Root of 4 = 2, the root of the root of 9 = 3 = 3.5 ..................... 12.25
All previous issues are boxes full of numbers 2-3 - 9 - 3.5
But if we like to find the root of 3 = we find that number is not expired and non-periodic and numbers under the roots like the roots are called endocrine
Are the roots that can not be written in a compound fracture of Ahihama two numbers in the numerator and the other in place
Question to all is:
Proved that the root of the root of 3 or 5 is the root of any deaf can not be written in a fraction of the two numbers?
Solution:
Suppose that the root of 3 can be written in a break in the numerator and b in place so that a, b are the youngest two issues and there is no common factors between them that (a, b) = 1 then be equivalent
The equation
Root of 3 = a / b and from the following equation to be
3 = A × A / B × B and from
A × a = 3 × b × b ..................!!!!!!!!!!!!
Contradiction
Is that a × a is divided by 3 and also a × a is divided by 9 because the number of square
And it wa impossible to book (Root 3) in the number of fractional
اسف يا سليمان بس لاتنسى ان الستاذ قال من العربي الى النجليزي
All previous issues are boxes full of numbers 2-3 - 9 - 3.5
But if we like to find the root of 3 = we find that number is not expired and non-periodic and numbers under the roots like the roots are called endocrine
Are the roots that can not be written in a compound fracture of Ahihama two numbers in the numerator and the other in place
Question to all is:
Proved that the root of the root of 3 or 5 is the root of any deaf can not be written in a fraction of the two numbers?
Solution:
Suppose that the root of 3 can be written in a break in the numerator and b in place so that a, b are the youngest two issues and there is no common factors between them that (a, b) = 1 then be equivalent
The equation
Root of 3 = a / b and from the following equation to be
3 = A × A / B × B and from
A × a = 3 × b × b ..................!!!!!!!!!!!!
Contradiction
Is that a × a is divided by 3 and also a × a is divided by 9 because the number of square
And it wa impossible to book (Root 3) in the number of fractional
اسف يا سليمان بس لاتنسى ان الستاذ قال من العربي الى النجليزي