1. Let's state the problem: Two teams have a total odd of 336 for a bet with a stake of 23. 2. We want to find the exact odds figures for each team such that their product or combined effect equals 336. 3. The problem wording is ambiguous. One interpretation is: if $a$ and $b$ are the odds for the two teams, then $a\times b = 336$. 4. To find integer pairs $(a,b)$ with product 336, we factorize 336. 5. Factorize 336: $$336 = 2^4 \times 3 \times 7$$ 6. Possible factor pairs include $(1,336), (2,168), (3,112), (4,84), (6,56), (7,48), (8,42), (12,28), (14,24), (16,21)$. 7. Without further info, the exact figure for each team could be any of these pairs. Final answer: The possible odds for the two teams (without commas) are pairs whose product is 336, such as $1$ and $336$, $2$ and $168$, $3$ and $112$, $4$ and $84$, $6$ and $56$, $7$ and $48$, $8$ and $42$, $12$ and $28$, $14$ and $24$, or $16$ and $21$.