Which statement is true about the square root of 28?
The statement that is true about the square root of 28 is that it is an irrational number.
Which statement is true about the integer fraction that equals the square root of 2
The square root of 28 is a non-repeating and non-terminating decimal, which means it is an irrational number.
To determine which statement is true about the square root of 28, we need to evaluate the square root of 28 and compare it to the given statements. The square root (√) of a number is a value that, when multiplied by itself, gives the original number.
To find the square root of 28, apply the following steps:
1. Start by approximating the square root. Since 5^2 is 25, we know that the square root of 25 is 5.
2. Divide 28 by a number close to the approximate square root. For example, divide 28 by 5, resulting in 5.6.
3. Take the average of the quotient and the approximate square root to get a better approximation. The average of 5.6 and 5 is 5.3.
4. Repeat the process and divide 28 by 5.3, resulting in approximately 5.283.
5. Continue this process of averaging and dividing until the desired level of precision is achieved. Continuing calculations iterate further.
By following these steps, you can find a decimal approximation for the square root of 28. Now, compare this approximate value to the given statements and determine which one is true.