Express 2x/3-(x-1/4) as a single fraction

To express the expression 2x/3 - (x-1/4) as a single fraction, we need to combine the two fractions into one.

To do this, we need a common denominator for both fractions, which in this case would be 12, since both 3 and 4 divide into 12.

Multiplying the first fraction 2x/3 by 4/4, we get (8x/12).

Next, multiplying the second fraction (x-1/4) by 3/3, we get (3x-3/12).

Combining the fractions, we have (8x/12) - (3x-3/12).

Now, since both fractions have a common denominator of 12, we can combine the numerators: 8x - (3x-3) = 8x - 3x + 3 = 5x + 3.

Therefore, the expression 2x/3 - (x-1/4) can be expressed as a single fraction: (5x + 3)/12.