Question
Assertion : The distance of the orthocentre of ΔABC from its vertex A is 2R cos A
Reason : Orthocentre is the point of intersection of altitudes drawn from opposite vertex to the sides of triangle.
- If both (A) and (R) are true, and (R) is the correct explanation of (A).
- If both (A) and (R) are true but (R) is not the correct explanation of (A).
- If (A) is true but (R) is false.
- If (A) is false but (R) is true.
The correct answer is: If both (A) and (R) are true but (R) is not the correct explanation of (A).
Let H be the orthocentre of the triangle ABC. From ΔAHF
Related Questions to study
Assertion : The orthocentre of the given triangle is coincident with the in-centre of the pedal triangle of the given triangle.
Reason : Pedal triangle is the ex-central triangle of the given triangle.
Assertion : The orthocentre of the given triangle is coincident with the in-centre of the pedal triangle of the given triangle.
Reason : Pedal triangle is the ex-central triangle of the given triangle.
The angles of a triangle ABC satisfy the relations 3B –C = 30º and A + 2B = 120º. If the perimeter of the triangle is 2 (), then the largest side is C = 2 + 2.
Reason : Largest side in a triangle is the side opposite to the largest angle.
The angles of a triangle ABC satisfy the relations 3B –C = 30º and A + 2B = 120º. If the perimeter of the triangle is 2 (), then the largest side is C = 2 + 2.
Reason : Largest side in a triangle is the side opposite to the largest angle.
Assertion: In any triangle a cos A + b cos B + c cos
Reason: In any trianglesinsinsin
Assertion: In any triangle a cos A + b cos B + c cos
Reason: In any trianglesinsinsin
Assertion : If in a triangle sin2A + sin2B + sin2C = 2 then one of the angles must be 90º.
Reason : In any triangle sin2A + sin2B + sin2 C = 2 + 2 cos A cos B cos C
Assertion : If in a triangle sin2A + sin2B + sin2C = 2 then one of the angles must be 90º.
Reason : In any triangle sin2A + sin2B + sin2 C = 2 + 2 cos A cos B cos C
Assertion : If in a triangle tan A : tan B : tan C = 1 : 2 : 3 then A = 45º
Reason : If p : q : r = 1 : 2 : 3 then p = 1
Assertion : If in a triangle tan A : tan B : tan C = 1 : 2 : 3 then A = 45º
Reason : If p : q : r = 1 : 2 : 3 then p = 1
In any equilateral Δ, three circles of radii one are touching to the sides given as in the figure then area of the Δ
In this question, we have to find the area of the triangle, The formula of area of equilateral triangle is x side2. Find the length of one side of the triangle in which you have three circle is given with radius 1 unit.
In any equilateral Δ, three circles of radii one are touching to the sides given as in the figure then area of the Δ
In this question, we have to find the area of the triangle, The formula of area of equilateral triangle is x side2. Find the length of one side of the triangle in which you have three circle is given with radius 1 unit.
Which of the following pieces of data does not uniquely determine an acute angled triangle ABC (R being the radius of the circumcircle) -
In this question, the which is not uniquely determine an acute angled triangle. If we know a, sin A , R, then we can get the ratio b/sin B or c/sin(A+B) only. We cannot determine the values of b, c, sin B, sin C separately.
Which of the following pieces of data does not uniquely determine an acute angled triangle ABC (R being the radius of the circumcircle) -
In this question, the which is not uniquely determine an acute angled triangle. If we know a, sin A , R, then we can get the ratio b/sin B or c/sin(A+B) only. We cannot determine the values of b, c, sin B, sin C separately.