5 easy rules of vedic maths
Answers
Only those numbers can be multiplied, who are
closer to the power of 10, i.e., either less than the power of 10 or greater
than the power of 10, or lying between both sides of the Power.
Examples of Nikhilam Sutra Methods are ⇒
i) 99 × 98
Steps of the Multiplication by ''Nikhilam
Sutra'' ⇒
a) Since, both the numbers are closer to
the power of 10 (i.e. 100 or 10²), thus, this method can be applied in
this Multiplication.
b) 100 - 1 = 99 & 100 -2 - 98. 99 is 1 less
than the 100 and 98 is 2 less than the 100. Now, Since, they are less than the
100, thus, there difference will be written in the negative form and will be
multiplied.
∴ (-1) × (-2) = 02
c) Now, First number is subtracted with the
difference of the other and second number is subtracted with the difference of
first number.
∴ 99 - 2 = 97 & 98 - 1 = 97
d) At last, We will combine them to get the
Final Result.
∴ 9702
Similarly, Applying this Method in more
examples.
ii) 96 × 97
100 - 96 = 4 | 100 - 97 = 3
96 - 3 & 97 - 4|(-4) × (-3) = 12
93|12
9312
iii) 99 × 99
100 - 99 = 1 & 100 - 9 = 1| (-1) ×
(-1) = 01
99 - 1 = 98 & 99 -1 =
98 | 01
9801
iv) 98 × 98
100 - 2 = 98 & 100 - 2 = 98| -2 × -2 = 04
98 - 2 = 96 & 98 - 2 - 96|04
9604
v) 95 × 99
100 - 5 = 95 & 100 - 1 = 99| (-5) ×
(-1) = 05
95 - 01 = 94 & 99 - 5 = 94| 05
9405
2| Gyarasguna Sutra ⇒
In this Method of Multiplication, One number can
be easily multiplied with 11. Gyarasguna is the Sanskrit word which
is made up of three words namely, Gyaras, guna and Sutra. Gyaras
means 11 and guna means Multiplication and Sutra means Methods.
Examples of the Multiplication be Gyarasguna
Sutra are ⇒
i) 44 × 11
Steps of the Calculations ⇒
a) Write the non -11 numbers two times.
b) Add the Zero in one of the Number.
c) Add both the number now.
440 + 44 = 484
Similarly, solving the Others examples by this methods.
ii) 33 × 11
330 + 33 = 363
iii) 95 × 11 = 950 + 95 = 1045
iv) 99 × 11 = 990 + 99 = 1089
v) 67 × 11 = 670 + 67
= 737
3| Ekanunena Purneva Sutra ⇒
In this method, only those numbers can be multiplied in which one of the multiplier is 9, 99, 999..... or so on.
Examples of the Calculations using the Ekanunena Purneva Sutra are ⇒
i) 11 × 99
Steps of Calculations ⇒
a) First Subtracts the non - nine number (such as 9, 99, 999,.....so on) with 1. 11 - 1 = 10 then subtracts the 9 (or 99 or 999) with the resulting number. 99 - 10 = 89.
b) After this, Combine both of them, 1089. Hence, the Multiplication is 1089.
Similarly, Applying the same method in further calculations.
ii) 12 × 99
12 - 1 = 11 | 99 - 11 = 88
11|88
1188
iii) 5 × 9
5 - 1 = 4|9 - 4 = 5
4|5
45
iv) 9 × 9
9 - 1 = 8| 9 - 8 = 1
8|1
81
v) 88 × 99
88 -1 = 87|99 - 87 = 12
87|12
8712
4| Antyaordasake'pi⇒
In this method of the Calculation, the sum of the last two digits of the multiplier must be 10. If this Requirement is not filled then the Calculations be this method cannot be possible.
Examples of the Calculations by this Methods are ⇒
i) 34 × 36
Steps of Calculations ⇒
a) Since, the sum of the last two digits is 10, thus this 'Sutra' can be applied.
b) Add 1 in the First digit of the second number and multiply it with the first digit of the first number. 3 × (3 + 1) = 3 × 4 = 12.
c) After this Multiply the second digit of the first number with the second digit of the second number. 4 × 6 = 24.
d) At last, combine both of them to get the Exact Multiplication. 1224.
Similarly, Applying this Method in further calculations.
ii) 42 × 48
4 × 5|2 × 8
20|16
2016
iii) 54 × 56
5 × 6| 4 × 6
30|24
3024
iv) 98 × 92
9 × 10|8 × 2
90|16
9016
v) 28 × 22
2 × 3| 8 × 2
6|16
616
5| Navamguna Sutra ⇒
This method of the Calculations of the Vedic Maths can be applied only in those numbers which have one multiplier as 9, 99, or 999. It is one of the application of the Vedic Maths.
Examples of the Calculations by this Methods are ⇒
i) 42 × 9
Steps of the Calculations ⇒
a) First write the 9 (or 99 or 999, etc.) as 10 - 1.
b) Then multiply it with other number.
42 (10 - 1) = 420 - 42 = 378
Similarly, Applying this methods in further examples.
ii) 52 × 99
52 (100 - 1) = 5200 - 52
= 5148
iii) 67 × 999
67 (1000 - 1) = 67000 - 67
= 66933
iv) 44 × 99
44(100 - 1) = 4400 - 44
= 4356
v) 5789 × 999999
= 5789 (10000000 - 1) = 57890000000 - 5789
= 57889994211
Hope it helps.
Read more on Brainly.in - https://brainly.in/question/3909785#readmore
Vedic math is beautiful to solve easily things. There are many rules..All can not describe here..but i can give you some examples like—
Square of n times 1 trick-
1^2= 1
11^2=121
111^2= 12321
1111^2= 123454321
you just write numbers till the number of one’s and write reverse till one.
multiplication of numbers having 9 digit only—
99*99= 9801
999*999=998001
Trick- Just do -1 from first number and then put 0s and 1s according to the number.