Hello all, I've been stalking this thread for a while and am finally embarking on my theremin building odyssey, but I've just got a couple questions.
First if anyone has one of these on a breadboard, I'd very much like to see a picture of it as I'm trying to figure out the layout without messing around with ESD components (speaking of which, are those safe after being soldered on or is handling of the board verboten at that point?).
My next question regards what to do with the AUDIO output. I saw it mentioned that the Coke bottles used the LM386 amp, so for that would it be hooked up as in this typical app from the sheet (with Vin=AUDIO, Vs=6V, and an 8 ohm speaker on the output) or would I need more gain than the 20 provided by this application? (The output is an aspect that I must ignorant I'm wholly ignorant on as this is my first time working with sound and I don't know what the output will look like, much less what it should to produce sound after going through the amp)
![](data:image/png;base64,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)
Just as an aside about the application, I'm trying to build it as part of a circuit for a school project using a regulator with an enable that will allow me to provide the theremin power based on the output of two D F/F that will latch based on the user producing a particular motion followed by another within a time frame of a couple seconds. The theme of the project was measuring motion (and we had to use an accelerometer for it), and after learning about the theremin this summer I thought it would be well suited to continue the theme into what the motion detection would instantiate.
Thanks!
Myxl