186 CHAPTER 5 • ELEMENTARY FUNCTIONSThe complex quantity Z defined byZ = R + i ( wL - w~)
is called the complex impedance. Substituting this last expression into Equation
(5- 44 ) gives
E* =Zl*,which is the complex extension of Ohm's law.-------... EXERCISES FOR SECTION 5.4- Establish t hat f. cos z = - sin z for all z.
2. Demonstrate that, for all z, sin^2 z + cos^2 z = l, as follows.
(a) Define the function g (z) = sin^2 z + cos^2 z. Explain why g is entire.
(b) Show that g is constant. Hint: Look at g' (z).
(c) Use part (b) to establish that, for all z, sin^2 z + cos^2 z = 1.- Show that Equation (5-38) simplifies t o Equation (5-39). Hint: Use t he facts that
cosh^2 y - sinh^2 y = 1 and sinh2y = 2coshysinhy. - Explain why the diagrams in Figures 5.8 and 5.9 came out the way they did.
- Show that, for all z,
(a) sin (7r - z) =sin z.
(b) sin(~ - z) = cosz.
(c) sinh(z+i7r) = - sinhz.
( d) tanh (z + i?r) = tanh z.
(e) sin (iz) = isinhz.
(f) cosh (iz) = cosz.- Express the following quantities in u +iv form.
(a) cos (1 + i).
(b) sin c·~·;).
(c) sin2i.
(d) cos(- 2 +i).(e) tan ( "!^2 ').
(f) tan(~).
(g) sinh (1 + i7r).