the formula ALL FROM 9 AND THE LAST FROM 10 to perform instant subtractions.
 | For example 1000 - 357 = 643 We simply take each figure in 357 from 9 and the last figure from 10. And thats all there is to it! This always works for subtractions from numbers consisting of a 1 followed by noughts: 100; 1000; 10,000 etc. |
| | Similarly 10,000 - 1049 = 8951  |
| | For 1000 - 83, in which we have more zeros than figures in the numbers being subtracted, we simply suppose 83 is 083. So 1000 - 83 becomes 1000 - 083 = 917 |
So the answer is 1000 - 357 = 643Tutorial 2
Using VERTICALLY AND CROSSWISE you do not need to the multiplication tables beyond 5 X 5.
| | Suppose you need 8 x 7 8 is 2 below 10 and 7 is 3 below 10. Think of it like this: That's all you do: See how far the numbers are below 10, subtract one number's deficiency from the other number, and multiply the deficiencies together. |
| | 7 x 6 = 42  Here there is a carry: the 1 in the 12 goes over to make 3 into 4. |
The answer is 56. The diagram below shows how you get it. 
You subtract crosswise 8-3 or 7 - 2 to get 5, the first figure of the answer. And you multiply vertically: 2 x 3 to get 6, the last figure of the answer.Here's how to use VERTICALLY AND CROSSWISE for multiplying numbers close to 100.
| | Suppose you want to multiply 88 by 98. Not easy,you might think. But with VERTICALLY AND CROSSWISE you can give the answer immediately, using the same method as above. Both 88 and 98 are close to 100. 88 is 12 below 100 and 98 is 2 below 100. You can imagine the sum set out like this:  As before the 86 comes from subtracting crosswise: 88 - 2 = 86 (or 98 - 12 = 86: you can subtract either way, you will always get the same answer). And the 24 in the answer is just 12 x 2: you multiply vertically. So 88 x 98 = 8624 |
This is so easy it is just mental arithmetic.
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Multiplying numbers just over 100.
| | 103 x 104 = 10712 The answer is in two parts: 107 and 12, 107 is just 103 + 4 (or 104 + 3), and 12 is just 3 x 4. |
| | Similarly 107 x 106 = 11342 107 + 6 = 113 and 7 x 6 = 42 |
Tutorial 3
The easy way to add and subtract fractions.
Use VERTICALLY AND CROSSWISE to write the answer straight down!
| |  Multiply crosswise and add to get the top of the answer: 2 x 5 = 10 and 1 x 3 = 3. Then 10 + 3 = 13. The bottom of the fraction is just 3 x 5 = 15. You multiply the bottom number together. So: |
| |  Subtracting is just as easy: multiply crosswise as before, but the subtract: |
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Tutorial 4
A quick way to square numbers that end in 5 using the formula BY ONE MORE THAN THE ONE BEFORE.
| | 752 = 5625 752 means 75 x 75. The answer is in two parts: 56 and 25. The last part is always 25. The first part is the first number, 7, multiplied by the number "one more", which is 8: so 7 x 8 = 56 |
| | Similarly 852 = 7225 because 8 x 9 = 72. |
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Method for multiplying numbers where the first figures are the same and the last figures add up to 10.
| | 32 x 38 = 1216 Both numbers here start with 3 and the last figures (2 and 8) add up to 10. So we just multiply 3 by 4 (the next number up) to get 12 for the first part of the answer. And we multiply the last figures: 2 x 8 = 16 to get the last part of the answer. Diagrammatically: |
| | And 81 x 89 = 7209 We put 09 since we need two figures as in all the other examples. |
Tutorial 5
An elegant way of multiplying numbers using a simple pattern.
| | 21 x 23 = 483 This is normally called long multiplication but actually the answer can be written straight down using the VERTICALLY AND CROSSWISE formula. We first put, or imagine, 23 below 21: There are 3 steps: a) Multiply vertically on the left: 2 x 2 = 4. This gives the first figure of the answer. b) Multiply crosswise and add: 2 x 3 + 1 x 2 = 8 This gives the middle figure. c) Multiply vertically on the right: 1 x 3 = 3 This gives the last figure of the answer. |
And thats all there is to it.
| | Similarly 61 x 31 = 1891 |
| | 6 x 3 = 18; 6 x 1 + 1 x 3 = 9; 1 x 1 = 1 |
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Multiply any 2-figure numbers together by mere mental arithmetic!
If you want 21 stamps at 26 pence each you can easily find the total price in your head.
There were no carries in the method given above. However, there only involve one small extra step.
| | 21 x 26 = 546 |
The method is the same as above except that we get a 2-figure number, 14, in the middle step, so the 1 is carried over to the left (4 becomes 5).
So 21 stamps cost £5.46.
| Return to Index |
| | 33 x 44 = 1452 There may be more than one carry in a sum: Vertically on the left we get 12. Crosswise gives us 24, so we carry 2 to the left and mentally get 144. Then vertically on the right we get 12 and the 1 here is carried over to the 144 to make 1452. |
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Tutorial 6
Multiplying a number by 11.
To multiply any 2-figure number by 11 we just put the total of the two figures between the 2 figures.
| | 26 x 11 = 286 Notice that the outer figures in 286 are the 26 being multiplied. And the middle figure is just 2 and 6 added up. |
| | So 72 x 11 = 792 |
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| | 77 x 11 = 847 This involves a carry figure because 7 + 7 = 14 we get 77 x 11 = 7147 = 847. |
| Return to Index |
| | 234 x 11 = 2574 We put the 2 and the 4 at the ends. We add the first pair 2 + 3 = 5. and we add the last pair: 3 + 4 = 7. |
Return to Index
Tutorial 7
Method for diving by 9.
| | 23 / 9 = 2 remainder 5 The first figure of 23 is 2, and this is the answer. The remainder is just 2 and 3 added up! |
| | 43 / 9 = 4 remainder 7 The first figure 4 is the answer and 4 + 3 = 7 is the remainder - could it be easier? |
| Return to Index |
| | 134 / 9 = 14 remainder 8 The answer consists of 1,4 and 8. 1 is just the first figure of 134. 4 is the total of the first two figures 1+ 3 = 4, and 8 is the total of all three figures 1+ 3 + 4 = 8. |
| | 842 / 9 = 812 remainder 14 = 92 remainder 14
Actually a remainder of 9 or more is not usually permitted because we are trying to find how many 9's there are in 842. Since the remainder, 14 has one more 9 with 5 left over the final answer will be 93 remainder 5 |
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Instructions for using the tutorials
Each tutorial has test sections comprising of several questions each. Next to each question is a box (field) into which you can enter the answer to the question. Select the first question in each test with the mouse to start a test. Enter the answer for the question using the numeric keys on the keyboard. To move to the answer field of the next question in the test, press the 'TAB' key. Moving to the next question, will cause the answer you entered to be checked, the following will be displayed depending on how you answered the question :-
Correct
Wrong
Answer has more than one part (such as fractions and those answers with remainders). Answering remaining parts of the question, will determine whether you answered the question correctly or not.
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