In any `DeltaABC,` is `2 cos B=a/c,` then the triangle is

In a triangle ABC, sin A- cos B = Cos C , then angle B is

Show that the DeltaABC is an isosceles triangle if the determinant Delta=|{:(1,1,1),(1+cosA,1+cosB,1+cosC),(cos^2A+cosA,cos^2B+cosB,cos^2C+cosC):}|=0

If Delta_(1) is the area of the triangle with vertices (0, 0), (a tan alpha, b cot alpha), (a sin alpha, b cos alpha), Delta_(2) is the area of the triangle with vertices (a sec^(2) alpha, b cos ec^(2) alpha), (a + a sin^(2)alpha, b + b cos^(2)alpha) and Delta_(3) is the area of the triangle with vertices (0,0), (a tan alpha, -b cot alpha), (a sin alpha, b cos alpha) . Show that there is no value of alpha for which Delta_(1), Delta_(2) and Delta_(3) are in GP.

In the DeltaABC,AB=a,AC=c and BC=b , then

In a triangle ABC, cos 3A + cos 3B + cos 3C = 1 , then then one angle must be exactly equal to

In a DeltaABC,3 sin A+4 cos B=6 and 3 cos A+4 sinB=1 , then angleC can be

If a,b and c are the position vectors of the vertices A,B and C of the DeltaABC , then the centroid of DeltaABC is

Prove that in any DeltaABC,cos A=(b^(2)+c^(2)-a^(2))/(2bc) where a, b and c are the magnitudes of the sides opposite to the vertices A, B and C respectively.

In DeltaABC , if cosA=(sinB)/(2sinC) then show that DeltaABC is an isoscles triangle.

If a, b, c are the side of a right triangle where c is the hypotenuse, prove that the radius of the circle which touches all the side of the triangle is given by r= (a+b-c)/2 .