## reverse polyhash In $\mathbb{F}_{999,999,000,001}$ $R = 147000143251$ $T = aR + bR^2 + cR^3$ Choose a random $T = 120491904125$ **If** we can solve $120491904125 = a \times 147000143251 + b \times 856635785277 + c \times 235026006452$ We have decompressed 3 numbers ($a, b, c$) from 2 numbers ($R, T$). In this example $T$ is chosen as a random value. We're decompressing random data. Implying that we can compress random data by calculating a polynomial that represents it.