Question

9. Write two points of difference between gravitational force and gravity.

Answer 1

Answer:

"Gravitation is referred to the force acting between two bodies which can be represented as the F=(GM1M2)/R2 which means gravitation force is proportional to the product of the masses of the object 1 and object 2 and is inversely proportional to the square of the distance between them. The gravitational force between earth and any object is known as gravity. "

Answer 2

Answer:

$\pink{\underline{ \large \bf \: answer}} \\ \\ \implies \bf\green{gravitational \: \: force} \\ \\ \implies{ \tt \: 1) = gravitation \: \: is \: \: a \: \: attractive \: \: force \: \: exist \: \: between \: \: any \: \: two \: \: object.} \\ \\ \implies 2) \tt= gravitational \: \: force \: \: pull \: \: objects \: \: together \\ \\ \implies \tt \: 3) = gravitational \: \: force \: \: is \: \: a \: \: universal \: \: force$



$\implies \tt4) = gravitational \: \: force \: \: is \: \: a \: \: weak \: \: force.\\ \\ \implies \: 5) = \bf \: force \: = \frac{GM1M2}{ {r}^{2} } \\ \\ \implies{6 ) \tt = gravitational \: \: force \: \: is \: \: a \: \: vector \: \: quantity} \\ \\ \implies{7) \tt= gravitational \: \: force \: \: required \: \: two \: \: masses} \\ \\ \implies8) \tt= the \: \: direction \: \: of \: i\: gravitational \: \\ \tt \: \: \: \: \: \: \: \: \: \: \: \: \: \: force \: \: lies \: \: in \: \: the \: \: radial \: \: direction \: \: from \: \: the \: \: masses \\ \\ \implies9) \tt = gravitational \: force \: can \: be \: zero \: when \: the \: seperation \: between \: two \: object \: is \: infinity$

$\blue{\underline{ \large \bf \: gravity}} \ \ \\ \implies{1) \tt = gravity \: \: is \: \: an \: \: attractive \: force} \\ \\ \large \implies{2) \tt= gravity \: is \: not \: universal \: force} \\ \\ \implies{3) \tt=gravity \: is \: a \: strong \: force } \\ \\ \implies{4) \bf=force = mg } \\ \\ \implies{5) \tt = gravity \: is \: \: a \: vector \: field} \\ \\ \implies{6) = \tt \: gravity \: required\: only \: one \: masses} \\ \\ \implies{7) \tt=the \: field \: can \: be \: zero \: at \: the \: centre } \\ \\ \implies{8) \tt= its \: direction \: is \: \: towards \: \: the \: cente \: of \: earth}$