Area of triangle `= sqrt(……..(s-a) (s-b) (s-c))`

If in a triangle ABC, (s-a)(s-b)= s(s-c), then angle C is equal to

Two medians drawn from the acute angles of a right angled triangle intersect at an angle pi/6dot If the length of the hypotenuse of the triangle is 3u n i t s , then the area of the triangle (in sq. units) is sqrt(3) (b) 3 (c) sqrt(2) (d) 9

Consider a triangle A B C and let a , b and c denote the lengths of the sides opposite to vertices A , B ,and C , respectively. Suppose a=6,b=10 , and the area of triangle is 15sqrt(3)dot If /_A C B is obtuse and if r denotes the radius of the incircle of the triangle, then the value of r^2 is

If A is the area and 2s is the sum of the sides of a triangle, then (a) Alt=(s^2)/4 (b) Alt=(s^2)/(3sqrt(3)) (c) 2RsinAsinBsinC (d) none of these

Statement I In a DeltaABC, sum (cos ^(2)""(A)/(2))/(a ) has the value equal to (s^(2))/(abc). Statement II in a Delta ABC, cos ""A/2=sqrt(((s-b)(s-c))/(bc)) cos ""(beta)/(2)=sqrt(((s-a) (s-c))/(ac)), cos ""c/2= sqrt(((s-a)(s-b))/(ab))

If c^(2) = a^(2) + b^(2) , then prove that 4s (s - a) (s - b) (s - c) = a^(2) b^(2)

If Delta is the area of a triangle with side lengths a, b, and c, then show that Delta le (1)/(4) sqrt((a + b + c) abc) . Also show that equality occurs in the above inequality if and only if a = b = c

In a cyclic quadrilateral ABCD, prove that tan ^(2)""(B)/(2)=((s-a)(s-b))/((s-c)(s-d)),a,b,c, and d being the lengths of sides ABC, CD and DA respectively and s is semi-perimeter of quadrilateral.