Question

To express the division of \(1.95 \times 10^6\) by \(8.03 \times 10^{-8}\) as a number sentence, you can write it as:

\[
\frac{1.95 \times 10^6}{8.03 \times 10^{-8}}
\]

This can be further simplified using the property of exponents and performing the division step-by-step:

1. Divide the coefficients: \(\frac{1.95}{8.03}\)
2. Subtract the exponents of 10: \(10^{6 - (-8)} = 10^{6 + 8} = 10^{14}\)

So the resulting number sentence after performing the operations would be:

\[
= \left(\frac{1.95}{8.03}\right) \times 10^{14}
\]

If you calculate the coefficient \(\frac{1.95}{8.03} \approx 0.243\), the final expression would be approximately:

\[
0.243 \times 10^{14}
\]

Or in scientific notation, it would be expressed as:

\[
2.43 \times 10^{13}
\]

So the full operation can be represented as:

\[
\frac{1.95 \times 10^6}{8.03 \times 10^{-8}} = 2.43 \times 10^{13}
\]

I apologize for the oversight. To express your original problem as a division in a number sentence specifically, you would write it as:

\[
1.95 \times 10^6 \div 8.03 \times 10^{-8}
\]

This indicates that you are dividing \(1.95 \times 10^6\) by \(8.03 \times 10^{-8}\).