[" The lengths of sides of triangle "ABC" are "AB=10,BC=7" ,"],[CA=sqrt(37)" ,then the length of median through the vertex "C" is "]

The lengths of the sides of a triangle are AB = 10, BC = 7, CA = sqrt (37) then length of the median through the C is

If the mid points of the sides BC,CA,AB of a triangle ABC are (-1,3),(-2,4),(2,-5) then the length of the median through vertex A is

In triangle ABC , angle C = 90 , AC = 6 cm, BC = 8 cm. then find the length of the median through C.

In triangle ABC , AB=10, AC=7, BC=9. Find the length of the median drawn from point C to side AB.

If the orthocentre, centroid, incentre and circumcentre coincide in a Delta ABC , and if the length of side AB is sqrt(75) units, then the length of the altitude of the triangle through the vertex A is

If distance of centroid of triangle ABC from vertex A is 6 cm them find the length of median through point, A.

The sides of a Delta ^("le') ABC be 8, 7, 6 and smallest angle is C then Length of median through vertex C is

Let G be the centroid of triangle ABC and the circumcircle of triangle AGC touches the side AB at A If AC = 1, then the length of the median of triangle ABC through the vertex A is equal to