# Efficient algorithm for writing several bits across several words

One of my projects involves drawing text. The project is based around a mid-level 16-bit microcontroller, a dsPIC33FJ128GP802. It is capable of 40 MIPS, but about 92% of that is reserved for background processing (outputting an on screen display), so on average it gets 3 MIPS to render stuff. The processor has hardware multiply, assisted divide (18 cycles) and a full 16-bit barrel shifter.

The original method was simple. It just called the set pixel routine for each pixel that needed to be written, however, this is quite slow: each pixel write requires an address decode, bit mask, and write to memory - on average, around 60 cycles per pixel. Also, two bits need to be written for each pixel to be set: one in the mask array (which determines if the pixel is visible or not), and one in the level array (which determines if the pixel is white or black.) For a single character, 8x14 pixels, this means 13,440 cycles plus overhead. Which is a lot, given the lack of much processing power.

Because of this, I came up with an algorithm for drawing horizontal lines. It could efficiently write up to 16 pixels in about 20 cycles, which is a 60 fold improvement on setting pixels individually; it could also handle lines which did not lie on word boundaries (using some clever bit math), and even lines which lie entirely inside one word. (Note - one word is 16 bits and the video memory is stored as an 4 arrays of 3,072 words, a front buffer and back buffer.) I'm not certain if the algorithm is original - I doubt it - but for those curious, I've documented it here.

Now I'm racking my brains out trying to figure out a way to set multiple distinct pixels across multiple words. Ideally, it would work like this - we want to write this word starting at bit 4 (bits counted from zero) of the first word and allow it to overflow into the next:

``````Memory before : 0000 0000 0000 0000   0000 0000 0000 0000
Word to write : 1111 1010 1111 1111
Memory after  : 0000 0111 1101 0111   1111 1000 0000 0000
``````

If anyone knows of any such algorithm or has done something in the past similar to this it would be great to know how you did it. I'm having a major brain block right now.

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