Trong mặt phẳng toạ độ Oxy, cho hình chữ nhật ABCD có phương trình đường thẳng AB: x – 2y + 1 = 0, phương trình đường thẳng BD: x – 7y + 14 = 0, đường thẳng AC đi qua M(2; 1). Tìm toạ độ các đỉnh của hình chữ nhật
$B(\frac{21}{5};\frac{13}{5})$
$ABCD$ là hcn $\rightarrow (AC;AB)=(AB;BD)$
Có $\overrightarrow{n_{AB}}=(1;-2);\overrightarrow{n_{BD}}=(1;-7);\overrightarrow{n_{AC}}=(a;b)$
$\rightarrow |a-2b|=\frac{3\sqrt{2}}{2}\sqrt{a^2+b^2}\Leftrightarrow ............$
Loại TH $b=-7a$ do khi đó $AC$ ko giao $BD$

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