![]() ![]() Step 4: Write cube of second number 2³ = 8 Step 3: Make the square of the second number and multiply with the first number. Step 2: Make the square of the first number and multiply it with the second number. Step 1: Write cube of first number 3³ = 27 Other things remain sameĦ 8 9 2 1- Answer Cube of any two digit number other then previous numbers 24, 32, 46 - 98 ![]() In this case the same numbers start from the left, but this time write the cubes of each number. (Starting from right side drop 5, carry 12 to 5 add 12 + 5 = 17, drop 7 add adjacent 7 + 1 = 8, carry 8 to next 5, add 8 + 5 = 13, drop 3 add remaining 1 with 1 gives 1 + 1= 2, carry 2 to next 1, add 2 + 1 = 3)Ĥ 0 9 6 – Answer Cube of 22, 33, 44, 55 - 99 Step 9: Add digits to get the answer Cube of 12, 13, 15 - 19 Step 8: Write 10 and 25 just below 5 and 25 Step 3: Multiply again five with five 5 × 5 = 25 ![]() ![]() Step 1: First write the first digit as it is. = 8 | 3 6 | 5 4 | 2 7 (use Balancing rule) Cube of Numberįor finding a Cube of any number we need to use two Vedic maths sutras We can solve cube or cube root of any number just by observation only by applying Vedic maths formula.įirst we will learn the method to find a cube of any number & then we will learn how to find the Cube-Root of the perfect cube. So, we just need to find out the cube of which number should be taken to get the given number. The other way to denote cube root is to write 1/3 as the exponent of a number. Here the word Root represents the primary source or origin of the cube. It is the reverse process of the cube of a number and is denoted by ∛. Cube root is an inverse operation of the cube of a number. Cube RootĬube root is the number that needs to be multiplied three times to get the original number. Whereas, 28 is not a perfect cube because there is no number, which, when multiplied three times gives the product 28. For example, 27 is a perfect cube becauseĢ7 = 3 × 3 × 3. ![]()
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