Math, asked by vaishnavi7211, 7 months ago

what is the easy way to calculate square root​

Answers

Answered by drishtidarshandudhe
1

STEP 1: Separate The Digits Into Pairs

To begin, let's organize the workspace. We will divide the space into three parts. Then, let’s separate the number’s digits into pairs moving from right to left.

For example, the number 7,469.17 becomes 74  69.  17. Or in the case of a number with an odd amount of digits such as 19,036, we will start with 1  90  36.

In our case here, 2,025 becomes 20  25.

STEP 2: Find The Largest Integer

As the next step, we need to find the largest integer (i) whose square is less than or equal to the leftmost number.

In our current example the leftmost number is 20. Since 4² = 16 <= 20 and 5² = 25 > 20, the integer in question is 4. Let’s deposit 4 to the top-right corner and 4² = 16 to the bottom right one.

STEP 3: Now Subtract That Integer

Now we need to subtract the square of that integer (which equals 16) from the leftmost number (which equals 20). The result equals 4 and we will write it as shown above.

STEP 4: Let's Move To The Next Pair

Next, let's move down the next pair in our number (which is 25). We write it next to the subtracted value already there (which is 4).

Now multiply the number in the top right corner (which is also 4) by 2. This results in 8 and we write it in the bottom right corner followed by  _ x _ =

STEP 5: Find The Right Match

Time to fill in each blank space with the same integer (i). It must be the largest possible integer that allows the product to be less than or equal the number on the left.

For example, if we choose the number 6, the first number becomes 86 (8 and 6) and we must also multiply it by 6. The result 516 is greater than 425, so we go lower and try 5. The number 8 and the number 5 give us 85. 85 times 5 results in 425, which is exactly what we need.

Write 5 next to 4 in the top right corner. It is the second digit in the root.

STEP 6: Subtract Again

Subtract the product we calculated (which is 425) from the current number on the left (also 425). The result is zero, which means the task is complete.

Note: I chose a perfect square (2025 = 45 x 45) on purpose. This way I could show the rules for solving square root problems.

In reality, numbers consist of many digits, including the ones after the decimal point. In that case we repeat steps 4, 5 and 6 until we reach any accuracy we want.

The next example explains what I mean.

EXAMPLE: We dig deeper...

This time the number consists of an odd number of digits including the ones after the decimal point.

As we saw in this example, the process can repeat several times over to reach a desired level of accuracy.

Answered by Anonymous
5

Example: Find the square root of 4489.

●We group the last pair of digits, and the rest of the digits together.

●Now, since the unit digit of 4489 is 9.

●So we can say that the unit digit of its square root will be either 3 or 7.

●Now consider the first two digits i.e. 44.

●Since 44 comes in between the squares of 6 and 7 (i.e. 62 < 44 < 72), so we can definitely say that the ten’s digit of the square root of 4489 will be 6.

●So far, we can say that the square root will be either 63 or 67.

●Now we let’s proceed to find the exact unit digit.

●To find the exact unit digit, we consider the ten’s digit i.e. 6 and the next term i.e. 7.

●Multiply these two terms

●Since 44 is greater than 42. So square root of 4489 will be the bigger of the two options i.e. 67.

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