Читать книгу An Introduction to the Finite Element Method for Differential Equations - Mohammad Asadzadeh - Страница 31

1 Problem 1.8 Show that satisfies Laplace's equation for .

2 Problem 1.9 Show that satisfies Laplace's equation , for .

3 Problem 1.10 Show that satisfies the Laplace equation in polar coordinates:

4 Problem 1.11 Verify thatboth satisfy the Laplace equation, and sketch the curves constant and constant. Show that

5 Problem 1.12 Show that satisfies the heat equation for .

6 Problem 1.13 Show that satisfies the heat equation , for .

7 Problem 1.14 The spherically symmetric form of the heat conduction equation is given byShow that satisfies the standard one‐dimensional heat equation.

8 Problem 1.15 Show that the equationcan be reduced to the standard heat conduction equation by writing . How do you interpret the term ?

9 Problem 1.16 Use the substitution to transform the one‐dimensional convection–diffusion equationinto a heat equation for .

10 Problem 1.17 If , let satisfyDerive the identity

11 Problem 1.18 Find the possible values of and in the expression such that it satisfies the wave equation

12 Problem 1.19 Taking , where is any function, find the values of that will ensure satisfies the wave equation

13 Problem 1.20 The spherically symmetric version of the wave equation takes the formShow, by putting , that it has a solution of the form

14 Problem 1.21 Let and . Use the chain rule to show that

15 Problem 1.22 Show that the solution of the initial value problemsatisfies d'Alembert's formula: