Maths Geometry Caluculator

Guide: Use * for multiplication

FLUX GEOMETRY PRO V2

What is a Geometry Calculator?

A Geometry Calculator bridges the gap between numbers and space. It solves for dimensions, angles, and volumes, turning complex spatial theorems into instant results.

✓ Calculates Area, Perimeter, & Volume
✓ Solves Pythagorean Theorem Instantly
✓ Handles Trigonometry (Sin, Cos, Tan)
✓ Supports 2D Shapes & 3D Solids

c = ?

a² + b² = c²

CALCULATED

FLUX GEOMETRY

Area of a Circle

The area of a circle is calculated using the formula $A = \pi r^2$. Here, $r$ represents the radius of the circle, and $\pi$ is a mathematical constant.

✓ Radius (r): The distance from the center to any point on the edge.
✓ Pi ($\pi$): Approximately equal to 3.14159.
✓ Flux Calculator provides high-precision results for radial math.

A = πr²

CIRCLE GEOMETRY

FLUX RADIAL

Triangle Analysis

The most fundamental shape in geometry. To find the area of any triangle, we use the formula A = ½ × b × h, where $b$ is the base and $h$ is the vertical height.

✓ Base (b): The bottom edge or any chosen side.
✓ Height (h): The perpendicular distance to the opposite vertex.
✓ Supports Equilateral, Isosceles, and Scalene calculations.

h b

A = ½ × b × h

TRIANGULAR LOGIC

FLUX DELTA

Parallelogram Logic

A quadrilateral with two pairs of parallel sides. The area is simply the product of its base and its perpendicular height: Area = b × h.

✓ Perpendicular Height: Always measured at a 90° angle to the base.
✓ Opposite Angles: Flux Geometry automatically calculates vertex angles.
✓ Symmetry: Handles Rhombus and Rectangle special cases.

Area = b × h

QUADRILATERAL MODE

FLUX PARALLEL

Pythagorean Theorem

The fundamental relation in Euclidean geometry among the three sides of a right triangle. It states that the square of the hypotenuse is equal to the sum of the squares of the other two sides: a² + b² = c².

✓ Hypotenuse (c): The longest side, opposite the right angle.
✓ Right Angle (90°): Essential for the theorem to apply.
✓ Distance Calculation: Used in GPS, architecture, and physics.

a b c

[Image of the Pythagorean theorem formula with a right-angled triangle]

a² + b² = c²

ORTHOGONAL MODE

FLUX HYPOTENUSE

Trapezium Analysis

A quadrilateral with at least one pair of parallel sides. The area is determined by the average of the two bases multiplied by the height: A = ½(a+b)h.

✓ Parallel Bases (a & b): The top and bottom parallel edges.
✓ Vertical Height (h): The direct distance between the parallel lines.
✓ Flux handles Isosceles and Right-angled trapeziums with ease.

a b h

[Image of area of a trapezium formula with diagram]

A = ½(a+b)h

TRAPEZOIDAL MODE

FLUX TRAPEZIUM

Volume Analysis

Volume measures the three-dimensional space an object occupies. For a perfect sphere, the capacity is calculated using: V = 4/3 π r³.

✓ Cubic Units: Results are always expressed in units cubed (e.g., $cm^3$).
✓ Radius Power: Volume increases exponentially as the radius grows.
✓ Flux handles Spheres, Cubes, and Cylindrical volumes.

V = 4/3 π r³

VOLUMETRIC MODE

FLUX VOLUME

Cubic Power x³

The cube of a number is the result of multiplying that number by itself twice (e.g.f(x) = x³,). In geometry, this represents the Volume of a Cube.

✓ Side Length (s): In a cube, all edges are equal (f(x) = x³).
✓ Rapid Growth: Cubic values grow much faster than squares.
✓ Flux handles large exponents with floating-point precision.

[Image of volume of a cube formula with diagram]

f(x) = x³

EXPONENTIAL MODE

FLUX CUBIC

Quick Reference Guide

Find the right formula for your Flux Geometry calculations.

Shape	Property	Formula	Flux Key
◯ Circle	Area	πr²	AREA ◯
△ Triangle	Area	½ × b × h	△ AREA
▱ Parallelogram	Area	b × h	▱ AREA
⏢ Trapezium	Area	½(a + b)h	SOLVE
◬ Right Triangle	Hypotenuse	√(a² + b²)	A²+B²
球 Sphere	Volume	4/3 πr³	VOL ◯

* Note: All height measurements (h) must be perpendicular to the base.