Question

During a solar eclipse the Moon comes in between the Earth and the Sun that time the distance between the Sun and the Moon is (1492.16 x 10^8) m. Find the distance between the Moon and the Earth at the time of the eclipse ,given that the distance between the Sun and the Earth is (1.496 x 10^11) m.

Answer 1

Answer:

SOLUTION -

★ we have to find Distance between the moon and the earth.

Required Distance = Distance between the Sun and the Earth - Distance between the Sun and the Moon

$⟹[(1.496 \times {10}^{11} ) - (1492.16 \times {10}^{8} )] m$

$⟹[( \dfrac{1.496}{ {10}^{3} } \times {10}^{11} ) - (1492.16 \times {10}^{8} )] m$

$⟹ [(1.496 \times {10}^{8} ) - (1492.16 \times {10}^{8} )] m$

$⟹ [(1.496 - 1492.16 ) \times {10}^{8} ] m$

$⟹ (3.84 \times {10}^{8}) m$

Hence, the distance between the Moon and the Earth is $(3.84 \times {10}^{8}) m$

Answer 2

Answer:

the distance between the Moon and the Earth is

$→ (3.84 \times {10}^{8}) m$