Speedy finding of Square of numbers near to its base

Base Method for Squaring numbers is an exceptionally intriguing system for getting the square of a number. Base Method has its cause in Vedic Mathematics. We have just talked about Base Method here and this strategy for squaring numbers is an augmentation of Base Method system for Multiplication.This alternate route is extremely valuable when you have to acquire the square of a number which is nearer to forces of 10 like 10, 100, 1000 base method generally use in competitive exam like IBPS, RRB, BOB, NICL then you can easily find square within 5 to 7 second the bank provide online materials for middle-class family who not take coaching class.

**Case 1: The numbers are less than its base**

**Square of 97:**

Nearest base to 97 to 100. 97 is less than 100 by 3.

Step 1: Subtract 97 by 3 = 94.

Step 2: Square of 3 = 9

Answer: 94 / 09. (Make sure the number of digits is equal to the number of Zeros in the base).

**The Answer is 9409. **

**Square of 94:**

Step 1: 94 – 6 = 88

Step 2: Square of 6 = 36

**The Answer is 8836**

**Square of 995:**

Nearest base to 995 is 1000. 995 is less than 1000 by 5.

Step 1: 995 – 5 = 990.

Step 2: Square of 5 = 25.

Answer 990 / 025 (Number of digits must be equal to the number of Zeros in the base)

**The Answer is 990025. **

**Square of 88**

Step 1: 88 – 12 = 76.

Step 2: 12 x 12 = 144

Answer 76 / 144 (Number of digits is more than the number of Zeros in the base. So it must be carry over). It becomes 77 / 44.

**The Answer is 7744.**