find the relation between x and y if (x,y) (-4,0) (1,-6) are collinear
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The given points are collinear then the area of triangle formed by these points will be 0
∴21[x1(y2−y1)+x2(y3−y1)+x3(y1−y2)]=0
Here (x1,y1)=(x,y)
(x2,y2)=(1,2)
(x3,y3)=(7,0)
⟹21[x(2−0)+1(0−y)+7(y−2)]=0
⟹21[2x−y+7y−14]=0
⟹21[2x+6y−14]=0
⟹2x+6y−14=0
⟹x+3y−7=0
Hence this is the required relation between x and y.
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