There is only one possible solution.

There can be one, two, or no solutions.

The angles are always obtuse.

The triangle is always right-angled.

By dividing the opposite side by the hypotenuse.

By using cosine of angle A.

By equating the ratio of sides to the sine of angles.

By using tangent of angle C.

An angle that is always 90 degrees.

An angle used to find equivalent angles in different quadrants.

An angle that is always less than 45 degrees.

An angle that is always more than 180 degrees.

To find the longest side of the triangle.

To determine if both angles can form a valid triangle.

To calculate the area of the triangle.

To ensure the triangle is equilateral.

Calculate the area of the triangle.

Calculate the corresponding angle C for each case.

Determine the length of side A.

Find the perimeter of the triangle.

By using the cosine rule.

By measuring it directly.

By using the sine rule with the known angles and sides.

By using the Pythagorean theorem.

To find the area of the triangle.

To determine the correct triangle configuration.

To ensure the triangle is isosceles.

To calculate the hypotenuse.

Because the angles are always obtuse.

Because the triangle is always right-angled.

Because the sides are always equal.

Because both solutions are equally valid.

Calculating the area of the triangle.

Evaluating both possible solutions to determine the correct one.

Finding the longest side of the triangle.

Ensuring all angles are acute.

The angles are always acute.

The triangle is always equilateral.

Both solutions must be evaluated to find the correct triangle.

There is always one correct solution.