Let the equations of two sides of a triangle be 3x−2y+6=0 and 4x+5y−20=0. If the orthocentre of this triangle is at (1,1), then the equation of its third side is :
A
122y−26x−1675=0
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B
26x−122y−1675=0
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C
26x+61y+1675=0
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D
122y+26x+1675=0
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Solution
The correct option is B26x−122y−1675=0 Let equation of side AB:3x−2y+6=0...(1)
and equation of side BC:4x+5y−20=0...(2) O is the orthocentre.
Slope of line AB is 32
Line CE is perpendicular to AB
So, slope of line CE is −23 ∴ Equation of line CE is (y−1)=−23(x−1) ⇒2x+3y−5=0...(3)
From Equations (2) and (3), x=352,y=−10
Now, slope of line BC is −45 ∴ Slope of line AF is 54
Thus, Equation of line AF is y−1=54(x−1) ⇒5x−4y−1=0...(4)
From Equations (1) and (4), x=−13,y=−664
Thus, the coordinates of A is (−13,−664) and coordinates of B is (352,−10) ∴ Equation of AB is y+10x−352=−10+664352+13