Question

To compare the numbers 12,740,876,635; 1,345,763,334; and 12,920,370,000 using scientific notation, we first convert each number into scientific notation:

1. **12,740,876,635** can be written as:
\[
1.2740876635 \times 10^{10}
\]

2. **1,345,763,334** can be written as:
\[
1.345763334 \times 10^{9}
\]

3. **12,920,370,000** can be written as:
\[
1.292037 \times 10^{10}
\]

Now we compare the scientific notations:

- \( 1.2740876635 \times 10^{10} \) (for 12,740,876,635)
- \( 1.345763334 \times 10^{9} \) (for 1,345,763,334) which is significantly smaller since it is multiplied by \( 10^{9} \)
- \( 1.292037 \times 10^{10} \) (for 12,920,370,000)

To compare the first and third numbers both of which are in \( 10^{10} \):
- \( 1.2740876635 < 1.292037 \)
This means \( 12,740,876,635 < 12,920,370,000 \).

Thus, when we compare the values:
- \( 1.345763334 \times 10^{9} \) is obviously the smallest, and since it is in the order of \( 10^{9} \), it confirms its lesser value.
- Between \( 12,740,876,635 \) and \( 12,920,370,000 \), the latter is larger.

Therefore, the number with the greatest value is **12,920,370,000**.