The angles A, B and C of a triangle ABC are in arithmetic progression. AB=6 and BC=7. Then AC is :

The angles A, B and C of a triangle ABC are in arithmetic progression. If 2b^(2)=3c^(2) then the angle A is :

If the angles A, B, C (in that order) of triangle ABC are in arithmetic progression, and L=lim_(A rarr C) sqrt(3-4sinAsinC)/|A-C| then find the value of 100L^2 .

If three sides a,b,c of a triangle ABC are in arithmetic progression, then the value of cot(A/2), cot(B/2), cot(C/2) are in

The angles A, B and C of a DeltaABC are in A.P. If AB = 6, BC =7 ,then AC =

If the lengths of the sides of a right- angled triangle ABC, right angled at C, are in arithmetic progression, then the value of 5(sinA+sinB) is

The sides AB and AC of a triangle ABC are produced, and the bisectors of the external angles at B and C meet at P. Prove that if AB gt AC , then PC gt PB .

In a right-angled triangle ABC, right angled at B, an altitude BD is dropped on AC. If AB=8 and BC=6, what is the length of AD?

The angle A of the triangle ABC is a right angle. The circle on AC as diameter cuts BC at point D. If BD = 9 cm and DC = 7 cm, calculate the length of AB.

Let G be the centroid of triangle ABC and the circumcircle of triangle AGC touches the side AB at A If BC = 6, AC = 8 , then the length of side AB is equal to

Construct a right angled triangle ABC whose base BC is 6 cm and the sum of hypotenuse AC and other side AB is 10 cm.