Identify the given length of one base, height of the trapezoid and the length of one nonparallel side. For example, assume a trapezoid is given with a height of 4 inches, one base equal to 6 inches, and a nonparallel side equal to 5 inches.
Identify the length of the diagonal. A diagonal is a line that extends from one corner to the opposite corner within a trapezoid. In an isosceles trapezoid, both diagonals are of equal length. However, only one length will be needed for the area calculation. In the example, assume the trapezoid has a diagonal length of 8 inches.
Use the Pythagorean theorem to determine the length of the unknown base. The Pythagorean theorem is used to identify the unknown sides of a right triangle and is of the general form a^2 + b^2 = c^2, where c is the hypotenuse and a and b are the two other sides. In the example, drawing the height line and the diagonal line extending from the same corner reveals two distinct right triangles. It can then be seen that the sum of the two unknown sides of these two triangles is the length of the unknown base. Therefore, using the Pythagorean theorem to find the two unknown sides and summing these values results in the length of the other base of the trapezoid.
1st Triangle:
(length of nonparallel side)^2 = (length of unknown side)^2 + (height of trapezoid)^2)
5^2 = (length of unknown side)^2 + 4^2
Length of unknown side = sprt (9) or 3 inches
2nd Triangle:
(length of diagonal)^2 = (height)^2 + (length of unknown side)^2
8^2 = 5^2 + (length of unknown side)^2
Length of unknown side = sqrt(39) or approximately 6 inches
Length of unknown base = 6 inches + 3 inches = 9 inches
Use the area of a trapezoid formula to find the area.
Area = (Base 1 + Base 2)/2 + Height
Area = (9 + 6)/2 * 4 = 30 inches^2
Understand that the way to do these problems is to divide the trapezoid into right triangles to determine the length of the unknown base. This type of problem can only be done if given sufficient information about the trapezoid.