Perhaps it's a simple Caesar shift? Try ROT13 on the original:
Now Atbash each letter (keep hyphens): b(2)→y(25) l(12)→o(15) d(4)→w(23) a(1)→z(26) y(25)→b(2) t(20)→g(7) a(1)→z(26) y(25)→b(2) j(10)→q(17) y(25)→b(2) l(12)→o(15) m(13)→n(14) h(8)→s(19) t(20)→g(7)
But given no context, I'll provide the direct Atbash result as the most standard response:
This doesn’t look like English yet. But if it's a (maybe the answer to a puzzle), the decoded phrase might be "gsnbo qb gb zb zwoy" which is nonsense — unless it's a further cipher.
Atbash positions: 5 letters → gsnbo 2 letters → qb 2 letters → gb 2 letters → zb 4 letters → zwoy
Wait — "gsnbo" is close to "gnsbo" or "snbo"? But "qb gb" = "qb gb"? Could be "be be" if reversed? Let’s try reversing the Atbash output: "yowz bz bg obnsg" — still no.
gsnbo-qb-gb-zb-zwoy
Given the common puzzle where "thmyl" = "smile" in Atbash of reversed? Try reverse "thmyl" = "lymht" Atbash: l(12)→o(15) y(25)→b(2) m(13)→n(14) h(8)→s(19) t(20)→g(7) → "obnsg" → "obnsg" not smile.
Given the time, I'll guess the intended solution: .
Given the ambiguity, the most common simple cipher for such strings is , so I'll output the Atbash of the whole string (keeping hyphens):
Backward: "blda-yt-ay-jy-lmht"
Result: "yowz - bg - zb - qb - onsg" .
But "thmyl" atbash (not reversing) gave "gsnbo" . If I read "gsnbo" as "gs nbo" = "is nob" ? Not matching.