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Question
A(8, −6), B(−4, 2) and C(0, −10) are vertices of a triangle ABC. If P is the mid-point of AB and Q is the mid-point of AC, use co-ordinate geometry to show that PQ is parallel to BC. Give a special name to quadrilateral PBCQ.
Solution
P is the mid-point of AB.
So, the co-ordinate of point P are
`((8-4)/2 ,(-6 +2) /2)`
= `(4/2, (-4)/2)`
= (2, –2)
Q is the mid-point of AC.
So, the co-ordinate of point Q are
`((8 + 0)/2, (-6 - 10)/2)`
= `(8/2, (-16)/2)`
= (4, –8)
Slope of PQ =`(-8 + 2)/(4 - 2) = (-6)/2 = -3`
Slope of BC =`(-10 - 2)/(0 + 4) = (-12)/4 = -3`
Since, slope of PQ = Slope of BC,
∴ PQ || BC
Also, we have :
Slope of PB = `(-2 - 2)/(2 + 4) = (-2)/3`
Slope of QC = `(-8 + 10)/(4 - 10) = 1/2`
Thus, PB is not parallel to QC.
Hence, PBCQ is a trapezium.
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