Question

Calculate the force of gravitation between the earth and the sun, given that the mass of the earth = 6×1024kg (hint- 24 is power) and of the sun = 2×1030kg (hint - 30 is power ) . The average distance between the two is
1.5×1011m (hint - 11 is power)

Answer 1

[0010001111]... Hello User... [1001010101]
Here's your answer...

The formula to calculate gravitation is...

$\frac{G \: m1 \: m2}{ {r}^{2} }$

Putting in the values...

$\frac{6.67 \times {10}^{ - 11} \times 6 \times {10}^{24} \times 2 \times {10}^{30} }{ ({1.5 \times {10}^{ - 11} })^{2} } \\ = \frac{6.67 \times {10}^{ - 11} \times 2 \times {10}^{24} \times 2 \times {10}^{30} }{0.5 \times 1.5 \times {10}^{ - 22} } \\ = \frac{ \frac{20}{3} \times 8 }{ \frac{3}{2} } \times {10}^{65} \\ = \frac{20 \times 2 \times 8}{3 \times 3} \times {10}^{65} \\ = \frac{320}{9} \times {10}^{65} \\ = 35.55 \times {10}^{65} \: N$
approximately.

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Answer 2

_/\_Hello mate__here is your answer--

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GIVEN:---

M1 = Mass of the Sun = 2 × 10^30 kg

M2 = Mass of the Earth = 6 × 10^24 kg

R = Average distance between the Earth and the Sun = 1.5 × 10^11 m

G = 6.7 × 10^−11 Nm^2 kg^−2

According to the universal law of gravitational ,

F = G× M1 × M2/ r^2

(Put the values of all quantities, we get)

=6.7×10^−11×2×10^30×6×10^24/(1.5×10^11)^2

= 3.57 × 10^22 N

Hence, the force of gravitation between the Earth and the Sun is

3.57 × 10^22 N

I hope, this will help you.☺

Thank you______❤

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