Mathematical Tools for Physics - Department of Physics - University

3—Complex Algebra 63

cos

(

kr 0 −ωt

)

+ cos

(

k(r 0 −dsinθ)−ωt

)

+ cos

(

k(r 0 − 2 dsinθ)−ωt

)

+

...+ cos

(

k(r 0 −Ndsinθ)−ωt

)

Express this as the real part of complex exponentials and sum the finite series. Show that the resulting
wave is
sin

( 1

2 (N+ 1)kdsinθ

)

sin

( 1

2 kdsinθ

) cos

(

k(r 0 −^12 Ndsinθ)−ωt

)

Interpret this result as a wave that appears to be coming from some particular point (where?) and with

an intensity pattern that varies strongly withθ.

3.25 (a) If the coefficients in a quadratic equation are real, show that ifzis a complex root of the

equation then so isz*. If you do this by reference to the quadratic formula, you’d better find another

way too, because the second part of this problem is
(b) Generalize this to the roots of an arbitrary polynomial with real coefficients.

3.26 You can represent the motion of a particle in two dimensions by using a time-dependent complex

number withz=x+iy=reiθshowing its rectangular or polar coordinates. Assume thatrandθare

functions of time and differentiatereiθto get the velocity. Differentiate it again to get the acceleration.

You can interpreteiθas the unit vector along the radius andieiθas the unit vector perpendicular to

the radius and pointing in the direction of increasing theta. Show that

d^2 z

dt^2

=eiθ

[

d^2 r

dt^2

−r

(

dθ

dt

) 2 ]

+ieiθ

[

r

d^2 θ

dt^2

+ 2

dr

dt

dθ

dt

]

(3.17)

and translate this into the usual language of components of vectors, getting the radial (rˆ) component

of acceleration and the angular component of acceleration as in section8.9.

3.27 Use the results of the preceding problem, and examine the case of a particle moving directly away

from the origin. (a) What is its acceleration? (b) If instead, it is moving atr=constant, what is its

acceleration? (c) If instead,x=x 0 andy=v 0 t, what arer(t)andθ(t)? Now computed^2 z/dt^2 from

Eq. (3.17).

3.28 Was it really legitimate simply to substitutex+iyforθ 1 +θ 2 in Eq. (3.11) to getcos(x+iy)?

Verify the result by substituting the expressions forcosxand forcoshyas exponentials to see if you

can reconstruct the left-hand side.

3.29 The roots of the quadratic equationz^2 +bz+c= 0are functions of the parametersbandc.

For realbandcand for both casesc > 0 andc < 0 (say± 1 to be specific) plot the trajectories of

the roots in the complex plane asbvaries from−∞to+∞. You should find various combinations of

straight lines and arcs of circles.

3.30 In integral tables you can find the integrals for such functions as

∫

dxeaxcosbx, or

∫

dxeaxsinbx

Show how easy it is to do these by doing both integrals at once. Do the first plusitimes the second

and then separate the real and imaginary parts.