{"version":9,"randomSeed":"9b06773ee473dea40ba04e4004f43e48","graph":{"viewport":{"xmin":-0.20056669088674556,"ymin":0.014560812203877394,"xmax":1.2005666908867454,"ymax":0.9854391877961228}},"expressions":{"list":[{"type":"text","id":"34","text":"inspired by \"Huffman Codes: An Information Theory Perspective\" by Reducible (2021) https://youtube.com/watch?v=B3y0RsVCyrw&t=617"},{"type":"expression","id":"27","color":"#2d70b3","latex":"f\\left(x\\right)=-x\\log_{2}\\left(x\\right)-\\left(1-x\\right)\\log_{2}\\left(1-x\\right)"},{"type":"expression","id":"22","color":"#2d70b3","latex":"g\\left(x\\right)=\\log_{2}\\left(x\\right)\\log_{2}\\left(1-x\\right)"},{"type":"expression","id":"30","color":"#000000","latex":"\\int_{0}^{1}g\\left(x\\right)dx-\\int_{0}^{1}f\\left(x\\right)dx"},{"type":"expression","id":"32","color":"#2d70b3","latex":"g\\left(x\\right)-f\\left(x\\right)"}]}}