5) Fourier Series

Question 1

What is the prime period

Answer 1

The smallest possible a for which a periodic function holds

Question 2

What is a periodic function

Answer 2

Question 3

What are even and odd functions

Answer 3

Question 4

When is a function piecewise continuous

Answer 4

A function f(x) is said to be piecewise continuous if it is continuous except for jump discontinuities, and if the number of jump discontinuities on any finite interval, x ∈ [a, b], is finite

Question 5

What is a jump discontinuity

Answer 5

If the value of the function as we approach x = x0 from the left is different from the value as we approach x = x0 from the right

Question 6

What is a periodic extension of a function

Answer 6

Question 7

What is the inner dot product

Answer 7

Question 8

What are the defining properties of an inner product on a vector space

Answer 8

Question 9

What defines orthogonal and orthonormal bases in vector spaces

Answer 9

Question 10

What conditions must a set of three vectors satisfy to be used as a basis

Answer 10

• Non-zero
• Linearly independent

Question 11

How can any vector in an orthogonal basis of a vector space be represented using the inner product

Answer 11

Question 12

What is an inner product for real functions

Answer 12

Question 13

Describe the proof that the inner product for real functions is an inner product

Answer 13

Question 14

When are two functions orthogonal

Answer 14

Question 15

How are sine and cosine functions orthogonal on the interval [−L,L]

Answer 15

Question 16

What is a special property about odd functions

Answer 16

Question 17

Describe the proof that an odd function is zero on the domain [-L,L]

Answer 17

Question 18

Give a function on [-L,L] what is its Fourier Series

Answer 18

Question 19

How can the Fourier Series be rewritten

Answer 19

Question 20

What is Dirichlet’s theorem

Answer 20

Question 21

What are the implications for Fourier coefficients when a function is even or odd

Answer 21

Question 22

How can cosine functions be expressed using (−1)^n

Answer 22

cos(nπ)=(−1) ^n

Question 23

What are half-range Fourier series and what types can be computed when the function is known over half its range

Answer 23

Half-range series are employed when the function f is defined only over half of its typical range, commonly [0,L]
* Make f an odd function resulting in a Fourier sine series, because the series has only sine terms. We shall denote this function fS
* Make f an even function, resulting in a Fourier cosine series, because the series has only cosine terms. We shall denote this function fC
* Make f a periodic function with period L. We shall denote this function fP