CUBICinfinity

output
html_document keep_md true

$$ \sin{x}\cos{x} = \sqrt{(\sin{x})^2(\cos{x})^2} = \sqrt{(\sin{x})^2(\cos{x})^2((\sin{x})^2+(\cos{x})^2)} \ = \sqrt{(\sin{x})^2(\cos{x})^2(\sin{x})^2+(\sin{x})^2(\cos{x})^2(\cos{x})^2} \= \sqrt{(\sin{x})^4(\cos{x})^2+(\cos{x})^4(\sin{x})^2}\=\sqrt{(\sin{x})^4(1-(\sin{x})^2)+(\cos{x})^4(1-(\cos{x})^2)}\=\sqrt{(\sin{x})^4-(\sin{x})^6+(\cos{x})^4-(\cos{x})^6}\=\sqrt{-(\sin{x})^2-(\cos{x})^2}=\sqrt{-((\sin{x})^2+(\cos{x})^2)}\=\sqrt{-1}=i $$

CUBICinfinity

# heptatonic (0–6)
define :ma do
  [5,7,9,11,12,14,15]
end

# heptatonic (0–6)
# 12 TET
define :mb do
  [5,7,9,10,12,14,15]
end