To subtract \( 8.03 \times 10^{-8} \) from \( 1,845.19 \), we can start by writing \( 1,845.19 \) in a way that makes the subtraction clear.
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Convert \( 1,845.19 \) to scientific notation to match the order of magnitude of \( 8.03 \times 10^{-8} \): \[ 1,845.19 = 1.84519 \times 10^3 \]
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Now, we can perform the subtraction: \[ 1.84519 \times 10^3 - 8.03 \times 10^{-8} \]
Since \( 1.84519 \times 10^3 \) is much larger than \( 8.03 \times 10^{-8} \), the subtraction will not significantly affect the larger number.
- Thus, the result is approximately: \[ 1,845.19 \]
For more accurate representation:
- The difference is practically \( 1,845.19 \), and the small value \( 8.03 \times 10^{-8} \) can be neglected in most contexts unless high precision is required.
So the final answer is approximately: \[ 1,845.19 \]