What will be the value of a and b, if (-5, a), (-3, -3), (-b, 0) and (-3, 3) are the vertices of the parallelogram?(a) a = 0, b = -1(b) a = -1, b = 1(c) a = 1, b = 1(d) a = 0, b = 1This question was posed to me in an international level competition.The above asked question is from Geometry topic in section Coordinate Geometry of Mathematics – Class 10

What will be the value of a and b, if (-5, a), (-3, -3), (-b, 0) and (

1.	What will be the value of a and b, if (-5, a), (-3, -3), (-b, 0) and (-3, 3) are the vertices of the parallelogram?(a) a = 0, b = -1(b) a = -1, b = 1(c) a = 1, b = 1(d) a = 0, b = 1This question was posed to me in an international level competition.The above asked question is from Geometry topic in section Coordinate Geometry of Mathematics – Class 10
Answer» Correct answer is (d) a = 0, B = 1 The best EXPLANATION: PQRS is a parallelogram. The opposite side of the parallelogram is equal and parallelogram. Also, the diagonals of the parallelogram BISECT each other. ∴ O is the mid-point SQ and PR. Midpoint of PR Using, section formula x = \(\frac {mx_2+nx_1}{m+n}\) and y = \(\frac {my_2+ny_1}{m+n}\) The points are P(-5, a) and R(-b, 0) and the ratio is 1:1 ∴ x = \(\frac {1(-b)+1(-5)}{2} = \frac {-b-5}{2}\) y = \(\frac {1(0)+1(a)}{2} = \frac {a}{2}\) Midpoint of QS Using, section formula x = \(\frac {mx_2+nx_1}{m+n}\) and y = \(\frac {my_2+ny_1}{m+n}\) The points are Q(-3, -3) and S(-3, 3) and the ratio is 1:1 ∴ x = \(\frac {1(-3)+1(-3)}{2} = \frac {-6}{2}\) = -3 y = \(\frac {1(3)+1(-3)}{2} = \frac {0}{2}\) = 0 Therefore, \(\frac {-b-5}{2}\) = -3 b = 1 \(\frac {a}{2}\) = 0 a = 0

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