Calculate the area, perimeter, diagonals, angles, height, and median of an isosceles trapezoid from two parallel sides and a leg or height. Includes visual bars, presets, and a formula reference ta...
An isosceles trapezoid is a quadrilateral with one pair of parallel sides (bases) and two equal-length non-parallel sides (legs). Because the legs are equal, the shape is symmetric about the perpendicular bisector of the bases, giving it equal base angles and equal diagonals—properties that make it one of the most elegant quadrilaterals in geometry.
This calculator accepts either the two parallel sides plus the leg length, or the two parallel sides plus the perpendicular height, and computes every important metric: area, perimeter, diagonal length, height, median (midsegment), both pairs of angles, and an inradius approximation.
The area formula is straightforward: A = (a + b)/2 × h, where a and b are the parallel sides and h is the height. If you enter the leg instead of the height, the tool derives h = √(c² − ((a−b)/2)²) automatically.
Isosceles trapezoids appear everywhere—trapezoidal roof trusses, bridge cross-sections, handbag shapes, stadium seating layouts, and countless geometry problems. Eight presets let you jump to common configurations, a bar chart compares all dimensions visually, and a formula reference table summarises every relationship so you never need to look them up. Whether you are a student, architect, or craftsperson, this calculator provides complete, accurate results in a single step.
Isosceles Trapezoid problems often require several dependent steps, and a small arithmetic slip can propagate through every derived value. This calculator is tailored to that workflow: you enter parallel side a (value), parallel side b (value), decimal places, and it returns area, perimeter, diagonal, height in one consistent pass. It is useful for homework checks, worksheet generation, tutoring walkthroughs, and fast field/design estimates where you need reliable geometry results without rebuilding the full derivation each time.
Area = (a + b)/2 × h. Height = √(c² − ((a−b)/2)²). Diagonal = √(a·b + c²). Perimeter = a + b + 2c. Median = (a + b)/2. Base angle = arctan(h / ((a−b)/2)).
Result: Area ≈ 32, height ≈ 4, diagonal ≈ 8.72
Height = √(25 − 4) = √21 ≈ 4.58. Area = (10+6)/2 × 4.58 ≈ 36.66. Diagonal = √(60+25) ≈ 9.22. (Exact values depend on rounding.)
This isosceles trapezoid tool links the entered values (parallel side a (value), parallel side b (value), decimal places, input mode) to the target geometry relationships used in class and practice problems. Instead of solving each intermediate step manually, you can validate setup and arithmetic quickly while still tracing which measurements drive the final result.
Formula focus: the calculator formula
Isosceles Trapezoid shows up in school geometry, technical drafting, construction layout checks, and early engineering design estimates. When values are changed repeatedly, the calculator helps you compare scenarios quickly and see how sensitive the shape is to each dimension.
Start with the primary outputs (area, perimeter, diagonal, height) and then use the remaining cards/tables to confirm consistency with your diagram. Keep units consistent across inputs, and round only at the end if your assignment or project specifies a fixed precision.
The two non-parallel sides (legs) are equal in length, creating a line of symmetry perpendicular to the bases. Use this as a practical reminder before finalizing the result.
Yes — equal leg lengths guarantee equal diagonals. This is one of the defining properties.
Yes. Every isosceles trapezoid is a cyclic quadrilateral (opposite angles sum to 180°).
h = √(c² − ((a−b)/2)²), where c is the leg and a, b are the parallel sides. Keep this note short and outcome-focused for reuse.
Then it is a parallelogram (specifically a rectangle if the legs are perpendicular). The height equals the leg in that case.
Under the inclusive definition of trapezoid (at least one pair of parallel sides), yes — a rectangle is an isosceles trapezoid with a = b. Apply this check where your workflow is most sensitive.