Two sides of triangle are of lengths `sqrt(6)` and 4 and the angle opposite to smaller side is `30^(@)`, then how many such triangles are possible ?

Two sides of a triangle are of lengths sqrt6 and 4 and the angle opposite to smaller side is 30. How many such triangles are possible? Find the length of their third side and area.

Two sides of a triangle are 2sqrt2 and 2sqrt3cm and the angle opposite to the shorter side of the two is pi/4 . The largest possible length of the third side is

The lengths of two sides of a triangle are 50 inches and 63 inches. The angle opposite the 63-inch side is 66^(@) . How many degrees are in largest angle of the triangle ?

Theorem 7.2 : Angles opposite to equal sides of an isosceles triangle are equal.

Theorem 7.6 : If two sides of a triangle are unequal, the angle opposite to the longer side is larger (or greater)

The sides of a triangle are in a ratio of 4:5:6. the smallest angle is

If in Delta ABC, b = 3 cm, c = 4 cm and the length of the perpendicular from A to the side BC is 2 cm, then how many such triangle are possible ?

Two sides of a triangle have lengths of 8 and 17. What is the range of possible vlaus of the length of the thrid side?

In an isosceles triangle, prove that the angles opposite to equal sides are equal.

If one side of a triangle is double the other, and the angles on opposite sides differ by 60^0, then the triangle is equilateral (b) obtuse angled (c) right angled (d) acute angled