Each statement alone give information about only one of the triangles; without information about the other triangle, it is impossible to prove or to disprove triangle congruence.

Assume both statements are true. For , it must hold that both  and . If , then since , then , and since , then . Therefore, . Similarly, if , then , and ; again, . Therefore,  the two statements together prove that  is false.

Assume both statements to be true. 

 and , so hypotenuse  can be calculated using the Pythagorean Theorem:

This establishes that  - that is, that the hypotenuses of triangles are congruent. This gives us one side congruence and one angle congruence, the right angles, between the triangles; however, we are not given any other side or angle congruences, so we cannot determine whether or not the triangles are congruent.

Assume Statement 1 only. By the Pythagorean Theorem, , so ; subsequently, , and one side congruence is proved. However, this, along with one angle congruence - the congruence of right angles  and  - is not enough to prove or disprove triangle congruence.

Assume Statement 2 only. By the Pythagorean Theorem, , so ; subsequently, , and one side congruence is proved. For the same reason as with Statement 1, this provides insufficient information.

The two statements together, however, are sufficient. Statements 1 and 2 estabish congruence between the hypotenuses and corresponding legs, respectively, setting up the conditions of the Hypotenuse-Leg Theorem. As a consequence, .

In any right triangle, the hypotenuse must have length greater than either leg. Therefore,   and .

Assume Statement 1 alone. For , it must hold that. However,  and , so . The statement proves that  is false. By a similar argument, Statement 2 proves  is false.

Assume Statement 1 alone. In any right triangle, the two acute angles are complementary. Therefore,  and  are complementary angles, as are  and  are complementary angles. Also, two angles complementary to the same angle are coongruent, so, since  and  are complementary angles,  and . From the congruences of all three pairs of corresponding angles, it follows that  and  are similar, but without any side comparisons, congruence between the triangles cannot be proved or disproved.

Assume Statement 2 alone. If , then corresponding sides are congruent, so  and . Therefore, . But Statement 2 tells us that this is false. Therefore, we can determine that  is a false statement.

Assume both statements are true. Statement 1 establishes that  has two congruent legs, making it a 45-45-90 triangle. Statement 2 establishes that  has a hypotenuse that has length  times that of a leg, making it also a 45-45-90 triangle. The triangles have the same angle measures, so they are similar by the Angle-Angle Postulate. However, we are not given any actual lengths or any relationship between the lengths of the corresponding sides of different triangles, so we cannot determine whether the triangles are congruent or not.

Assume Statement 1 only. By the Pythagorean Theorem, , so ; subsequently, , and one side congruence is proved. However, this, along with one angle congruence - the congruence of right angles  and  - is not enough to prove or disprove triangle congruence.

Assume Statement 2 only. By the Pythagorean Theorem, . Since , it follows that , and, subsequently, . Since, if , , it follows by contradiction that  is a false statement.

Assume Statement 1 alone is true. Since each right triangle is inscribed inside a circle, each of the right angles is inscribed in that circle, and each intercepts a semicircle. That makes the two hypotenuses of the triangles,  and , diameters; since they are on the same circle, their lengths are the same. However, no information is given about any of the other sides or angles, so no congruence can be proved or disproved.

Statement 2 alone gives us only congruence between one set of corresponding legs, which, along with one angle congruence, is insufficient to prove or to disprove triangler congruence.

Now assume both statements are true. From Statement 1, it follows that congruence of hypotenuses, and Statement 2 gives us congruence of corresponding legs; this sets up the conditions of the Hypotenuse-Leg Theorem, so it follows that .

Assume both statements are true. We show that both statements are insufficient to answer the question.

Suppose  and . 

 and , satisfying the conditions of Statement 2.

The area of a right triangle is half the product of the lengths of its legs. Each triangle therefore has as its area , making the areas the same; Statement 1 is satisfied.

Since corresponding legs of the triangles are congruent,  by the Side-Angle-Side Postulate.

Now, suppose  and . 

 and , satisfying the conditions of Statement 2.

The area of a right triangle is half the product of the lengths of its legs. Each triangle therefore has as its area , making the areas the same; Statement 1 is satisfied.

However,  and , so it is not true that .

Assume Statement 1 alone. The statement gives that all four legs of both triangles are congruent - specifically,  and . Since the right angles are also congruent, then, by the Side-Angle-Side Postulate, .

Assume Statement 2 alone. The statement gives that all four acute angles are congruent - specifically, that  and . However, since we do not have any congruence or noncongruence between corresponding sides, congruence of the triangles cannot be proved or disproved.