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#X text 121 0 Waveshaping using an exponential function;
#X text 120 53 <--index in;
#X text 250 218 0;
#X text 417 220 10;
#X text 14 652 When the index of modulation exceeds 5 we scan past
the right hand border of the table (the thousandth point \, corresponding
to exp(-10). This isn't a problem because the values are all close
to zero there.;
#X text 14 555 Table lookup is prepared as follows. First add one to
the sinusoid and adjust its amplitude according to index \; it ranges
from 0 to 2*index. Then adjust for the table's input scale (100 points
per unit \, so multiply by 100) and add one to skip the interpolation
point at the beginning of the table.;
#X text 13 398 Here we use an exponential function as a waveshaping
transfer function. The theory is shown in detail in the accompanying
book \, but in short \, we adjust the sinusoid so that \, as the index
increases \, we scan starting from the left of the transfer function
(previously the reading location grew from the center). The table contains
exp(-x) with x varying from 0 to 10 When the index is zero \, the output
is the constant 1 and the spectrum holds only DC. As the index grows
\, the output is a sequence of steadily narrower pulses \, whose spectrum
gets progressively fatter.;
#X connect 1 0 6 0;
#X connect 1 0 6 1;
#X connect 5 0 3 1;
#X connect 18 0 19 0;
#X connect 19 0 33 0;
#X connect 25 0 3 2;
#X connect 31 0 40 0;
#X connect 32 0 31 0;
#X connect 33 0 39 0;
#X connect 34 0 38 0;
#X connect 35 0 36 0;
#X connect 36 0 39 1;
#X connect 38 0 35 0;
#X connect 39 0 32 0;
#X connect 40 0 3 0;
#X connect 40 0 1 0;
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