Question 1

The distance from Earth to the moon is about [tex]$3.84 \times 10^5$[/tex] kilometers. A piece of copy paper is about [tex]$9.6 \times 10^{-5}$[/tex] kilometers thick. About how many pieces of copy paper would need to be stacked to reach from Earth to the moon?

To find out how many pieces of copy paper would need to be stacked to reach from Earth to the moon, we can divide the distance from Earth to the moon by the thickness of a piece of copy paper. The distance from Earth to the moon is 3.84 x 105 kilometers and the thickness of a piece of copy paper is 9.6 x 10-8 kilometers. Dividing the distance by the thickness gives us:

3.84 x 105 km ÷ 9.6 x 10-8 km ≈ 4 x 1012

Therefore, approximately 4 trillion pieces of copy paper would need to be stacked to reach from Earth to the moon.

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Question 1The distance from Earth to the moon is about [tex]$3.84 \times 10^5$[/tex] kilometers. A piece of copy paper is about [tex]$9.6 \times 10^{-5}$[/tex] kilometers thick. About how many pieces of copy paper would need to be stacked to reach from Earth to the moon?

Answer :

Final answer:

Explanation:

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Other Questions

Question 1

The distance from Earth to the moon is about [tex]$3.84 \times 10^5$[/tex] kilometers. A piece of copy paper is about [tex]$9.6 \times 10^{-5}$[/tex] kilometers thick. About how many pieces of copy paper would need to be stacked to reach from Earth to the moon?