Let ABC is an acute angled triangle with circumcenter O, orthocenter H. If AO = AH, then the measure of angle A is

ABC is an acute angled triangle with circumcenter O and orthocentre H. If AO=AH, then find the angle A.

ABC is an acute angled triangle with circumcenter O and orthocentre H. If AO=AH, then find the angle A.

ABC is an acute angled triangle with circumcenter O and orthocentre H. If AO=AH, then find the angle A.

Let ABC be an acute angled triangle with orthocenter H.D, E, and F are the feet of perpendicular from A,B, and C, respectively, on opposite sides. Also, let R be the circumradius of DeltaABC . Given AH.BH.CH = 3 and (AH)^(2) + (BH)^(2) + (CH)^(2) = 7 Then answer the following Value of R is

In triangle ABC, line joining the circumcenter and orthocenter is parallel to side AC, then the value of tan A tan C is equal to

Let ABC be an acute angled triangle with orthocenter H.D, E, and F are the feet of perpendicular from A,B, and C, respectively, on opposite sides. Also, let R be the circumradius of DeltaABC . Given AH.BH.CH = 3 and (AH)^(2) + (BH)^(2) + (CH)^(2) = 7 Then answer the following Value of (cos A. cos B . cos C)/(cos^(2)A + cos^(2)B + cos^(2)C) is

Let ABC be an acute angled triangle with orthocenter H.D, E, and F are the feet of perpendicular from A,B, and C, respectively, on opposite sides. Also, let R be the circumradius of DeltaABC . Given AH.BH.CH = 3 and (AH)^(2) + (BH)^(2) + (CH)^(2) = 7 Then answer the following Value of HD.HE.HF is

Let ABC be an acute angled triangle whose orthocentre is at H. If altitude from A is produced to meet the circumcircle of triangle ABC at D , then prove H D=4RcosBcosC

In an acute-angled triangle ABC, tanA+tanB+tanC

If H is the othrocenter of an acute angled triangle ABC whose circumcircle is x^2+y^2=16 , then circumdiameter of the triangle HBC is 1 (b) 2 (c) 4 (d) 8