5/6 7/6 8/6 9/6 and 10/6
No, improper fractions (ex: 3/2) are greater than one.
If you mean fractions, three eighths is greater than one eighth. That could also be read as 3 minus 8 (-5) is greater than 1 minus 8 (-7)
To compare fractions convert them to equivalent fractions having the same denominator. 1/2 = 4/8. By comparison of the numerators it can be seen that 4/8 is greater than 3/8. Therefore 1/2 is greater than 3/8.
The fraction with the greater denominator is less. For example, 1/2 is greater than 1/3 while 1/3 has the greater denominator.
There are an infinite number of fractions greater than 1/2. Examples are 3/4, 7/8, 5/9, etc. The only requirement is that the denominator is less than double the numerator.
No, improper fractions (ex: 3/2) are greater than one.
4/5, 5/6, 6/7 are all greater than 3/4
3/4, 4/5, 5/6 are all greater than 1/2
3/4 is greater than a half.
It is greater as for example 3/4 divided by 1/4 is equal to 3
Fractions greater than one-half have numerators larger than half of their denominators. For example, ( \frac{3}{5} ), ( \frac{2}{3} ), and ( \frac{5}{8} ) are all greater than ( \frac{1}{2} ). Generally, any fraction ( \frac{a}{b} ) where ( a > \frac{b}{2} ) is considered greater than one-half.
infinite number of fractions can have d sum greater than 3 over 4. the condition will be x+y>3 over 4;thus the fractions can be positive or negative andthe answer will be infinite.
This is simply not true.Consider 2/9 and 2/3Then (2/9) / (2/3) = (2/9)*(3/2) = 1/3and the last time I looked, 1/3 was not greater than 2/3.So, if it is not greater than one fraction, it cannot be greater than both.
2/3 and 3/4
The two types of fractions are proper fractions, in which the numerator is smaller than the denominator, and improper fractions, in which the numerator is equal to or larger than the denominator.
3/8 5/8 greater than less than or equal
That is simply not true. For example, consider the quotient of 2/9 and 2/3.(2/9) / (2/3) = (2*3)/(9*2) = 3/9 = 1/3 which, unless I am very much mistaken, is not greater than one of the fractions: namely 2/3.