ABC is a triangle where BC = 2AB, `angleC = 30^(@)` and `angleA = 90^(@)`. The magnitude of the side AC is:

ABC is a triangle, where BC = 2AB , angle B = 30^@ and angle A = 90^@ . The magnitude of the side AC is

In a triangle ABC, AB=BC and angleA=60^(@) . Find angleB .

In triangle ABC , AB = BC , angle B = 40 ^(@) Then angleA is equal to

In a triangle angleC=90^(@) and angleA=60^(@) then Sin A/2 + Cosec C = ?

In the figure given below, ABC is a right-angled triangle where angleA=90^(@) , AB = p cm and AC = q cm. On the three sides as diameters semicircles are drawn as shown in the figure. The area of the shaded portion, in square cm, is

In DeltaABC, if angleA=60^(@),angleB=50^(@), and angleC=70^(@) , then find the longest side of the triangle ABC.

ABC is a right angled triangle in which angleB=90^(@) and AB=BC . Find angleA and angleC .

In DeltaABC, angleA=50^(@), angleB=30^(@) and angleC=100^(@) What are the angles of the triangle formed by joining the midpoints of the sides of this triangle?

In a triangle ABC,angleB=35^(@) and angleC=55^(@) .Write of the following is true AC^(2)=AB^(2)+BC^(2) AB^(2)=BC^(2)+AC^(2) BC^(2)=AB^(2)+AC^(2)