Trapezoid Area Calculator
Calculate the area, perimeter, and height of a trapezoid from base and side lengths. Enter values for instant results with step-by-step formulas.
Formula
A = (1/2)(b1 + b2) x h
Where A is the area, b1 and b2 are the lengths of the two parallel sides (bases), and h is the perpendicular height between the bases. The formula effectively calculates the area as the average of the two bases multiplied by the height, which equals the midsegment length times the height.
Worked Examples
Example 1: Standard Trapezoid Area
Problem: Find the area, perimeter, and median of a trapezoid with bases 10 cm and 6 cm, height 4 cm, and equal sides of 5 cm.
Solution: Area = (10 + 6) / 2 x 4 = 16 / 2 x 4 = 8 x 4 = 32 cm^2\nPerimeter = 10 + 6 + 5 + 5 = 26 cm\nMedian = (10 + 6) / 2 = 8 cm\nDiagonal 1 = sqrt((2+6)^2 + 4^2) = sqrt(64+16) = sqrt(80) = 8.944 cm\nDiagonal 2 = sqrt((10-2)^2 + 4^2) = sqrt(64+16) = 8.944 cm (isosceles)\nBase angle = arctan(4/2) = 63.43 degrees
Result: Area: 32 cm^2 | Perimeter: 26 cm | Median: 8 cm | Diagonals: 8.944 cm each
Example 2: Right Trapezoid Calculation
Problem: A right trapezoid has bases of 12 m and 8 m, height of 5 m, a perpendicular side of 5 m, and a slanted side. Find its properties.
Solution: Area = (12 + 8) / 2 x 5 = 10 x 5 = 50 m^2\nSlanted side = sqrt(5^2 + (12-8)^2) = sqrt(25 + 16) = sqrt(41) = 6.403 m\nPerimeter = 12 + 8 + 5 + 6.403 = 31.403 m\nMedian = (12 + 8) / 2 = 10 m\nRight angles: 90 degrees at perpendicular side
Result: Area: 50 m^2 | Perimeter: 31.4 m | Slanted side: 6.4 m
Frequently Asked Questions
What is the formula for the area of a trapezoid?
The area of a trapezoid is calculated using the formula A = (1/2) times (base1 + base2) times height, where base1 and base2 are the lengths of the two parallel sides and height is the perpendicular distance between them. This formula works because a trapezoid can be thought of as the average of two rectangles with widths equal to each base. Equivalently, the formula can be written as A = median times height, where the median (or midsegment) is the average of the two bases. For example, a trapezoid with bases of 10 and 6 centimeters and a height of 4 centimeters has an area of (10 + 6) / 2 times 4 = 32 square centimeters. This formula applies to all trapezoids regardless of whether they are isosceles or right trapezoids.
What is the difference between a trapezoid and a parallelogram?
A trapezoid has exactly one pair of parallel sides, called the bases, while a parallelogram has two pairs of parallel sides. In a parallelogram, opposite sides are both parallel and equal in length, while in a trapezoid, only the two bases are parallel and they typically have different lengths. Every parallelogram can be considered a special case of a trapezoid where both pairs of sides are parallel. The area formula for a parallelogram is base times height, which is a simplified version of the trapezoid formula where both bases are equal. A rectangle is a special parallelogram with right angles, and a rhombus is a parallelogram with all sides equal. Understanding these relationships helps in selecting the correct formula for area calculations.
What is an isosceles trapezoid and what are its properties?
An isosceles trapezoid is a trapezoid where the two non-parallel sides (called legs) are equal in length. This symmetry gives it several special properties. The base angles are equal, meaning the two angles adjacent to each base are congruent. The diagonals are equal in length, unlike a general trapezoid where diagonals may differ. The perpendicular from the midpoint of one base to the other base bisects both bases. Isosceles trapezoids can be inscribed in a circle (they are cyclic quadrilaterals), which is not generally true for arbitrary trapezoids. The axis of symmetry passes through the midpoints of both bases. These properties make isosceles trapezoids common in architecture, bridge design, and decorative patterns.
How do I find the height of a trapezoid if I only know the sides?
If you know all four side lengths of a trapezoid, you can find the height using the Pythagorean theorem. Place the longer base a along the bottom and drop perpendicular lines from the endpoints of the shorter base b to the longer base. This creates two right triangles on the sides and a rectangle in the middle. The horizontal distance of each right triangle depends on the leg length and the difference between the bases. For an isosceles trapezoid with bases a and b and legs s, the height equals the square root of s squared minus ((a-b)/2) squared. For a general trapezoid, you need to solve a system involving both leg lengths. If you know the area and both bases, height = 2 times area divided by (base1 + base2).
What is the midsegment (median) of a trapezoid?
The midsegment or median of a trapezoid is the line segment connecting the midpoints of the two non-parallel sides (legs). Its length equals the arithmetic mean of the two bases, calculated as (base1 + base2) divided by 2. The midsegment is always parallel to both bases and divides the trapezoid into two smaller trapezoids of equal height. This property makes it extremely useful because the area of the trapezoid equals the median length times the height, providing a simpler way to think about the area formula. For a trapezoid with bases of 10 and 6 centimeters, the midsegment is (10 + 6) / 2 = 8 centimeters. The midsegment theorem is analogous to the midpoint theorem for triangles.
How do I calculate the diagonals of a trapezoid?
The diagonals of a trapezoid can be calculated using coordinate geometry. Place the trapezoid with the longer base along the x-axis from the origin to point (a, 0). The upper base extends from point (d, h) to point (d+b, h), where d is the horizontal offset of the left side and h is the height. Diagonal 1 connects (0, 0) to (d+b, h), giving length equal to the square root of (d+b) squared plus h squared. Diagonal 2 connects (a, 0) to (d, h), giving length equal to the square root of (a-d) squared plus h squared. For an isosceles trapezoid, d = (a-b)/2 and both diagonals are equal. The diagonals of a trapezoid generally have different lengths unless the trapezoid is isosceles.