208 Higher Engineering Mathematics
(b) Area under waveform (b) for a half
cycle=( 1 × 1 )+( 3 × 2 )=7As.Average value of waveform=area under curve
length of base=7As
3s=2.33A(c) A half cycle of the voltage waveform (c) is
completed in 4ms.Area under curve=^12 {( 3 − 1 ) 10 −^3 }( 10 )= 10 × 10 −^3 VsAverage value of waveform=area under curve
length of base=10 × 10 −^3 Vs
4 × 10 −^3 s=2.5VProblem 6. Determine the mean value of current
over one complete cycle of the periodic waveforms
shown in Fig. 19.9.(a)0 4812162024285Current (mA)
t (ms)(b)0624 810122Current (mA)
t (ms)Figure 19.9(a) One cycle of the trapezoidal waveform (a) is
completed in 10ms (i.e. the periodic time is
10ms).Area under curve=area of trapezium=^12 (sum of parallel sides) (perpendicular
distance between parallel sides)
=^12 {( 4 + 8 )× 10 −^3 }( 5 × 10 −^3 )
= 30 × 10 −^6 AsMean value over one cycle=area under curve
length of base=30 × 10 −^6 As
10 × 10 −^3 s
=3mA(b) One cycle of the sawtooth waveform (b) is com-
pleted in 5ms.Area under curve=^12 ( 3 × 10 −^3 )( 2 )= 3 × 10 −^3 AsMean value over one cycle=area under curve
length of base=3 × 10 −^3 As
5 × 10 −^3 s=0.6AProblem 7. The power used in a manufacturing
process during a 6hour period is recorded at
intervals of 1hour as shown below.Time(h) 0 1 2 3 4 5 6Power(kW) 0 14 29 51 45 23 0Plot a graph of power against time and, by using the
mid-ordinate rule, determine (a) the area under the
curve and (b) the average value of the power.The graph of power/time is shown in Fig. 19.10.(a) The time base is divided into 6 equal inter-
vals, each of width 1hour. Mid-ordinates are
erected (shown by broken lines in Fig. 19.10)
and measured. The values are shown in
Fig. 19.10.