Energy Calculator
Calculate different types of mechanical energy
Kinetic Energy (KE = 0.5mv²)
Gravitational Potential Energy (PE = mgh)
Elastic Potential Energy (PE = 0.5kx²)
Energy from Power (E = Pt)
Energy Formulas
Kinetic Energy: KE = (1/2) * m * v²
Gravitational PE: PE = m * g * h
Elastic PE: PE = (1/2) * k * x²
Work-Energy: E = P * t
What is Energy?
Energy is the capacity to do work or cause change. It's one of the most fundamental concepts in physics and exists in many forms that can be converted from one to another.
| Energy Form | Description | Example |
|---|---|---|
| Kinetic | Energy of motion | Moving car, flying ball |
| Potential (gravitational) | Stored energy due to position | Rock on cliff, raised weight |
| Potential (elastic) | Stored in deformed objects | Compressed spring, stretched rubber band |
| Thermal | Internal energy from particle motion | Hot coffee, steam |
| Chemical | Stored in molecular bonds | Food, batteries, fuel |
| Electrical | From electric charge movement | Lightning, circuits |
| Nuclear | Stored in atomic nuclei | Nuclear reactor, sun |
The SI unit of energy is the Joule (J), equal to 1 kg·m²/s² or 1 N·m.
Energy Unit Definition
Where:
- J= Joule, SI unit of energy
- N·m= Newton-meter (force × distance)
- kg·m²/s²= Base SI units
Kinetic Energy
Kinetic energy is the energy an object possesses due to its motion:
| Relationship | Implication | Example |
|---|---|---|
| KE ∝ m | Double mass = double KE | Truck vs car at same speed |
| KE ∝ v² | Double speed = 4× KE | Car at 60 mph vs 30 mph |
| KE = ½mv² | Mass and velocity both matter | Bullet vs baseball |
| Object | Typical KE | Context |
|---|---|---|
| Walking person (70 kg, 1.4 m/s) | 69 J | Casual walking |
| Thrown baseball (0.145 kg, 40 m/s) | 116 J | Professional pitch |
| Car (1500 kg, 30 m/s) | 675,000 J | Highway speed (~108 km/h) |
| Commercial aircraft | ~3 billion J | At cruising speed |
Kinetic Energy Formula
Where:
- KE= Kinetic energy (Joules)
- m= Mass (kg)
- v= Velocity (m/s)
Potential Energy
Potential energy is stored energy due to an object's position or configuration:
| Type | Formula | Depends On | Example |
|---|---|---|---|
| Gravitational PE | PE = mgh | Mass, height, gravity | Water behind dam |
| Elastic PE | PE = ½kx² | Spring constant, compression | Compressed spring |
| Electric PE | PE = kq₁q₂/r | Charges, distance | Charged particles |
| Chemical PE | Varies by bonds | Molecular structure | Gasoline, food |
Reference point: Potential energy is always measured relative to a reference point. Ground level is often chosen as h = 0 for gravitational PE.
Gravitational Potential Energy
Where:
- PE= Potential energy (J)
- m= Mass (kg)
- g= Gravitational acceleration (9.81 m/s²)
- h= Height above reference (m)
Work-Energy Theorem
The work-energy theorem connects work and kinetic energy:
| Concept | Formula | Meaning |
|---|---|---|
| Work done | W = Fd cos(θ) | Force × displacement × cos(angle) |
| Work-energy theorem | W_net = ΔKE | Net work equals KE change |
| Positive work | W > 0 | Increases KE (speeds up) |
| Negative work | W < 0 | Decreases KE (slows down) |
Application: When calculating how much energy is needed to accelerate an object, use W = ΔKE = ½mv_f² - ½mv_i²
Work-Energy Theorem
Where:
- W_net= Net work done (J)
- ΔKE= Change in kinetic energy
- v_f, v_i= Final and initial velocities
Conservation of Energy
The Law of Conservation of Energy states that energy cannot be created or destroyed, only converted:
| Scenario | Energy Conversion | Equation |
|---|---|---|
| Falling object | PE → KE | mgh = ½mv² |
| Thrown ball rising | KE → PE | ½mv² = mgh |
| Pendulum | PE ↔ KE (cyclic) | E_total = constant |
| Roller coaster | PE ↔ KE with friction loss | E_mech - E_friction = E_final |
Mechanical energy: E_mech = KE + PE. In absence of friction, mechanical energy is conserved.
Conservation of Mechanical Energy
Where:
- KE + PE= Total mechanical energy
- Subscripts 1, 2= Initial and final states
Energy Units and Conversions
Energy is measured in various units depending on the application:
| Unit | Symbol | Equivalent in Joules | Common Use |
|---|---|---|---|
| Joule | J | 1 | Physics, SI standard |
| Calorie | cal | 4.184 | Chemistry, older nutrition |
| Kilocalorie | kcal (Cal) | 4,184 | Food nutrition labels |
| Kilowatt-hour | kWh | 3,600,000 | Electricity billing |
| Electron-volt | eV | 1.602 × 10⁻¹⁹ | Particle physics |
| British thermal unit | BTU | 1,055 | HVAC, heating |
| Foot-pound | ft·lb | 1.356 | Engineering (US) |
Note: The "Calorie" on food labels (capital C) is actually a kilocalorie (1000 calories).
Mass-Energy Equivalence
Einstein's famous equation relates mass and energy:
| Concept | Value | Implication |
|---|---|---|
| Speed of light (c) | 299,792,458 m/s | c² = 9 × 10¹⁶ m²/s² |
| 1 kg of mass | 9 × 10¹⁶ J | ~21 megatons TNT equivalent |
| 1 gram of mass | 9 × 10¹³ J | ~21 kilotons TNT |
| Nuclear fission efficiency | ~0.1% mass converted | Still enormous energy |
In practice: Nuclear reactions convert a tiny fraction of mass to energy, but c² is so large that the energy released is enormous.
Mass-Energy Equivalence
Where:
- E= Energy (Joules)
- m= Mass (kg)
- c= Speed of light (299,792,458 m/s)
Worked Examples
Kinetic Energy of a Vehicle
Problem:
A 1,200 kg car is traveling at 25 m/s (90 km/h). Calculate its kinetic energy.
Solution Steps:
- 1Identify values: m = 1,200 kg, v = 25 m/s
- 2Apply KE formula: KE = ½mv²
- 3Substitute: KE = ½ × 1,200 × 25²
- 4Calculate: KE = ½ × 1,200 × 625 = 375,000 J
- 5Express in kJ: KE = 375 kJ
Result:
Kinetic energy = 375,000 J (375 kJ)
Potential Energy at Height
Problem:
A 50 kg object is lifted to a height of 20 meters. What is its gravitational potential energy?
Solution Steps:
- 1Given: m = 50 kg, g = 9.81 m/s², h = 20 m
- 2Apply PE formula: PE = mgh
- 3Substitute: PE = 50 × 9.81 × 20
- 4Calculate: PE = 9,810 J
Result:
Potential energy = 9,810 J (≈ 9.81 kJ)
Conservation of Energy - Falling Object
Problem:
A 2 kg ball is dropped from 10 meters. What is its velocity just before hitting the ground?
Solution Steps:
- 1Initial: PE = mgh = 2 × 9.81 × 10 = 196.2 J, KE = 0
- 2Final: PE = 0, KE = 196.2 J (conservation)
- 3Solve for v: ½mv² = 196.2
- 4v² = 2 × 196.2 / 2 = 196.2
- 5v = √196.2 = 14 m/s
Result:
Final velocity = 14 m/s (≈ 50 km/h)
Tips & Best Practices
- ✓KE = ½mv²: Doubling velocity quadruples kinetic energy, but doubling mass only doubles it
- ✓PE = mgh: Potential energy depends on your choice of reference point (usually ground level)
- ✓Conservation: In closed systems without friction, total mechanical energy (KE + PE) stays constant
- ✓Unit conversions: 1 kWh = 3.6 MJ, 1 Cal (food) = 4.184 kJ, 1 BTU = 1.055 kJ
- ✓Efficiency: Real systems always lose some energy to heat due to friction and other factors
- ✓Work = Force × Distance: Energy is transferred when forces act over distances
- ✓E = mc²: Mass and energy are equivalent; tiny mass = enormous energy due to c²
Frequently Asked Questions
Sources & References
Last updated: 2026-01-22