Let ABC be an equilateral triangle with orthocenter at the origin and the side BC on the line x + 2√2y = 4.
If the coordinates of the vertex A are (α, β), then the greatest integer less than or equal to |α + √2β| is ________.
Correct Answer: 4
In an equilateral triangle, the orthocenter, centroid and circumcenter coincide. Since the orthocenter is at the origin, the centroid is also at the origin.
Distance of origin from the line x + 2√2y − 4 = 0 is:
= |−4| / √(1 + 8) = 4 / 3
In an equilateral triangle, the distance of a vertex from the opposite side is three times the distance of the centroid from that side.
So, distance of vertex A from side BC = 3 × (4/3) = 4
Using distance formula for point (α, β) from the line:
|α + 2√2β − 4| / 3 = 4
⇒ |α + 2√2β − 4| = 12
This gives possible values of |α + √2β|, whose greatest integer value is 4.
Updated for JEE Main 2026: This PYQ is important for JEE Mains, JEE Advanced and other competitive exams. Practice more questions from this chapter.