The sides of a `DeltaABC` are in AP. If the `angleA and angleC` are the greatest and smallest angles respectively, prove that `4(1-cos A) (1-cos C)= cos A+cos C`

The sides of a triangle are in AP. If the angles A and C are the greatest and smallest angle respectively, then 4 (1- cos A) (1-cos C) is equal to

If the sides of a Delta ABC are in AP and a is the smallest sie, then cos A equals

The angles of DeltaABC are in A.P. if b:c=sqrt(3):sqrt(2) then find angleA,angleBandC .

If A,B,C are the angles of a triangle then prove that cosA+cosB-cosC=-1+4cos(A/2)cos(B/2)sin(C/2)

If P=cos(cos x)+sin (cos x) , then the least and greatest value of P respectively.

Prove that ((sec A -1))/( (sec A+1) ) =(1-cos A)/(1+cos A )

If angleA and angleB are acute angles such that cos A = cos B, then show that angleA = angleB

If a,b,and c are the side of a triangle and A,B and C are the angles opposite to a,b,and c respectively, then Delta=|{:(a^(2),bsinA,CsinA),(bsinA,1,cosA),(CsinA,cos A,1):}| is independent of

If sinA=1/2 , show that 3 cos A - 4 cos^(3) A= 0

In the given figure angleA= 40^(@) . If bar(BO) and bar(CO) are the bisectors of angleB and angleC respectively. Find the measure of angleBOC .