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Question
Question 2 (i)
Find the value of 'k', for which the following points are collinear.
(i) (7, -2), (5, 1), (3, k)
Find the value of 'k', for which the following points are collinear.
(i) (7, -2), (5, 1), (3, k)
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Solution
(i) For collinear points, area of triangle formed by them is zero.
Therefore, for points (7, -2) (5, 1) and (3, k), area = 0
Let (x1,y1)=(7,−2), (x2,y2)=(5,1) and (x3,y3)=(3,k),
Area of a triangle
=12{x1(y2−y3)+x2(y3−y1)+x3(y1−y2)}
=12[7{1−k}+5(k−(−2))+3{(−2)−1}]=0
=7−7k+5k+10−9=0
=−2k+8=0
=k=4
Therefore, for points (7, -2) (5, 1) and (3, k), area = 0
Let (x1,y1)=(7,−2), (x2,y2)=(5,1) and (x3,y3)=(3,k),
Area of a triangle
=12{x1(y2−y3)+x2(y3−y1)+x3(y1−y2)}
=12[7{1−k}+5(k−(−2))+3{(−2)−1}]=0
=7−7k+5k+10−9=0
=−2k+8=0
=k=4
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