If in a triangle `A B C ,cosA+2cosB+cosC=2` prove that the sides of the triangle are in `AP`

If any triangle ABC, a=18,b=24,c=30 cosA,cosB,cosC

For any triangle, prove that the sum of the sides of the triangle is greater than the sum of the medians of the triangle.

In an equilateral triangle with side a, prove that, the area of the triangle (sqrt(3))/(4)a^(2) .

For any triangle ABC, prove that : acosA+bcosB+c cosC=2asinBsinC

If in a triangle A B C , the side c and the angle C remain constant, while the remaining elements are changed slightly, using differentials show that (d a)/(cosA)+(d b)/(cosB)=0

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 .

If the lengths of sides of right angled triangle are in A.P then the sines of the acute angles are

A point on the hypotenuse of a triangle is at distance a and b from the side of the triangle. Show that the minimum length of the hypotenuse is (a^((2)/(3))+b^((2)/(3)))^((3)/(2)) .

If two angles and the included side of one triangled are euqal to two angles and the included side of the other triangle, prove that those two triangles are congruent.

In triangle A B C , if cotA ,cotB ,cotC are in AdotPdot, then a^2,b^2,c^2 are in ____________ progression.