\begin{tabular}{ll}
[tex]$-\frac{9313}{-9313}$[/tex] & 7144 \\
\hline
00 & \\
\hline
[tex]$\frac{5812}{4829}$[/tex] & 8815 \\
\end{tabular}



Answer :

Sure, let's work through the elements in the table step-by-step.

### Step-by-Step Solution:

1. Simplifying the Fraction [tex]\(-\frac{9313}{-9313}\)[/tex]:
- When you divide two identical negative numbers, the result is 1 because any non-zero number divided by itself equals 1. So:
[tex]\[ -\frac{9313}{-9313} = 1.0 \][/tex]

2. Simplifying the Fraction [tex]\(\frac{5812}{4829}\)[/tex]:
- To find the value of this fraction, we simply divide the numerator by the denominator. So:
[tex]\[ \frac{5812}{4829} \approx 1.203561814040174 \][/tex]

3. Interpreting the Given Numbers:
- The numbers 7144, 00, and 8815 are constants provided in the table as is.

### Compiling the Results:
Based on the step-by-step analysis above, we have determined the values as follows:
- [tex]\(-\frac{9313}{-9313}\)[/tex] simplifies to 1.0.
- [tex]\(\frac{5812}{4829}\)[/tex] simplifies approximately to 1.203561814040174.
- The given numbers are: [tex]\(7144\)[/tex], [tex]\(00\)[/tex], and [tex]\(8815\)[/tex].

Thus, compiling the above into results, we have:
- The first entry [tex]\(=-\frac{9313}{-9313}\)[/tex] becomes 1.0.
- The first entry in the right column is 7144.
- The second row's left cell is 00 (understood as 0).
- The second row's right cell becomes 8815.
- The final fraction [tex]\(\frac{5812}{4829}\)[/tex] in decimal format is 1.203561814040174.

These results align with our step-by-step computations:
[tex]\[ (1.0, 1.203561814040174, 7144, 0, 8815) \][/tex]