Let `a,bepsilonR^+` for which `60^a=3` and `60^b=5` then `12^((1-a-b)/(2(1-b)))` is equal to

If 60^a =3 and 60^b=5 then 12^((1-a-b)/(2(1-b))) is equal to

If 60^a =3 and 60^b=5 then 12^((1-a-b)/(2(1-b))) is equal to

If 60^a =3 and 60^b=5 then 12^((1-a-b)/(2(1-b))) is equal to

If 60^(a)=3 and 60^(b)=5 then 12^((1-a-b)/(2(1-b))) is equal to

In a DeltaABC,angleC=60^(@) , then (1)/(a+b)+(1)/(b+c) is equal to

Consider a DeltaABC and let a, b and c denote the lengths of the sides opposite to vertices A, B and C, repectively. if a=1,b=3 and C=60^(@), then sin ^(2) B is equal to

Consider a DeltaABC and let a, b and c denote the lengths of the sides opposite to vertices A, B and C, repectively. if a=1,b=3 and C=60^(@), then sin ^(2) B is equal to

Consider a DeltaABC and let a, b and c denote the lengths of the sides opposite to vertices A, B and C, repectively. if a=1,b=3 and C=60^(@), then sin ^(2) B is equal to

Consider a DeltaABC and let a, b and c denote the lengths of the sides opposite to vertices A, B and C, repectively. if a=1,b=3 and C=60^(@), then sin ^(2) B is equal to

If A={1,2,3,4,5,6},B={1,2}, then (A)/(((A)/(B))) is equal to