In a `Delta ABC ` the equation of the side BC is `2x-y =3` and its circumcentre and orthocentre are `(2,4) and (1,2) ` respetively .
The distance of orthocentre from vertex A is

In a Delta ABC the equation of the side BC is 2x-y =3 and its circumcentre and orthocentre are (2,4) and (1,2) respetively . sin B.sin C=

In a Delta ABC the equation of the side BC is 2x-y =3 and its circumcentre and orthocentre are (2,4) and (1,2) respectively . Circumradius of Delta ABC is

In a Delta ABC, if a =3, b=4, c=5, then find the distance between its incentre and circumcentre.

In a triangle, ABC, the equation of the perpendicular bisector of AC is 3x - 2y + 8 = 0 . If the coordinates of the points A and B are (1, -1) & (3, 1) respectively, then the equation of the line BC will be

If the orthocentre and centroid of a triangle are (-3, 5) and (3, 3) then its circumcentre is

In triangle ABC, the equation of the right bisectors of the sides AB and AC are x+y=0 and y-x=0. respectively. If A-=(5,7) the find the equation of side BC.

The vertices of a triangle are A(0, 0), B(0, 2) and C(2, 0). The distance between circumcentre and orthocentre is

In Delta ABC it is given distance between the circumcentre (O) and orthocentre (H) is R sqrt(1-8 cos A cos B cos C) . If Q is the midopoint of OH, then AQ is

The axis of a parabola is along the line y=x and the distance of its vertex and focus from origin are sqrt(2) and 2sqrt(2) , respectively. If vertex and focus both lie in the first quadrant, then find equation of the parabola.

Find the equation of the parabola with vertex is (2, 1) and the directrix is x = y -1.