Calculate rotational kinetic energy stored in flywheels. Compare solid disk, hollow cylinder, and ring geometries with speed and material options.
The Flywheel Energy Calculator computes the rotational kinetic energy stored in a spinning flywheel based on its geometry, mass, and angular velocity. Flywheels store energy mechanically and are used in engines, UPS systems, grid-scale energy storage, and hybrid vehicles. It gives you a quick sense of how much stored energy changes when speed or rim mass changes. That makes it easier to compare designs before you commit to a speed range or containment design.
The stored energy depends on the moment of inertia (determined by shape and mass distribution) and the square of the angular velocity: E = ½Iω². This quadratic relationship means doubling the speed quadruples the energy — making high-speed flywheels extremely energy-dense. Modern composite flywheels spinning at 50,000+ RPM in vacuum enclosures can match or exceed battery energy density.
Enter your flywheel dimensions and speed to calculate stored energy in joules, watt-hours, and equivalent comparisons. The tool supports solid disks, hollow cylinders, and thin rings, and shows how energy scales with speed.
Use this calculator to compare flywheel shapes, check how much energy is really available across an RPM range, and see how strongly stored energy depends on rim speed. It is useful for drivetrain smoothing, regenerative systems, lab rigs, and rough feasibility checks on mechanical energy storage. That helps you judge whether a flywheel is the right size before you build or buy one.
E = ½Iω². Solid Disk: I = ½mr². Hollow Cylinder: I = ½m(r₁² + r₂²). Thin Ring: I = mr². Where E = energy (J), I = moment of inertia (kg·m²), ω = angular velocity (rad/s) = RPM × 2π/60, m = mass (kg), r = radius (m).
Result: 308,425 J (85.7 Wh)
I = ½ × 50 × 0.3² = 2.25 kg·m². ω = 5000 × 2π/60 = 523.6 rad/s. E = ½ × 2.25 × 523.6² = 308,425 J ≈ 308.4 kJ = 85.7 Wh. Equivalent to lifting about 31,400 kg by 1 meter.
The moment of inertia determines how much energy a flywheel stores at a given speed. For a solid disk, I = ½mr². For a hollow cylinder, I = ½m(r_outer² + r_inner²). For a thin ring (hoop), I = mr². Designers maximize I by concentrating mass at the largest possible radius — the rim-weighted flywheel. Advanced designs use stepped or tapered profiles to optimize the stress distribution while maximizing energy storage.
Beacon Power operates 20 MW flywheel plants for grid frequency regulation, using 200+ composite flywheels spinning at 16,000 RPM in vacuum. Each unit stores 25 kWh and responds in 4 seconds. Hybrid buses use flywheels for regenerative braking (Williams F1 KERS technology). Tokamak fusion experiments use massive steel flywheels storing gigajoules to power plasma heating pulses.
Steel flywheels (4340 or maraging steel) are economical and reliable up to ~200 m/s rim speed. Titanium alloy offers better specific strength. Carbon fiber composite flywheels achieve the highest specific energy — 200+ Wh/kg vs 5-10 Wh/kg for steel. The failure mode also differs: steel fails catastrophically (fragments), while composite flywheels fail progressively (delamination), making them inherently safer.
Practical energy storage ranges from millijoules (small instrument flywheels) to megajoules (grid-scale storage). A 1-ton steel flywheel at 3,000 RPM stores about 0.5-1 kWh. Advanced composite flywheels at 50,000 RPM can store 5-25 kWh per unit.
Engine flywheels smooth out the pulsating torque from individual cylinder firings. The flywheel absorbs energy during power strokes and releases it during non-power strokes, maintaining steady crankshaft rotation. Heavier flywheels smooth better but reduce responsiveness.
Centrifugal stress at the rim: σ = ρv², where v is rim speed. Steel fails around 200-300 m/s rim speed. Carbon fiber composites can reach 1,000+ m/s. Vacuum enclosures eliminate air drag. Magnetic bearings eliminate friction. The burst containment vessel adds weight and cost.
Flywheels excel at high power density (fast charge/discharge), long cycle life (unlimited cycles), wide temperature range, and no chemical degradation. Batteries win on energy density (Wh/kg) and cost per kWh. Flywheels are ideal for UPS, frequency regulation, and regenerative braking.
A flywheel can't be completely stopped (motors/generators have minimum operating speed). Usable energy = ½I(ω_max² - ω_min²). If min speed is 50% of max speed, usable energy is 75% of total stored energy.
A thin ring concentrates all mass at maximum radius, maximizing I for a given mass (I = mr²). A solid disk has I = ½mr². So a ring stores twice as much energy as a solid disk of the same mass and radius. This is why flywheel design pushes mass outward.