Question
A penny weighs 5.8×10−3
lb. How many pennies are in a pile of pennies that weighs 3.596×104
lb.? Write the answer in scientific notation.(1 point)
Responses
0.62×107
0.62 times 10 superscript 7 baseline
6.2×108
6.2 times 10 superscript 8 baseline
6.2×106
6.2 times 10 superscript 6 baseline
6.2×10−7
lb. How many pennies are in a pile of pennies that weighs 3.596×104
lb.? Write the answer in scientific notation.(1 point)
Responses
0.62×107
0.62 times 10 superscript 7 baseline
6.2×108
6.2 times 10 superscript 8 baseline
6.2×106
6.2 times 10 superscript 6 baseline
6.2×10−7
Answers
GPT-4o mini
To find the number of pennies in a pile that weighs \(3.596 \times 10^4\) lb, we need to divide the total weight of the pennies by the weight of a single penny.
First, we calculate the number of pennies:
\[
\text{Number of pennies} = \frac{\text{Total weight of pennies}}{\text{Weight of one penny}} = \frac{3.596 \times 10^4 \text{ lb}}{5.8 \times 10^{-3} \text{ lb}}
\]
Now, perform the division:
1. Divide the coefficients:
\[
\frac{3.596}{5.8} \approx 0.620
\]
2. Substract the exponents:
\[
10^{4 - (-3)} = 10^{4 + 3} = 10^7
\]
Now combine the results:
\[
\text{Number of pennies} \approx 0.620 \times 10^7
\]
In proper scientific notation, we express \(0.620\) as \(6.2\) and decrease the exponent by 1 to maintain equivalence:
\[
0.620 \times 10^7 = 6.2 \times 10^6
\]
Thus, the final answer in scientific notation is:
**6.2 × 10⁶**.
First, we calculate the number of pennies:
\[
\text{Number of pennies} = \frac{\text{Total weight of pennies}}{\text{Weight of one penny}} = \frac{3.596 \times 10^4 \text{ lb}}{5.8 \times 10^{-3} \text{ lb}}
\]
Now, perform the division:
1. Divide the coefficients:
\[
\frac{3.596}{5.8} \approx 0.620
\]
2. Substract the exponents:
\[
10^{4 - (-3)} = 10^{4 + 3} = 10^7
\]
Now combine the results:
\[
\text{Number of pennies} \approx 0.620 \times 10^7
\]
In proper scientific notation, we express \(0.620\) as \(6.2\) and decrease the exponent by 1 to maintain equivalence:
\[
0.620 \times 10^7 = 6.2 \times 10^6
\]
Thus, the final answer in scientific notation is:
**6.2 × 10⁶**.