Calculate the area, perimeter, slant side, diagonals, all four angles, and midsegment of a right trapezoid from two parallel sides and the height. Includes presets, visual bars, and a reference table.
A right trapezoid (also called a right trapezium in British English) is a quadrilateral with one pair of parallel sides and two adjacent right angles. It appears in ramps, retaining walls, roadway sections, and trim details where one side stays perpendicular while the opposite side tapers. Because one leg is already the height, the shape is easier to analyze than a general trapezoid while still carrying useful angle and diagonal information.
This calculator starts with the two parallel sides and the perpendicular height, then derives the rest of the figure: area, perimeter, slant side, diagonals, the midsegment, and the two non-right angles. That makes it useful for both geometry practice and real layout work, especially when you need more than a single area value.
Preset examples, side-comparison bars, angle visuals, and reference tables help you check how the shape behaves as the base difference widens or shrinks. That is especially helpful when you want to compare a nearly rectangular trapezoid with a more sharply tapered one.
A dedicated right trapezoid area calculator is valuable because area is usually only the first number you need. In practical work, the same dimensions also determine the slant side for cutting, the diagonals for layout verification, and the acute and obtuse angles for bend or saw settings. This tool packages those dependent measurements together so you can move from a quick sketch to a usable dimension set without reworking the same triangle repeatedly.
Area = ½ × (a + b) × h Slant side = √((b − a)² + h²) Perimeter = a + b + h + slant Diagonal₁ = √(b² + h²) Diagonal₂ = √(a² + h²) Midsegment = (a + b) / 2 Acute angle = arctan(h / (b − a)) Obtuse angle = 180° − acute angle
Result: Area = 16 cm², Perimeter ≈ 16.47 cm, Slant ≈ 4.47 cm
With parallel sides 3 cm and 5 cm and height 4 cm, the area is ½ × (3 + 5) × 4 = 16 cm². The horizontal offset is 5 − 3 = 2 cm, so the slant side is √(2² + 4²) = √20 ≈ 4.47 cm. Perimeter is 3 + 5 + 4 + 4.47 ≈ 16.47 cm, and the midsegment is (3 + 5) / 2 = 4 cm.
The area of a right trapezoid is easiest to understand by averaging the two parallel sides and then multiplying by the height. Geometrically, you can think of the shape as a rectangle plus a right triangle, or as two copies that combine into a rectangle-like figure. That perspective makes the formula feel less like a memorized rule and more like a direct consequence of how the shape is built.
In applied work, right trapezoids rarely stop at area. The slant side controls the length of a cut edge, diagonals help verify layout, and the two non-right angles determine slope transitions and connection details. If you are laying out a ramp side, a tapered form, or a retaining-wall profile, having those values together is much more useful than computing the area in isolation.
As the difference between the two parallel sides gets smaller, the trapezoid approaches a rectangle and the slant side approaches the height. As that difference grows, the acute angle becomes smaller and the obtuse angle opens up. This calculator lets you see that relationship quickly, which is helpful for checking whether a design is mildly tapered or aggressively sloped before you commit it to a drawing or cut list.
A right trapezoid has at least two right angles (90°). These occur where the perpendicular leg meets each of the two parallel sides.
Yes. When both parallel sides are equal (a = b), the right trapezoid becomes a rectangle with all four angles at 90° and no slant side.
Use the Pythagorean theorem: slant = √((b − a)² + h²). The difference (b − a) is the horizontal offset, and h is the vertical height.
No. A right trapezoid always has exactly two right angles (90°), one acute angle, and one obtuse angle. The acute and obtuse angles are supplementary.
The midsegment (or median) connects the midpoints of the two non-parallel sides. Its length equals the average of the two parallel sides: (a + b) / 2.
Each diagonal can be found using the Pythagorean theorem. Diagonal₁ = √(b² + h²) and Diagonal₂ = √(a² + h²), where b and a are the parallel sides adjacent to the right angle leg h.