The algebraic sum of the perpendicular d...

The algebraic sum of the perpendicular distances from `A(x_1, y_1)`, `B(x_2, y_2)` and `C(x_3, y_3)` to a variable line is zero. Then the line passes through (A) the orthocentre of `triangleABC` (B) centroid of `triangleABC` (C) incentre of `triangleABC` (D) circumcentre of `triangleABC`

the orthocentre of `DeltaABC`

the centroid `DeltaABC`

the circumcentre `DeltaABC`

None of these

Text Solution

Verified by Experts

The correct Answer is:

Similar Questions

Explore conceptually related problems

The algebraic sum of the perpendicular distance from A(x_1,y_1),B(x_2,y_2)and C (x_3,y_3) to a variable line is zero. Then the line passes through

The algebraic sum of the perpendicular distances from A(x_(1),y_(1)),B(x_(2),y_(2)) and C(x_(3),y_(3)) to a variable line is zero.Then the line passes through (A) the orthocentre of /_ABC(B) centroid of /_ABC(C) incentre of /_ABC(D) circumcentre of /_ABC

The algebraic sum of the perpendicular distances from the points A(-2,0),B(0,2) and C(1,1) to a variable line be zero,then all such lines

Let the algebraic sum of the perpendicular distances from the points (2,0),(0,2) and (1,1) to a variable straight line be zero.Then the line pass through a fixed point whose coordinates are (1,1) b.(2,2) c.(3,3) d.(4,4)

The plane 2x+3y+4z=12 meets the coordinate axes in A,B and C. The centroid of triangleABC is

In triangleABC, a^(2)sin(B-C)=

If the area of triangleABC is triangle =a^(2) -(b-c)^(2) , then: tanA =

The equations of the sides of a triangle are x-3y=0,4x+3y=5,3x+y=0. The line 3x-4y=0 passes through (A) Incentre (B) Centroid (C) Orthocentre (D) Circumcentre

The algebraic sum of the perpendicular distances from `A(x_1, y_1)`, `B(x_2, y_2)` and `C(x_3, y_3)` to a variable line is zero. Then the line passes through (A) the orthocentre of `triangleABC` (B) centroid of `triangleABC` (C) incentre of `triangleABC` (D) circumcentre of `triangleABC`

Text Solution

Similar Questions

Recommended Questions