Presentation is loading. Please wait.

Presentation is loading. Please wait.

The Infinite Square Well Now we are ready to solve the time independent Schrödinger equation (TISE) to get ψ(x) and E. (Recall Ψ(x,t) = ψ(x)e −i2  Et/h.

Published byKeira Fuller Modified over 9 years ago

Similar presentations

Presentation on theme: "The Infinite Square Well Now we are ready to solve the time independent Schrödinger equation (TISE) to get ψ(x) and E. (Recall Ψ(x,t) = ψ(x)e −i2  Et/h."— Presentation transcript:

1 The Infinite Square Well Now we are ready to solve the time independent Schrödinger equation (TISE) to get ψ(x) and E. (Recall Ψ(x,t) = ψ(x)e −i2  Et/h ) Since the particle can never be outside the box, this requires ψ(x) = 0 in x ≤ 0 and x ≥ a

2 Inside the box 0 < x < a, since U(x) = 0, the TISE becomes The 1-D TISE is a second-order ordinary differential equation which has a general solution of where A and B are any complex constants or ψ (x) =Asinkx+Bcoskx.

3 The constants A and B, and the energy E are determined by the boundary conditions (continuity requirements): ψ(0) = 0, ψ(a) = 0, and normalization Hence, the allowed values of E are

4 The solutions are As a collection, the functions  n (x) have some interesting and important properties: 1. They are alternately even and odd, with respect to the center of the well.  1 is even,  2 is odd,  3 is even, and so on.

5 2. As you go up in energy, each successive state has one more node (zero crossing).  1 has none (the end points don't count),  2 has one,  3 has two, and so on. 3. They are mutually orthogonal, in the sense that whenever m≠n; 4. They are complete, in the sense that any other function, f(x), can be expressed as a linear combination of them:

6 The expansion coefficients (c n ) can be evaluated--for a given f(x)--by a method I call Fourier's trick, which beautifully exploits the orthonormality of {  n }: Multiply both sides of Equation by  m *(x), and integrate. These four properties are extremely powerful, and they are not peculiar to the infinite square well.

Download ppt "The Infinite Square Well Now we are ready to solve the time independent Schrödinger equation (TISE) to get ψ(x) and E. (Recall Ψ(x,t) = ψ(x)e −i2  Et/h."

Similar presentations

Linear Equations Unit.  Lines contain an infinite number of points.  These points are solutions to the equations that represent the lines.  To find.

Linear Equations Unit.  Lines contain an infinite number of points.  These points are solutions to the equations that represent the lines.  To find.
Solving Linear Equations Rule 7 ‑ 1: We can perform any mathematical operation on one side of an equation, provided we perform the same operation on the.

Solving Linear Equations Rule 7 ‑ 1: We can perform any mathematical operation on one side of an equation, provided we perform the same operation on the.
Ch 5.6: Series Solutions Near a Regular Singular Point, Part I

Ch 5.6: Series Solutions Near a Regular Singular Point, Part I
Chapter 3 Formalism. Hilbert Space Two kinds of mathematical constructs - wavefunctions (representing the system) - operators (representing observables)

Chapter 3 Formalism. Hilbert Space Two kinds of mathematical constructs - wavefunctions (representing the system) - operators (representing observables)
Boyce/DiPrima 9th ed, Ch 11.2: Sturm-Liouville Boundary Value Problems Elementary Differential Equations and Boundary Value Problems, 9th edition, by.

Boyce/DiPrima 9th ed, Ch 11.2: Sturm-Liouville Boundary Value Problems Elementary Differential Equations and Boundary Value Problems, 9th edition, by.
LECTURE 16 THE SCHRÖDINGER EQUATION. GUESSING THE SE.

LECTURE 16 THE SCHRÖDINGER EQUATION. GUESSING THE SE.
Linear Equations with Different Kinds of Solutions

Linear Equations with Different Kinds of Solutions
A) Find the velocity of the particle at t=8 seconds. a) Find the position of the particle at t=4 seconds. WARMUP.

A) Find the velocity of the particle at t=8 seconds. a) Find the position of the particle at t=4 seconds. WARMUP.
Solving quadratic equations Factorisation Type 1: No constant term Solve x 2 – 6x = 0 x (x – 6) = 0 x = 0 or x – 6 = 0 Solutions: x = 0 or x = 6 Graph.

Solving quadratic equations Factorisation Type 1: No constant term Solve x 2 – 6x = 0 x (x – 6) = 0 x = 0 or x – 6 = 0 Solutions: x = 0 or x = 6 Graph.
10-3: Solving Quadratic Equations

10-3: Solving Quadratic Equations
Section 8.1 Completing the Square. Factoring Before today the only way we had for solving quadratics was to factor. x 2 - 2x - 15 = 0 (x + 3)(x - 5) =

Section 8.1 Completing the Square. Factoring Before today the only way we had for solving quadratics was to factor. x 2 - 2x - 15 = 0 (x + 3)(x - 5) =
SOLVING QUADRATIC EQUATIONS COMPLETING THE SQUARE Goal: I can complete the square in a quadratic expression. (A-SSE.3b)

SOLVING QUADRATIC EQUATIONS COMPLETING THE SQUARE Goal: I can complete the square in a quadratic expression. (A-SSE.3b)
Warm Up #4 1. Evaluate –3x – 5y for x = –3 and y = 4. –11 ANSWER

Warm Up #4 1. Evaluate –3x – 5y for x = –3 and y = 4. –11 ANSWER
Differential Equations Brannan Copyright © 2010 by John Wiley & Sons, Inc. All rights reserved. Chapter 10: Boundary Value Problems and Sturm– Liouville.

Differential Equations Brannan Copyright © 2010 by John Wiley & Sons, Inc. All rights reserved. Chapter 10: Boundary Value Problems and Sturm– Liouville.
ORDINARY DIFFERENTIAL EQUATION (ODE) LAPLACE TRANSFORM.

ORDINARY DIFFERENTIAL EQUATION (ODE) LAPLACE TRANSFORM.
Physics 3 for Electrical Engineering

Physics 3 for Electrical Engineering
Sullivan Algebra and Trigonometry: Section 12.1 Systems of Linear Equations Objectives of this Section Solve Systems of Equations by Substitution Solve.

Sullivan Algebra and Trigonometry: Section 12.1 Systems of Linear Equations Objectives of this Section Solve Systems of Equations by Substitution Solve.
SOLVING SYSTEMS OF LINEAR EQUATIONS BY ELIMINATION Section 17.3.

SOLVING SYSTEMS OF LINEAR EQUATIONS BY ELIMINATION Section 17.3.
1.3 The Intersection Point of Lines System of Equation A system of two equations in two variables looks like: – Notice, these are both lines. Linear Systems.

1.3 The Intersection Point of Lines System of Equation A system of two equations in two variables looks like: – Notice, these are both lines. Linear Systems.
 The Distributive Property states that multiplying a sum by a number gives the same result as multiplying each addend by the number and then adding the.

 The Distributive Property states that multiplying a sum by a number gives the same result as multiplying each addend by the number and then adding the.

Similar presentations

Ads by Google