Let ABC be an acute-angled triangle, let D, F be the mid-points of BC, AB respectively. Let the perpendicular from F to AC and the perpendicular at B to BC meet in N. Prove that ND is equal to circum-radius of ABC.
The discussion uses the following Theorems:
Midpoint Theorem: The line segment joining midpoint of two sides of a triangle is half of and parallel to the third side.
Cyclic Quadrilateral: Opposite angles of a quadrilateral add up to \( 180^o\)
