Calculate the area, perimeter, angles, and diagonal of any quadrilateral. Enter four sides and one diagonal to compute properties and classify the shape.
A quadrilateral is any four-sided polygon — from everyday rectangles and squares to irregular shapes with no equal sides or angles. Understanding their properties matters for geometry courses, architectural design, land surveying, and countless practical applications. Our Quadrilateral Calculator accepts four side lengths and one diagonal, then splits the shape into two triangles to compute the total area via Heron's formula, perimeter, interior angles at the diagonal vertices, and an estimate of the second diagonal. It also classifies the shape: square, rectangle, parallelogram, rhombus, trapezoid, kite, or general quadrilateral. Eight presets — including classic rectangles, parallelograms, and irregular quads — make it easy to explore different configurations with one click. A reference table summarises the seven main quadrilateral types along with their side, angle, and diagonal properties. Visual comparison bars let you instantly see side-length relationships, while an area-split bar shows how the diagonal divides the figure. Whether you are a student studying polygon properties, a land surveyor computing plot areas, or a designer laying out floor plans, this tool gives you complete quadrilateral analysis in seconds.
This calculator is useful when you know the side lengths around a four-sided figure and one diagonal, but do not want to rebuild the geometry from scratch every time. It quickly turns those measurements into area, perimeter, angle estimates, and a practical shape classification, which makes it helpful for homework checks, sketch validation, and early-stage layout work.
It is also a good teaching tool because it shows how a quadrilateral can be decomposed into two triangles. That makes the connection between Heron's formula, the cosine rule, and quadrilateral properties much easier to see than when the problem is solved in isolated steps on paper.
Area = Heron(a, b, p) + Heron(c, d, p) Heron(x, y, z): s = (x+y+z)/2, A = √[s(s−x)(s−y)(s−z)] Perimeter = a + b + c + d Angle at a–b: cos⁻¹[(a² + b² − p²) / (2ab)]
Result: Area = 48 cm², perimeter = 28 cm, angle at a-b = 90°, classification = Parallelogram (possibly Rectangle).
Using sideA = 6, sideB = 8, sideC = 6, sideD = 8, and diagonal = 10 splits the quadrilateral into two 6-8-10 triangles. Each triangle has area 24, so the total area is 48 cm². The perimeter is 6 + 8 + 6 + 8 = 28 cm. Because the cosine-rule angle between sides a and b is 90°, the shape behaves like a rectangle, so the calculator reports it as a parallelogram that may also be a rectangle.
A general quadrilateral is not fixed by four side lengths alone. If you keep the same four sides but change the angle between them, the shape can flex and the area changes with it. That is why this calculator asks for one diagonal: the diagonal locks the figure into two specific triangles, so the geometry becomes solvable. Once those triangles are known, area, perimeter, and angle estimates can all be derived from standard triangle formulas.
This is the same idea used in field measurement and drafting. Surveyors often measure a parcel boundary plus a diagonal across the lot, because that extra line removes ambiguity and allows the plot to be broken into manageable triangles.', + '
The classification output is intentionally practical rather than overly strict. If all four sides are nearly equal, the figure behaves like a rhombus and might also be a square if the angles are right. If opposite sides match, the figure behaves like a parallelogram and might also be a rectangle. If two adjacent side pairs match, it resembles a kite. These labels help you identify what family your dimensions are closest to before moving on to more detailed proofs.
That matters in classwork and design work alike. A quick classification check can reveal whether a planned frame, panel, or plot layout is consistent with the shape you intended to create.', + '
If you already know a shape is a rectangle, trapezoid, or square, a dedicated formula is usually faster. The quadrilateral calculator becomes valuable when the figure is irregular or when you only have side-and-diagonal measurements from a sketch or real object. In those cases, the diagonal-splitting method is a reliable bridge between raw measurements and usable results.
It is especially helpful for architectural sketches, land parcels, framing layouts, and geometry exercises where the figure does not fit one neat textbook category. Rather than guessing which special-case formula applies, you can solve the shape from the information you actually measured.
A quadrilateral is a polygon with exactly four sides. Squares, rectangles, rhombi, parallelograms, trapezoids, and kites are all special types.
Divide it into two triangles using a diagonal, then compute each triangle's area with Heron's. Understanding this concept helps you apply the calculator correctly and interpret the results with confidence. formula and add them together.
It generalises Heron's formula to quadrilaterals: A = √[(s−a)(s−b)(s−c)(s−d) − abcd·cos²((α+γ)/2)], where s is the semi-perimeter and α, γ are opposite angles. Understanding this concept helps you apply the calculator correctly and interpret the results with confidence.
Four sides alone don't uniquely define a quadrilateral — the shape can flex. A diagonal (or two angles) fixes the geometry so area and angles can be computed. Understanding this concept helps you apply the calculator correctly and interpret the results with confidence.
The interior angles of any quadrilateral always sum to 360°. Understanding this concept helps you apply the calculator correctly and interpret the results with confidence.
By side and angle relationships: all sides equal → rhombus/square; opposite sides equal → parallelogram/rectangle; two pairs of adjacent equal sides → kite; one pair parallel → trapezoid. Understanding this concept helps you apply the calculator correctly and interpret the results with confidence.