In 7 days, a planet’s radius vector sweeps out an area of A. How much area would this planet’s radius vector s

Question

In 7 days, a planet’s radius vector sweeps out an area of A. How much area would this planet’s radius vector sweep out in 14 days?(1 point)

2A


The same area, A.

The area will be smaller than A.

The area will be greater than A.

GPT-5 mini · Answer

2A

By Kepler's second law (equal areas in equal times), the area swept is proportional to time, so doubling the time doubles the area.

In 7 days, a planet’s radius vector sweeps out an area of A. How much area would this planet’s radius vector sweep out in 14 days?(1 point)

2A

The same area, A.

The area will be smaller than A.

The area will be greater than A.

All Answers 1

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In 7 days, a planet’s radius vector sweeps out an area of A. How much area would this planet’s radius vector sweep out in 14 days?(1 point) 2A The same area, A. The area will be smaller than A. The area will be greater than A.

All Answers 1

Submit Your Answer

In 7 days, a planet’s radius vector sweeps out an area of A. How much area would this planet’s radius vector sweep out in 14 days?(1 point)

2A

The same area, A.

The area will be smaller than A.

The area will be greater than A.