(^616) Series
6 Supposing that x = r/4, give one or more reasons why the series
sin x sin 2x sin 3x sin 4x
1 2 3 4 +
is not an alternating series to which Theorem 12.31 applies.
7 The function 4k being defined by (12.32), prove the formulas (12.33).
8 It is not expected that the theory of Fourier series and its formulas have
been learned, but it is expected that we can start solving problems when suitable
formulas and instructions are given. Write the formulas (12.32) for the case in
which L = I and show that the formula (12.36) for the Fourier coefficients
becomesak = oi
f (x) sin krx dx.Letting f (x) be the Bernoulli function B, (x) so that f (x) = x - - when 0 < x < 1,
show thatak =oi
(x - ) sin krx dx.Show that integration by parts gives1l -1 I
j1
ak = [(x-2/ kr cos krxJO + f0 cos krx dx-'/21+coskr - Nr2 1+(-1)k
kr 2 - k,r 2so that ak = 0 when K is odd and ak = - -/kr when k is even. Observe
that the conditions in the sentence following (12.37) are satisfied and hence that
(12.37) must be valid. Then show that substituting in (12.37) gives the first
of the formulas (12.384).(^9) Another particularly important example involves the square sine function
(or square wave function) defined by
Sin x = sgn sin x.
The graph of this function is shown in Figure 12.391. To find the trigonometric
Y
-z
Figure 12.391
Fourier series of the odd function Sin (rx/L) which has period 2L, use the ortho-
normal set (12.32) and, after observing that Sin (rx/L) = 1 when 0 < x < L,
calculate the Fourier coefficients of Sin (irx/L) from the formula
ak =f oL sin Lx dx.