Square Root of 222

The square root is the inverse of the square of a number. 222 is not a perfect square. The square root of 222 is expressed in both radical and exponential form. In the radical form, it is expressed as √222, whereas in exponential form it is expressed as (222)^(1/2). √222 ≈ 14.8997, which is an irrational number because it cannot be expressed in the form of p/q, where p and q are integers, and q ≠ 0.

The prime factorization method is used for perfect square numbers. However, for non-perfect square numbers, the long division method and approximation method are commonly used. Let us now learn the following methods:

• Prime factorization method
   
• Long division method
   
• Approximation method

The product of prime factors is the prime factorization of a number. Now let us look at how 222 is broken down into its prime factors:

Step 1: Finding the prime factors of 222 Breaking it down, we get 2 x 3 x 37.

Step 2: Now we have found out the prime factors of 222. The second step is to make pairs of those prime factors. Since 222 is not a perfect square, the digits of the number can’t be grouped in pairs. Therefore, calculating the square root of 222 using prime factorization does not yield a whole number.

The long division method is particularly used for non-perfect square numbers. In this method, we should check the closest perfect square number for the given number. Let us now learn how to find the square root using the long division method, step by step:

Step 1: To begin with, we need to group the numbers from right to left. In the case of 222, we need to group it as 22 and 2.

Step 2: Now we need to find a number n whose square is ≤ 2. We can say n is ‘1’ because 1 x 1 is lesser than or equal to 2. Now the quotient is 1, and after subtracting, the remainder is 1.

Step 3: Bring down 22, which is the new dividend. Add the old divisor with the same number: 1 + 1 = 2, which will be our new divisor.

Step 4: The new divisor will be 2n. We need to find the value of n such that 2n x n ≤ 122. Let's consider n as 6; now 26 x 6 = 156, which is too large.

Step 5: Instead, try n as 5. Now, 25 x 5 = 125, which is closer and within range. Subtract 125 from 122 to get 97 as the remainder, and the quotient becomes 15.

Step 6: Since the dividend is less than the divisor, add a decimal point. Adding the decimal point allows us to add two zeroes to the dividend. The new dividend is 9700.

Step 7: The new divisor is 30n. Use n as 3; 303 x 3 = 909.

Step 8: Subtract 909 from 9700 to get 791 as the remainder. Continue this process until you reach the desired accuracy. So the square root of √222 is approximately 14.8997.

The approximation method is another way to find square roots, and it provides an easy method to find the square root of a given number. Now let us learn how to find the square root of 222 using the approximation method.

Step 1: Find the closest perfect squares of √222. The smallest perfect square less than 222 is 196, and the largest perfect square greater than 222 is 225. √222 falls between 14 and 15.

Step 2: Apply the formula: (Given number - smallest perfect square) / (Greater perfect square - smallest perfect square). Using the formula (222 - 196) ÷ (225 - 196) = 26 ÷ 29 ≈ 0.8966. Add this decimal to 14, the square root of the smaller perfect square. So, 14 + 0.8966 ≈ 14.8966, making the approximate square root of 222 around 14.8997.

• Square root: A square root is the inverse of a square. Example: 4² = 16, and the inverse of the square is the square root, which is √16 = 4.

• Irrational number: An irrational number is a number that cannot be written in the form of p/q, where q is not equal to zero and p and q are integers.

• Principal square root: A number has both positive and negative square roots; however, it is always the positive square root that has more prominence due to its uses in the real world. That is why it is also known as the principal square root.

• Prime factorization: Prime factorization is expressing a number as the product of its prime numbers.

• Long division method: The long division method is a technique used to find the square root of non-perfect squares through a series of division steps.