Energy Graphs: Difference between revisions
No edit summary |
No edit summary |
||
| (9 intermediate revisions by 2 users not shown) | |||
| Line 1: | Line 1: | ||
Energy Graphs in Physics - ALAYNA HASHMI | |||
Energy graphs are one of the most powerful visualization tools in introductory physics. | |||
They allow you to understand motion, stability, forces, and energy conservation without needing detailed algebra. | |||
This page explains all major types of energy graphs used in Physics 1. | |||
1. What Is an Energy Graph? | |||
* An energy graph typically plots energy vs. position or energy vs. time. | |||
Common types include: | |||
* Potential energy vs position, U(x) | |||
* Kinetic energy vs position, K(x) | |||
* Total energy vs position, E(x) | |||
* Energy vs time, E(t), K(t), U(t) | |||
* Energy graphs help you: | |||
* visualize where forces act | |||
* identify stable / unstable equilibrium | |||
* determine allowed motion | |||
* find turning points | |||
* understand speed without equations | |||
2. Potential Energy Graphs U(x) | |||
Potential energy curves tell you everything about motion. | |||
Force from U(x) | |||
Force is the negative slope of U(x): | |||
F = – dU/dx | |||
if U slopes up, force points left | |||
if U slopes down, force points right | |||
Equilibrium Points | |||
Equilibrium occurs where the slope = 0. | |||
Minimum in U(x) → stable equilibrium | |||
Maximum in U(x) → unstable equilibrium | |||
3. Total Mechanical Energy: E = K + U | |||
Total energy E is constant for conservative systems. | |||
Motion is allowed only where: | |||
E ≥ U(x) | |||
Turning points occur where: | |||
E = U(x) | |||
At those points, K = 0 → the object momentarily stops. | |||
4. Kinetic Energy Graphs K(x) | |||
Since K = ½mv²: | |||
high K → fast motion | |||
low K → slow motion | |||
K = 0 → stopped | |||
K is always ≥ 0 | |||
From a potential-energy graph: | |||
K(x) = E – U(x) | |||
This allows you to sketch velocity without solving equations. | |||
5. The Most Important Shapes to Know | |||
A. Spring Potential Energy | |||
U(x) = ½ k x² → a parabola opening upward | |||
Key facts: | |||
minimum at x = 0 → stable | |||
total energy = horizontal line | |||
K(x) = difference between E and U(x) | |||
B. Gravitational Potential Energy (Near Earth) | |||
U = mgh → linear in height | |||
Great for sled/hill problems | |||
Important insight: | |||
Steeper does not mean faster. Only height difference determines final speed. | |||
C. Attractive Gravitational/Electric Potentials | |||
https://upload.wikimedia.org/wikipedia/commons/thumb/6/6e/Electric_potential_energy_attractive.svg/640px-Electric_potential_energy_attractive.svg.png | |||
This graph explains: | |||
bound systems (E < 0) | |||
escape energy (E = 0) | |||
unbound states (E > 0) | |||
D. Repulsive Electric Potentials | |||
Positive potential energy that decreases as r increases. | |||
https://upload.wikimedia.org/wikipedia/commons/thumb/4/45/Electric_potential_energy_repulsive.svg/640px-Electric_potential_energy_repulsive.svg.png | |||
Used in proton–proton problems. | |||
--- | |||
6. Bound vs Unbound Systems** | |||
### **Bound System** | |||
https://upload.wikimedia.org/wikipedia/commons/thumb/8/8f/Bound_state_potential.svg/640px-Bound_state_potential.svg.png | |||
* total energy E < 0 | |||
* object cannot escape to infinity | |||
* example: orbiting planet | |||
### **Unbound System** | |||
https://upload.wikimedia.org/wikipedia/commons/thumb/9/9e/Unbound_state_potential.svg/640px-Unbound_state_potential.svg.png | |||
* total energy E > 0 | |||
* object can escape | |||
* example: Voyager leaving the solar system | |||
### **Escape Speed Case** | |||
https://upload.wikimedia.org/wikipedia/commons/thumb/1/19/Escape_velocity_energy.svg/640px-Escape_velocity_energy.svg.png | |||
* E = 0 exactly | |||
* object asymptotically approaches v → 0 as r → ∞ | |||
--- | |||
7. How to Read Any Energy Graph** | |||
This is a checklist that helps on exams. | |||
* Where U is **low**, speed is **high** | |||
* Where U is **high**, speed is **low** | |||
* Where U = E → turning point | |||
* Slope of U → direction of force | |||
* Minimum of U → stable equilibrium | |||
* Maximum of U → unstable equilibrium | |||
* K(x) = E – U(x) always | |||
This allows you to solve conceptual problems quickly. | |||
--- | |||
8. Example Problems (Exam Style)** | |||
*Problem 1: Two Hills, Same Height** | |||
Which is faster at the bottom? | |||
**Same speed.** | |||
Only **height** matters, not steepness. | |||
--- | |||
Problem 2: Object Sliding in a Potential Well** | |||
Where is it fastest? | |||
**Where U is minimum.** | |||
--- | |||
Problem 3: Proton and Electron Released** | |||
Use attractive potential: | |||
* U is negative | |||
* object speeds up as U decreases | |||
* motion allowed where K = E – U ≥ 0 | |||
--- | |||
9. Interactive Simulation (GlowScript/VPython)** | |||
``` | |||
<iframe src="https://trinket.io/glowscript/31d0f9ad9e" width="100%" height="600"></iframe> | |||
``` | |||
Students can: | |||
* adjust potential functions | |||
* launch particles | |||
* visualize total energy, potential, kinetic | |||
* see turning points and oscillations | |||
--- | |||
Latest revision as of 23:30, 2 December 2025
Energy Graphs in Physics - ALAYNA HASHMI
Energy graphs are one of the most powerful visualization tools in introductory physics. They allow you to understand motion, stability, forces, and energy conservation without needing detailed algebra. This page explains all major types of energy graphs used in Physics 1.
1. What Is an Energy Graph?
- An energy graph typically plots energy vs. position or energy vs. time.
Common types include:
- Potential energy vs position, U(x)
- Kinetic energy vs position, K(x)
- Total energy vs position, E(x)
- Energy vs time, E(t), K(t), U(t)
- Energy graphs help you:
- visualize where forces act
- identify stable / unstable equilibrium
- determine allowed motion
- find turning points
- understand speed without equations
2. Potential Energy Graphs U(x)
Potential energy curves tell you everything about motion.
Force from U(x)
Force is the negative slope of U(x):
F = – dU/dx
if U slopes up, force points left
if U slopes down, force points right
Equilibrium Points
Equilibrium occurs where the slope = 0.
Minimum in U(x) → stable equilibrium
Maximum in U(x) → unstable equilibrium
3. Total Mechanical Energy: E = K + U
Total energy E is constant for conservative systems.
Motion is allowed only where:
E ≥ U(x)
Turning points occur where:
E = U(x)
At those points, K = 0 → the object momentarily stops.
4. Kinetic Energy Graphs K(x)
Since K = ½mv²:
high K → fast motion
low K → slow motion
K = 0 → stopped
K is always ≥ 0
From a potential-energy graph:
K(x) = E – U(x)
This allows you to sketch velocity without solving equations.
5. The Most Important Shapes to Know
A. Spring Potential Energy
U(x) = ½ k x² → a parabola opening upward
Key facts:
minimum at x = 0 → stable
total energy = horizontal line
K(x) = difference between E and U(x)
B. Gravitational Potential Energy (Near Earth)
U = mgh → linear in height Great for sled/hill problems
Important insight:
Steeper does not mean faster. Only height difference determines final speed.
C. Attractive Gravitational/Electric Potentials
This graph explains:
bound systems (E < 0)
escape energy (E = 0)
unbound states (E > 0)
D. Repulsive Electric Potentials
Positive potential energy that decreases as r increases.
Used in proton–proton problems. ---
6. Bound vs Unbound Systems**
- **Bound System**
- total energy E < 0
- object cannot escape to infinity
- example: orbiting planet
- **Unbound System**
- total energy E > 0
- object can escape
- example: Voyager leaving the solar system
- **Escape Speed Case**
- E = 0 exactly
- object asymptotically approaches v → 0 as r → ∞
---
7. How to Read Any Energy Graph**
This is a checklist that helps on exams.
- Where U is **low**, speed is **high**
- Where U is **high**, speed is **low**
- Where U = E → turning point
- Slope of U → direction of force
- Minimum of U → stable equilibrium
- Maximum of U → unstable equilibrium
- K(x) = E – U(x) always
This allows you to solve conceptual problems quickly.
---
8. Example Problems (Exam Style)**
- Problem 1: Two Hills, Same Height**
Which is faster at the bottom?
- Same speed.**
Only **height** matters, not steepness.
---
Problem 2: Object Sliding in a Potential Well**
Where is it fastest?
- Where U is minimum.**
---
Problem 3: Proton and Electron Released**
Use attractive potential:
- U is negative
- object speeds up as U decreases
- motion allowed where K = E – U ≥ 0
---
9. Interactive Simulation (GlowScript/VPython)**
```
<iframe src="https://trinket.io/glowscript/31d0f9ad9e" width="100%" height="600"></iframe>
```
Students can:
- adjust potential functions
- launch particles
- visualize total energy, potential, kinetic
- see turning points and oscillations
---