Square root from 1 to 30 – values and examples
Square root from 1 to 30 refers to a compiled list of square roots of the numbers from 1 to 30. The value of a square root can either be negative or positive. Since this article will only deal with numbers 1 to 30, we will talk about positive square roots in detail.
Let’s discuss the values, importance and other things about square roots.
Table of square root from 1 to 30
The table given below gives the values of square roots of numbers from 1 to 30. You can take a printout of this table and stick it on the wall above your study desk. And whenever you sit down to study, these numbers will be just a glance away. Moreover, you’ll ace all mathematical calculations if you know the values of these square roots.
| Number | Square Root | Number | Square Root |
| √1 | 1 | √16 | 4 |
| √2 | 1.414 | √17 | 4.123 |
| √3 | 1.732 | √18 | 4.234 |
| √4 | 2 | √19 | 4.359 |
| √5 | 2.236 | √20 | 4.472 |
| √6 | 2.449 | √21 | 4.583 |
| √7 | 2.646 | √22 | 4.690 |
| √8 | 2.828 | √23 | 4.796 |
| √9 | 3 | √24 | 4.899 |
| √10 | 3.162 | √25 | 5 |
| √11 | 3.317 | √26 | 5.099 |
| √12 | 3.464 | √27 | 5.196 |
| √13 | 3.606 | √28 | 5.292 |
| √14 | 3.742 | √29 | 5.385 |
| √15 | 3.873 | √30 | 5.477 |
Perfect squares from 1 to 30
All the numbers in the above table that give an integer as their square root are called perfect squares. The numbers given below are perfect squares:
| Number | Square Root |
| √1 | 1 |
| √4 | 2 |
| √9 | 3 |
| √16 | 4 |
| √25 | 5 |
Non-perfect squares from 1 to 30
All numbers apart from the five numbers mentioned above are called non-perfect squares because the value of their square roots goes up to an ‘n’ number of digits after the decimal place. The value of such roots is an irrational number.
| Number | Square Root |
| √2 | 1.414 |
| √3 | 1.732 |
| √5 | 2.236 |
| √6 | 2.449 |
| √7 | 2.646 |
| √8 | 2.828 |
| √10 | 3.162 |
| √11 | 3.317 |
| √12 | 3.464 |
| √13 | 3.606 |
| √14 | 3.742 |
| √15 | 3.873 |
| √17 | 4.123 |
| √18 | 4.234 |
| √19 | 4.359 |
| √20 | 4.472 |
| √21 | 4.583 |
| √22 | 4.690 |
| √23 | 4.796 |
| √24 | 4.899 |
| √26 | 5.099 |
| √27 | 5.196 |
| √28 | 5.292 |
| √29 | 5.385 |
| √30 | 5.477 |
Calculating the value of the square root of numbers from 1 to 30
We can calculate the value of square roots by two methods:
- Prime factorization
- Long division
Prime factorization
For example, let’s find the square root of the number 16
We know that the factors of 16 are 2 x 2 x 2 x 2
16 = 2 x 2 x 2 x 2
Square rooting on both sides gives,
√16 = √(2 x 2 x 2 x 2)
Now, we can make two pairs of 2 and get,
√16 = √(4 x 4)
Therefore, 4 is the square root of 16.
Long division
By following the long division method, we can find the square root of any number, for example, 29, as given below.
Illustration
Question 1 – Find the square root of √26
Solution – we know that √26 = √(2×13)
From the above tables, we put the value of √2 and √13
√26 = 1.414 x 3.606
√26 = 5.099
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Frequently Asked Questions
1.What do you mean by square root?
Ans: By the square root of a number, we refer to the inverse operation of squaring a number. We can calculate the square root of a number by the long division method or the prime factorization method.
2. How will you find the value of square roots of numbers between 1 and 30?
Ans: You can find the value of square roots of numbers between 1 and 30 by prime factorization or long division.
3. Write the perfect square numbers between 1 and 30.
Ans: There are five perfect square numbers between 1 to 30, they are 1, 4, 9, 16, and 25.