HP 48gII User Manual

Page 16-26

Again, there is a new component to the motion switched at t=3, namely, the
particular solution y

p

(t) = [1+sin(t-3)]

⋅H(t-3), which changes the nature of the

solution for t>3.

The Heaviside step function can be combined with a constant function and
with linear functions to generate square, triangular, and saw tooth finite pulses,
as follows:

• Square pulse of size U

o

in the interval a < t < b:

f(t) = Uo[H(t-a)-H(t-b)].

• Triangular pulse with a maximum value Uo, increasing from a < t < b,

decreasing from b < t < c:

f(t) = U

o

⋅ ((t-a)/(b-a)⋅[H(t-a)-H(t-b)]+(1-(t-b)/(b-c))[H(t-b)-H(t-c)]).

• Saw tooth pulse increasing to a maximum value Uo for a < t < b,

dropping suddenly down to zero at t = b:

f(t) = U

o

⋅ (t-a)/(b-a)⋅[H(t-a)-H(t-b)].

• Saw tooth pulse increasing suddenly to a maximum of Uo at t = a, then

decreasing linearly to zero for a < t < b:

f(t) = U

o

⋅[1-(t-a)/(b-1)]⋅[H(t-a)-H(t-b)].

Examples of the plots generated by these functions, for Uo = 1, a = 2, b = 3,
c = 4, horizontal range = (0,5), and vertical range = (-1, 1.5), are shown in
the figures below: