The ratio of the sides of a triangle ABC is `1: sqrt3: 2`. The ratio` A: B :C `is

The ratio of the sides of a triangle ABC is 1:sqrt(3):2. The ratio A:B:C is

If a,b,c are the sides of a triangle such that a:b:c=1:sqrt(3):2, then ratio A:B:C is equal to a.3:2:1b.3:1:2 c.1:2:3 d.1:3:2

Points P and Q lie on sides AB and AC of triangle ABC respectively such that segment PQ is parallel to side BC. If the ratio of areas of triangle APQ: triangle ABC is 25 : 36, then the ratio PA : PB is

The ratio of the angles A, C and B of triangle ABC is 1:1:2 . If the equal sides meausre 10 cm each, what is the length of the longest side ?

If the sides of a triangle are in the ratio 1 : sqrt(3) : 2, then its angles are in the ratio

If the sides of a triangle are in the ratio 1 : sqrt3 : 2, then the angles of the triangle are in the ratio

The ratio of angles in a triangle ABC is 2:3:7 then prove that a:b:c=sqrt(2):2:(sqrt(3)+1)

The sides of a triangle ABC are in the ratio 3:4:5. If the perimeter of triangle ABC is 60, then its lengths of sides are:

The sides of a triangle are in the ratio 1:sqrt(3):2. Then the angles are in the ratio