Write the fraction below as a sum or difference.
(Simplify your answer. Use integers or fractions for any numbers in the expression.)
6-10x/5=
6 - 10x/5 can be simplified as follows:
6 - 10x/5 = 6 - 2x
So, the fraction 6 - 10x/5 can be written as the sum 6 - 2x.
To write the given fraction as a sum or difference, we need to simplify the expression on the right side of the equation.
First, let's simplify the numerator of the fraction: 6 - 10x.
The common denominator for 6 and 10x is 5. So, we need to express 6 with a denominator of 5:
6 = 6/1 = (6/1)*(5/5) = 30/5.
Now we can rewrite the numerator:
6 - 10x = 30/5 - 10x.
Next, we can combine the two terms by finding a common denominator:
30/5 - 10x = (30 - 5*10x)/5 = (30 - 50x)/5.
Therefore, the given fraction 6 - 10x/5 can be written as the sum or difference (30 - 50x)/5.