Full explanation
The number you will see quoted everywhere is the overall hit frequency of about 36.6%, meaning roughly one spin in three returns something. That figure covers every win, not just the good ones.
Hacksaw does not break this down symbol by symbol, so a precise "high pay X%, low pay Y%" table does not exist publicly. But the structure of the paytable tells the story. The four Greek letters (Alpha, Delta, Pi and the rest) are the low pays and account for the bulk of those one-in-three hits. The premium symbols and the Mystery reveals pay far more but show up far less often.
If you have played any medium-volatility Hacksaw title, this will feel familiar. Frequent small letter wins keep the balance ticking over, while the rare premium and Mystery hits are where the session actually swings. That gap between "how often you win" and "how much it matters" is exactly what medium volatility means in practice.
So treat 36.6% as the headline and ignore anyone selling you exact sub-percentages. They are not published, and on a modern slot they would be averaged over millions of spins anyway.
Why the breakdown matters less than it sounds
Even if Hacksaw published a symbol-by-symbol table, it would not change how you play. You cannot choose which symbols land, and you cannot bet differently to favour high pays. The split is fixed in the math model and the same on every spin.
What the structure does tell you is what to expect emotionally. Most win sounds you hear will be small letter wins that nudge the balance rather than move it. Treat the premium and Mystery hits as the events that matter and the constant low-pay drizzle as background noise. That framing keeps a normal session from feeling like a string of disappointments.
If you want a single number to hold onto, use the overall 36.6% hit rate rather than chasing a symbol-level split that the studio has not published. That figure already tells you roughly how often a paid line lands. Anything more granular is guesswork, and guesswork dressed up as a table is worse than an honest unknown.