We can use the Pythagorean theorem to find the length of AC:

\(3^{2} + 4^{2} = (AC)^{2}\)

\(9 + 16 = (AC)^{2}\)

\(25 = (AC)^{2}\)

\(5 = AC\)

We should also recognize this as a 3-4-5 triangle, one of the Pythagorean triplets.

In any case, we know that ADC is a right triangle, but we don't know which angle is the right angle. So, any of these three possibilities could be correct, depending on which side is the hypotenuse:

\(AD^{2} + DC^{2} = AC^{2}\)

\(AD^{2} + AC^{2} = DC^{2}\)

\(AC^{2} + DC^{2} = AD^{2}\)

Plug in AC = 5, and we get these possible equations:

\(AD^{2} + DC^{2} = 25\)

\(AD^{2} + 25 = DC^{2}\)

\(25 + DC^{2} = AD^{2}\)

I want to isolate the known value, 25:

\(25 = AD^{2} + DC^{2}\)

\(25 = DC^{2} - AD^{2}\)

\(25 = AD^{2} - DC^{2}\)

Now we can just plug in the answer choices. Clearly the first statement won't work, as 3 and 4 are much too small to add up to 25. Already that eliminates choices A, D, and E.

The second statement is pretty easy to eliminate as well, since 4² and 6² = 16 and 36, respectively. But no combination of adding or subtract 16 and 36 will give us an answer of 25. So Statement II must be false, and the answer must be C.