Question

Three object each of mass 'm' are fixed at the corner of an equilateral
triangle of side 1. The net gravitational force acting on a fourth mass m
which is at the centroid of the triangle will be​

Answer 1

Answer:

Draw a perpendicular AD to the side BC.

∴AD=ABsin60=

2

3

l

Distance AO of the centroid O from A is

3

2

AD.

∴AO=

3

2

(

2

3

l)=

3

l

By symmetry, AO=BO=CO=

3

l

Force on mass 2m at O due to mass m at A is

F

OA

=

(l/

3

)

2

Gm(2m)

=

l

2

6Gm

2

along OA

Force on mass 2m at O due to mass m at B is

F

OB

=

(l/

3

)

2

Gm(2m)

=

l

2

6Gm

2

along OB

Force on mass 2m at O due to mass m at C is

F

OC

=

(l/

3

)

2

Gm(2m)

=

l

2

6Gm

2

along OC

Draw a line PQ parallel to BC passing through O. Then ∠BOP=30=∠COQ

Resolving

F

ˉ

OB

and

F

ˉ

OC

into two components.

Components acting along OP and OQ are equal in magnitude and opposite in direction. So, they will cancel out while the components acting along OD will add up.

∴ The resultant force on the mass 2m at O is

F

R

=F

OA

−(F

OB

sin30+F

OC

sin30)

=

l

2

6Gm

2

−(

l

2

6Gm

2

×

2

1

+

l

2

6Gm

2

×

2

1

)=0