It is true, as long as the fractions are positive, but it gets a bit algebraic and tricky to set out clearly!

The fractions could be a/b and c/d, with a/b being less than c/d. A fraction formed in the way you've said is (a+c)/(b+d).

We need to show that (a+c)/(b+d) is larger than a/b i.e.

(a+c)/(b+d) > a/b

Assuming b and (b+d) are positive, we can cross multiply to get.

b(a+c)>a(b+d), or ba + bc > ab + ad

the ba and ab cancel, to give

bc > ad

dividing (as long as d and b are positive), this gives

c/d>a/b, which is true from our first assumption.

The same logic can be used to show that the new fraction is less than c/d.

Hope this helps!