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An apparatus like the one Cavendish used to find G has large lead balls that are 7.2 kg in mass and small ones that are 0.053 kg. The center of a large ball is separated by 0.063 m from the center of a small ball. Mirror m Light source M r κ The Cavendish apparatus for measuring G. As the small spheres of mass m are attracted to the large spheres of mass M, the rod between the two small spheres rotates through a small angle. Find the magnitude of the gravitational force between the masses if the value of the universal gravitational constant is 6.67259 × 10−11 N m2 /kg2 . Answer in units of N.

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Answer:

[tex]6.41537\times 10^{-9}N[/tex]

Explanation:

Given that [tex]G=6.67259\times 10^{-11}Nm^2/kg[/tex], we can use Newton's Universal law of gravitation to determine the magnitude of the gravitational force as:

[tex]F=G\frac{m_1m_2}{r^2}\\\\\\=G=6.67259\times 10^{-11}Nm^2/kg\frac{7.2kg\times 0.053kg}{(0.063m)^2}\\\\\\=6.41537\times 10^{-9}N[/tex]

Hence, the magnitude of the gravitational force between the masses is [tex]6.41537\times 10^{-9}N[/tex]

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