(1,2) (3,6)are two opposite vertices of a rectangle and if the other two vertices lie on the line 2y=x+6, then other two vertices are
Answers
Given : (1,2) (3,6)are two opposite vertices of a rectangle . other two vertices lie on the line 2y=x+6
To find : other two vertices
Solution:
Diagonals of rectangle bisect each other and equal in length
Hence mid point of
( 1 ,2 ) & ( 3 , 6)
= (1 + 3)/2 , (2 + 6)/2
= 2 , 4
Distance of ( 2, 4) from ( 1, 2)
= √(2 -1 )² + (4 - 2)²
= √5
Let say point on line 2y = x + 6
is (2h , h + 3 ) vertex of rectangle
Distance from mid point
√(2h -2 )² + (h+3 - 4)² = √5
=> 4h² - 8h + 4 + h² - 2h + 1 = 5
=> 5h² - 10h = 0
= 5h(h - 2) =0
=> h = 0 , h = 2
=> 2h = 0 , 4
h + 3 = 3 , 5
( 0 , 3) & ( 4 , 5 )
other two vertices are ( 0 , 3) & ( 4 , 5 )
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