Chapter 7: Q12P (page 355)

Show that in (5.2 ) the average values of $s i n m x s i n n x$ and of $c o s m x c o s n x, m \neq n$ are zero (over a period), by using the complex exponential forms for the sines and cosines as in (5.2).

Short Answer

Expert verified

The function is $\int_{- π}^{π} (\sin m x) \sin (n x) d x = \int_{- π}^{π} (\cos m x) \cos n x d x = \{\begin{cases} 0 for m \neq n \\ \frac{1}{2} for m = n \end{cases}$ .

Step by step solution

Given

The given expressions are $\sin (m x) \sin (n x)$ and $\cos (m x) \cos (n x), m \neq n$ .

Definition of Integral

The definite integral of a real-valued function f(x)with respect to a real variable xon an interval [a, b] is expressed as $\int_{a}^{b} f (x) d x = F (b) - F (a)$ .

Here, $\int =$ Integration symbol, a= Lower limit, b= Upper limit, f(x) Integral and dx Integrating agent

Thus, $\int_{a}^{b} f (x) d x$ is read as the definite integral of $f (x]$ with respect to dx from a to b.

Integrate the Cosines

Apply integral on cosines.

$\frac{1}{2 π} \int_{- π}^{π} (\cos m x) \cos n x d x = \frac{1}{2 π} \int_{- π}^{π} (\frac{e^{i m x} + e^{- i m x}}{2}) (\frac{e^{i n x} + e^{- i n x}}{2}) d x = \frac{1}{8 π} \int_{- π}^{π} (e^{i m x} + e^{- i m x}) (e^{i n x} + e^{- i n x}) d x = \frac{1}{8 π} \int_{- π}^{π} (e^{i x (m + n)} + e^{i x (m - n)} + e^{i x (n - m)} + e^{- i x (m + n)}) d x = \frac{1}{4 π} {[\frac{e^{i x (m + n)}}{i (m + n)} + \frac{e^{i x (m - n)}}{i (m - n)} + \frac{e^{i x (n - m)}}{i (n - m)} - \frac{e^{- i x (m + n)}}{i (m + n)}]}_{- π}^{π}$

Calculate further as shown below.

$\frac{1}{2 π} \int_{- π}^{π} (\cos m x) \cos n x d x = \frac{1}{8 π} {[\{\frac{e^{i x (m + n)}}{i (m + n)} - \frac{e^{- i x (m + n)}}{i (m + n)}\} + \{\frac{e^{i x (m - n)}}{i (m - n)} + \frac{e^{i x (n - m)}}{i (n - m)}\}]}_{- π}^{π} = \frac{1}{4 π} {[\frac{\sin {x (m + n)}}{m + n} + \frac{\sin {x (m - n)}}{m - n}]}_{- π}^{π} = \frac{1}{2 π} [\frac{\sin {π (m + n)}}{m + n} + \frac{\sin {π (m - n)}}{m - n}]$

For $m \neq n$ , where $m \in N$ and $n \in N$ , the above result is equal to zero.

For $m = n$ , first term =0.

$\frac{1}{2 π} \int_{- π}^{π} (\cos m x) \cos n x d x = \frac{1}{2 π} [\frac{\sin {π (m - n)}}{m - n}]$

Take the limit $\lim_{m \to n \to 0} \frac{1}{2 π} [\frac{\sin \{π (m - n)\}}{m - n}]$ .

We know that $\lim_{x \to 0} \frac{\sin x}{x} = 1$ .

$\lim_{m \to n \to 0} \frac{1}{2 π} [\frac{\sin {π (m - n)}}{m - n}] = \frac{π}{2 π} = \frac{1}{2}$

Integrate the sines

Apply integral on sines.

$\frac{1}{2 π} \int_{- π}^{π} (\sin m x) \sin (n x) d x = \frac{1}{2 π} \int_{- π}^{π} (\frac{e^{i m x} - e^{- i m x}}{2}) (\frac{e^{i n x} - e^{- i n x}}{2}) d x = \frac{1}{8 π} \int_{- π}^{π} (e^{i m x} - e^{- i m x}) (e^{i n x} - e^{- i n x}) d x = \frac{1}{8 π} \int_{- π}^{π} (e^{i x (m + n)} - e^{i x (m - n)} - e^{i x (n - m)} + e^{- i x (m + n)}) d x = \frac{1}{4 π} {[\frac{e^{i x (m + n)}}{i (m + n)} - \frac{e^{i x (m - n)}}{i (m - n)} - \frac{e^{i x (n - m)}}{i (n - m)} - \frac{e^{- i x (m + n)}}{i (m + n)}]}_{- π}^{π}$

Calculate further as follows:

$\frac{1}{2 π} \int_{- π}^{π} (\sin m x) \sin (n x) d x = \frac{1}{8 π} {[\{\frac{e^{i x (m + n)}}{i (m + n)} - \frac{e^{- i x (m + n)}}{i (m + n)}\} - \{\frac{e^{i x (m - n)}}{i (m - n)} - \frac{e^{i x (n - m)}}{i (m - n)}\}]}_{- π}^{π} = \frac{1}{4 π} {[\frac{\sin {x (m + n)}}{m + n} - \frac{\sin {x (m - n)}}{m - n}]}_{- π}^{π} = \frac{1}{2 π} [\frac{\sin {π (m - n)}}{m - n} - \frac{\sin {π (m + n)}}{m + n}]$

For $m \neq n$ , where $m \in N$ and $n \in N$ , the above result is equal to zero.

For $m = n$ , second term =0.

$\frac{1}{2 π} \int_{- π}^{π} (\sin m x) \sin (n x) d x = \frac{1}{2 π} [\frac{\sin {π (m - n)}}{m - n}]$

Take the limit $\lim_{m - n \to 0} \frac{1}{2 π} [\frac{\sin {π (m - n)}}{m - n}]$ .

We know that $\lim_{x \to 0} \frac{\sin x}{x} = 1$ .

$\lim_{m - n \to 0} \frac{1}{2 π} [\frac{\sin {π (m - n)}}{m - n}] = \frac{π}{2 π} = \frac{1}{2}$

Hence, $\int_{- π}^{π} (\sin m x) \sin (n x) d x = \int_{- π}^{π} (\cos m x) \cos n x d x = \{\begin{cases} 0, for m \neq n \\ \frac{1}{2} for m = n \end{cases}$ .

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Show that in (5.2 ) the average values of $s i n m x s i n n x$ and of $c o s m x c o s n x, m \neq n$ are zero (over a period), by using the complex exponential forms for the sines and cosines as in (5.2).

Short Answer

Step by step solution

Given

Definition of Integral

Integrate the Cosines

Integrate the sines

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Step by step solution

Given

Definition of Integral

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Integrate the sines

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Show that in (5.2 ) the average values of $s i n m x s i n n x$ and of $c o s m x c o s n x, m \neq n$ are zero (over a period), by using the complex exponential forms for the sines and cosines as in (5.2).