Position vector of P is e (2

→

a

+

→

b

)
Position vector of point Q is (

→

a

−3

→

b

)
Point R divides the line segment PQ externally in a ratio of 1 : 2.
Position vector of R =

1( → a −3 → b )−2(2 → a + → b )

1−2

=

→ a −3 → b −4 → a −2 → b

1−2

= 3

→

a

+5

→

b

Now, we need to show that P is the mid-point of RQ.
So, Position vector of P =
=

(3 → a +5 → b )+( → a −3 → b )

2

= (2

→

a

+

→

b

) = Position vector of P (given)
Hence proved.