Sure! Let's identify and highlight the words in the puzzle. According to the given result, the words "grow," "gown," "down," and "went" have been found in the puzzle.
Here is the grid with the words circled:
| 1 | 0 | g | c | 0 | p |
|---|---|---|---|---|---|
| n | 0 | t | b | 0 | w |
| f | h | n | 0 | w | d |
| 0 | 0 | g | 0 | g | 0 |
| g | p | m | 0 | p | t |
### Explanation:
1. "grow":
- Starts from (2, 2) to (5, 2)
- Found in column 3 (index 2) from rows 3 to 6 (1-based index).
2. "gown":
- Starts from (1, 3) to (4, 3)
- Found in column 4 (index 3) from rows 2 to 5 (1-based index).
3. "down":
- Starts from (3, 3) to (6, 3)
- Found in column 4 (index 3) from rows 4 to 7 (1-based index).
- But as our containing grid is 5x6 matrix, it implies the word "down" not starts from (3,3).
4. "went":
- Starts from (4, 4) to (6, 4)
- Found in columns starting from 5 (index 4) from rows 5 to 7 (1-based index).
- As our grid doesn't contains one more row after 4th row hereby the word "down" or "went" is not exactly alignable from our containing wordbase.
So, highlighting the likely reconstruction in the puzzle grid are:
[tex]\[
\begin{aligned}
1 & 0 & \textbf{g} & c & 0 & \textbf{p} \\
\textbf{n} & 0 & \textbf{t} & b & 0 & \textbf{w} \\
\textbf{f} & h & \textbf{n} & 0 & \textbf{w} & d \\
0 & 0 & \textbf{g} & 0 & g & 0 \\
\textbf{g} & p & m & 0 & p & t \\
\end{aligned}
\][/tex]
Where,
"grow" word formed noticeable from marked (2, 2) to (3, 2) diagonal.
Overall we highlighting the terms where defining words are more resembling near those indexes.
