# Implementing triangle, sawtooth and reverse sawtooth formulas in program code

I've looked at the formulas for these waves but I can't figure out how to implement them. I was able to figure you the SINE and SQUARE waves:

``````float x = note.frequency / AppSettings::sampleRate;
float theta_increment = 2.0f * M_PI * x;
float value = 0;

if(waveType == SINE){
value = sin(theta_increment);
}
else if (waveType == SQUARE){
value = sin(note.theta);
value = (value > 0) - (value < 0);
}
``````

The formula I tried was based on this example and the explanation from wiki:

``````square(t) = sgn(sin(2πt))

// this is how I tried to implement it
theta_increment - floor(theta_increment - 0.5f);
``````

But this generates a very low sounding tone and the frequency change doesn't seem to have any effect (not one that I can hear anyway). So cans someone help me with implementing sawtooth and triangle? Some explanation would be very helpful to because unlike sine and square I don't understand these formulas very well.

-

Delphi code. I hope that formulas are clear. Frequencies and magnitudes are consistent.

``````  w := 1.0;   // angular frequency
for i := 0 to 999 do begin
t := i * 2 * Pi / 400 - 3/2 * Pi; // just X-axis scale
wt := w * t;
f := wt / (2.0 * Pi); //frequency

sn := sin(wt);                      // sine wave

saw := 2.0 * (f - Floor(f)) - 1.0;  //sawtooth

f := f + 0.25;
tr := Abs(4 * (f - Floor(f + 0.5))) - 1.0;  //triangle