Let us consider Δ ABC with A, B and C as its angles and a, b and c as its sides. Given: Angles are in AP i.e A, B and C are in AP. ⇒ 2 × B = A + C As we know that, A + B + C =180° ⇒ 3 × B = 180° ----(∵ 2 × B = A + C) ⇒ B = 60° As we know that, if A, B and C are angles and a, b and c are the sides of a Δ ABC, then:
a
sinA
=
b
sinB
=
c
sinC
⇒
b
c
=
sinB
sinC
As it is given that b:c=√3:√2 and sinC=sin60°=√3∕2. ⇒