# What is a quadrilateral triangle

Find the givens of the triangle. The givens are lengths of sides and measures of angles that are already known. You cannot find the measure of a triangle's side lengths unless you know the measure of one angle, one side and either another side or another angle.

Use the givens to determine whether the triangle is an ASA, AAS, SAS or ASS triangle. An ASA triangle has two angles as givens as well as the side connecting the two angles. An AAS triangle has two angles and a different side as givens. An SAS triangle has two sides as givens as well as the angle formed by the two sides. An ASS triangle has two sides and a different angle as the givens.

Use the law of sines to set up an equation relating the lengths of the sides if it is an ASA, AAS or ASS triangle. The law of sines states that the ratios of the sines of a triangle's angles and their opposite sides are equal: sin A / a = sin B / b = sin C / c, where a, b and c are the opposite side lengths of angles A, B and C, respectively.

For example, if you know two angles are 40 degrees and 60 degrees and the side joining them was 3 units long, you would set up the equation sin 80 / 3 = sin 40 / b = sin 60 / c (you know the angle opposite the side that is 3 units long is 80 degrees because the sum of a triangle's angles is 180 degrees).

Use the law of cosines to set up an equation relating the lengths of the sides if it is an SAS triangle. The law of cosines states that c^2 = a^2 + b^2 - 2ab_cos C. In other words, the square of the length of side c is equal to the squares of the other two side lengths minus the product of those two sides and the cosine of the angle opposite the unknown side. For example, if the two sides were 3 units and 4 units and the angle was 60 degrees, you would write the equation c^2 = 3^2 + 4^2 - 3_4*cos 60.

Solve for the variables in the equations to find the unknown triangle lengths. Solving for b in the equation sin 80 / 3 = sin 40 / b yields the value b = 3 sin 40 / sin 80, so b is approximately 2. Solving for c in the equation sin 80 / 3 = sin 60 / c yields the value c = 3 sin 60 / sin 80, so c is approximately 2.6. Similarly, solving for c in the equation c^2 = 3^2 + 4^2 - 3_4_cos 60 yields the value c^2 = 25 - 6, or c^2 = 19, so c is approximately 4.4.

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