# What is the Exact Square Root of 841?

What does square root mean? By definition, the square root of 841 is the number that, multiplied by itself, produces the given number 841. In this case, that number is 29.

Square root of 841 = **29**

The symbol √ is called**radix**, or **radical sign**

The number below

the radix is the **radicand**

## Is 841 a Perfect Square Root?

Yes. The square root of 841 is 29. Since 29 is a whole number, 841 is a perfect square.

Previous perfect square root is: 784

Next perfect square root is: 900

## The Prime Factors of 841 are:

29 × 29

## How Do You Simplify the Square Root of 841 in Radical Form?

The main point of simplification (to the simplest radical form of 841) is as follows: getting the number 841 inside the radical sign √ as low as possible.

841 = 29 × 29 = 29

Therefore, the answer is **29**.

## Is the Square Root of 841 Rational or Irrational?

Since 841 is a perfect square (it's square root will have no decimals), **it is a rational number**.

## The Babylonian (or Heron’s) Method (Step-By-Step)

Step | Sequencing |
---|---|

1 | In step 1, we need to make our first guess about the value of the square root of 841. To do this, divide the number 841 by 2. As a result of dividing 841/2, we get |

2 | Next, we need to divide 841 by the result of the previous step (420.5). Calculate the arithmetic mean of this value (2) and the result of step 1 (420.5). Calculate the error by subtracting the previous value from the new guess. Repeat this step again as the margin of error is greater than than 0.001 |

3 | Next, we need to divide 841 by the result of the previous step (211.25). Calculate the arithmetic mean of this value (3.9811) and the result of step 2 (211.25). Calculate the error by subtracting the previous value from the new guess. Repeat this step again as the margin of error is greater than than 0.001 |

4 | Next, we need to divide 841 by the result of the previous step (107.6156). Calculate the arithmetic mean of this value (7.8149) and the result of step 3 (107.6156). Calculate the error by subtracting the previous value from the new guess. Repeat this step again as the margin of error is greater than than 0.001 |

5 | Next, we need to divide 841 by the result of the previous step (57.7153). Calculate the arithmetic mean of this value (14.5715) and the result of step 4 (57.7153). Calculate the error by subtracting the previous value from the new guess. Repeat this step again as the margin of error is greater than than 0.001 |

6 | Next, we need to divide 841 by the result of the previous step (36.1434). Calculate the arithmetic mean of this value (23.2684) and the result of step 5 (36.1434). Calculate the error by subtracting the previous value from the new guess. Repeat this step again as the margin of error is greater than than 0.001 |

7 | Next, we need to divide 841 by the result of the previous step (29.7059). Calculate the arithmetic mean of this value (28.3109) and the result of step 6 (29.7059). Calculate the error by subtracting the previous value from the new guess. Repeat this step again as the margin of error is greater than than 0.001 |

8 | Next, we need to divide 841 by the result of the previous step (29.0084). Calculate the arithmetic mean of this value (28.9916) and the result of step 7 (29.0084). Calculate the error by subtracting the previous value from the new guess. Repeat this step again as the margin of error is greater than than 0.001 |

9 | Next, we need to divide 841 by the result of the previous step (29). Calculate the arithmetic mean of this value (29) and the result of step 8 (29). Calculate the error by subtracting the previous value from the new guess. Stop the iterations as the margin of error is less than 0.001 |

Result | ✅ We found the result: 29 In this case, it took us nine steps to find the result. |