Here we will show you two methods that you can use to simplify the square root of 50752. In other words, we will show you how to find the square root of 50752 in its simplest radical form using two different methods.
To be more specific, we have created an illustration below showing what we want to calculate. Our goal is to make "A" outside the radical (√) as large as possible, and "B" inside the radical (√) as small as possible.
√50752 = A√B
Greatest Perfect Square Factor Method
The Greatest Perfect Square Factor Method uses the greatest perfect square factor of 50752 to simplify the square root of 50752. This is how to calculate A and B using this method:
A = Calculate the square root of the greatest perfect square from the list of all factors of 50752. The factors of 50752 are 1, 2, 4, 8, 13, 16, 26, 32, 52, 61, 64, 104, 122, 208, 244, 416, 488, 793, 832, 976, 1586, 1952, 3172, 3904, 6344, 12688, 25376, and 50752. Furthermore, the greatest perfect square on this list is 64 and the square root of 64 is 8. Therefore, A equals 8.
B = Calculate 50752 divided by the greatest perfect square from the list of all factors of 50752. We determined above that the greatest perfect square from the list of all factors of 50752 is 64. Furthermore, 50752 divided by 64 is 793, therefore B equals 793.
Now we have A and B and can get our answer to 50752 in its simplest radical form as follows:
√50752 = A√B
√50752 = 8√793
Double Prime Factor Method
The Double Prime Factor Method uses the prime factors of 50752 to simplify the square root of 50752 to its simplest form possible. This is how to calculate A and B using this method:
A = Multiply all the double prime factors (pairs) of 50752 and then take the square root of that product. The prime factors that multiply together to make 50752 are 2 x 2 x 2 x 2 x 2 x 2 x 13 x 61. When we strip out the pairs only, we get 2 x 2 x 2 x 2 x 2 x 2 = 64 and the square root of 64 is 8. Therefore, A equals 8.
B = Divide 50752 by the number (A) squared. 8 squared is 64 and 50752 divided by 64 is 793. Therefore, B equals 793.
Once again we have A and B and can get our answer to 50752 in its simplest radical form as follows:
√50752 = A√B
√50752 = 8√793
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