Square Root of 3479

The square root is the inverse of the square of the number. 3479 is not a perfect square. The square root of 3479 is expressed in both radical and exponential form. In the radical form, it is expressed as √3479, whereas (3479)^(1/2) in the exponential form. √3479 ≈ 59.0, 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, the prime factorization method is not used for non-perfect square numbers where long-division method and approximation method are 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 3479 is broken down into its prime factors.

Step 1: Finding the prime factors of 3479. Breaking it down, we get 3479 = 59 × 59.

Step 2: Now we found out the prime factors of 3479. The second step is to make pairs of those prime factors. Since 3479 is not a perfect square, therefore the digits of the number can’t be grouped in pairs without a remainder. Therefore, calculating 3479 using prime factorization is impossible without approximation.

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 3479, we need to group it as 79 and 34.

Step 2: Now we need to find n whose square is less than or equal to 34. We find n as 5, because 5 × 5 = 25 is less than 34. Now the quotient is 5, and after subtracting 25 from 34, the remainder is 9.

Step 3: Now let us bring down 79, making the new dividend 979. Add the old divisor 5 to itself to get 10, which will be our new divisor's starting point.

Step 4: Find a digit x such that 10x × x ≤ 979. Trying x = 9, we get 109 × 9 = 981, which is too large, so we try x = 8.

Step 5: 108 × 8 = 864, which fits within 979. Subtract to get a remainder of 115.

Step 6: Since the dividend is less than the divisor, we need to add a decimal point. Adding the decimal point allows us to add two zeroes to the dividend. Now the new dividend is 11500.

Step 7: Find a new digit y such that 1080y × y ≤ 11500. Trying y = 6, we find 10806 × 6 = 64836, which is too large, so we try y = 5.

Step 8: 10805 × 5 = 54025. Subtracting gives a remainder.

Step 9: Continue these steps until we have the desired decimal places. So the square root of √3479 is approximately 59.0.

The approximation method is another method for finding the square roots. It is an easy method to find the square root of a given number. Now let us learn how to find the square root of 3479 using the approximation method.

Step 1: Find the closest perfect squares of √3479. The smallest perfect square less than 3479 is 3364 (58²) and the largest perfect square greater than 3479 is 3481 (59²). √3479 falls between 58 and 59.

Step 2: Now we need to apply the formula: (Given number - smallest perfect square) ÷ (Greater perfect square - smallest perfect square). Using the formula (3479 - 3364) ÷ (3481 - 3364) = 115 ÷ 117 ≈ 0.98. Using the formula we identified the decimal point of our square root. The next step is adding the value we got initially to the decimal number, which is 58 + 0.98 = 58.98, so the square root of 3479 is approximately 59.0.

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

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

• Long division method: A method used to find the square root of non-perfect squares by dividing the number into groups and performing division and subtraction iteratively.

• Approximation method: A method used to estimate the square root of a number by finding its closest perfect squares and interpolating between them.

• Prime factorization: The process of expressing a number as the product of its prime factors.