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Chapter 14: Q8P (page 710)

To find u and vas a function of xand y & plot the graph and show curve u = constant should be orthogonal to the curves v =constant.
w = cosh z

Short Answer

Expert verified

u = cosh x cos y and v = sinh x sin y

Step by step solution

01

Cauchy Riemann Theorem

Concept used:

Formula from Cauchy Riemann theorem:

w = u + iv And z = x + iy, w = f(z) and u(x,y) and u(x,y) .

02

Use Cauchy Riemann theorem

Function is given as. w = cosh z ...... (1)

Now the real and imaginary part (u,v) is given as follows:

Here from Cauchy Riemann theorem w = u + iv and z =x + iy putting in equation.

u + iv = cosh (x+yi) ...... (2)

u + iv = cosh x cosh yi + sinh x sinh yi

In previous section concluded the following identities.

cosh ir = cos r

sinh ir = i sin r

03

Substitution of (ii) yields

Substitute yields as follows:

u + iv = cosh x cosh yi + sinh x sinh yi

u + iv = cosh x cos y + i sinh x sin y

So, get the value (u,v) which is given as follows:

u = cosh x cos y And v = sinh x sin y.

Hence, u = cosh x cos y And v = sinh x sin y.

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Most popular questions from this chapter

Find the residues of the following functions at the indicated points. Try to select the easiest of the methods outlined above. Check your results by computer.

$\frac{e^{2 z} - 1}{z^{2}} at z = 0$

Find the real and imaginary parts $u (x, y)$ and $v (x, y)$ of the following functions.

$c o s \bar{z}$

Use the following sequence of mappings to find the steady state temperature $T (x, y)$ in the semi-infinite strip $y \geq 0, 0 \leq x \leq π$ if $T (x, 0) = 100^{0}, T (0, y) = T (π, y) = 0$ and $T (x, y) \to 0$ as $y \to \infty$ . (See Chapter 13, Section 2 and Problem 2.6.)

Use $w = (\frac{z' - 1}{z' + 1})$ to map the half plane $v \geq 0$ on the upper half plane $y' > 0$ , with the positive axis corresponding to the two rays $x' > 1$ and $x' < - 1$ , and the negative yaxis corresponding to the interval $- 1 \leq x \leq 1$ of the x'axis. Use z'=-coszto map the half-strip $0 < x < π, y > 0$ on the Z'half plane described in (a). The interval role="math" localid="1664365839099" $- 1 \leq x' < 1, y' = 0$ corresponds to the base $0 < x < π, y = 0$ of the strip.

Comments: The temperature problem in the (u,v) plane is like the problems shown in the z plane of Figures 10.1 and 10.2, and so is given by $T = (\frac{100}{π}) a r c \tan (\frac{v}{u})$ . In the z plane you will find $T (x, y) = \frac{100}{π} a r c \tan \frac{2 \sin x \sin h y}{\sin h^{2} y - \sin^{2} x}$

Put $t a n α = \frac{\sin x}{\sin h y}$ and use the formula for $t a n 2 α$ to get $T (x, y) = \frac{200}{π} a r c \tan \frac{\sin x}{\sin h y}$ " width="9" height="19" role="math">

Note that this is the same answer as in Chapter 13 Problem 2.6, if we replace 10 by $π$ .

Find the inverse Laplace transform of the following functions by using (7.16). $\frac{p + 1}{p (p^{2} + 1)}$

Find out whether infinity is a regular point, an essential singularity, or a pole (and if a pole, of what order) for each of the following functions. Find the residue of each function at infinity, $\frac{2 z + 3}{{(z + 2)}^{2}}$ .

See all solutions

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