If `tanA+tanB+tanC=tanAtanBtanC` then

In an acute-angled triangle ABC, tanA+tanB+tanC=tanAtanBtanC , then tanAtanBtanC =

In DeltaABC , tanA+tanB+tanC=tanAtanBtanC

tanA +tanB + tanC = tanA tanB tanC if

Statement-1: In an acute angled triangle minimum value of tan alpha + tanbeta + tan gamma is 3sqrt(3) . And Statement-2: If a,b,c are three positive real numbers then (a+b+c)/3 ge sqrt(abc) into in a triangleABC , tanA+ tanB + tanC= tanA. tanB.tanC

In a DeltaABC , prove that : tanA+tanB+tanC= tanA tanB tanC

In a DeltaABC , prove that : tanA+tanB+tanC= tanA tanB tanC

Each question has four choices a,b,c and d out of which only one is correct. Each question contains Statement 1 and Statement 2. Make your answer as: If both the statements are true and Statement 2 is the correct explanation of statement 1. If both the statements are True but Statement 2 is not the correct explanation of Statement 1. If Statement 1 is True and Statement 2 is False. If Statement 1 is False and Statement 2 is True. It is given that a >-,b >0,c >0a n da+b+c=a b c Statement 1: All of the three numbers cannot be less than sqrt(3.) Statement 2: In A B Cdot tanA+tanB+tanC=tanAtanBtanC

If tan^3A+tan^3B+tan^3C=3tanA* tanB*tanC , then prove that triangle ABC is an equilateral triangle.

If A+B+C= pi/2 , show that : tanA tanB + tanB tanC + tanC tanA=1

If in DeltaABC, tan A+tanB+tanC=6 and tanA tanB=2 , then sin^(2)A:sin^(2)B:sin^(2)C is