The product of the length of perpendiculars drawn from the point (1,1) to the pair of lines x²+xy-6y²=0 is - Maths - Straight Lines

Question

The product of the length of perpendiculars drawn from the point
(1,1) to the pair of lines x²+xy-6y²=0 is

Shreyansh · Answer

i) x² + xy - 6y² = (x + 3y)(x - 2y), by factorization ii)
So the two lines represented by x² + xy - 6y² = 0 are"
One: x + 3y = 0 and the other is x - 2y = 0 iii) Distance of one
perpendicular from (1, 1) on to the line x + 3y = 0 is: |1 +
3|/√10 and on to the line x - 2y = 0 is = |1 - 2|/√5
==> The perpendicular distances are: 4/√10 and 1/√5
[Applying: "Distance of a point (x₁, y₁), from the line
ax + by + c= 0, is given by: |ax₁ + by₁ +
c|/√(a² + b²) "] iv) So product of perpendicular
distances = (4/√10)*(1/√5) = 4/√50 Thus the
product of perpendiculars = 4/√50 = 2√2/5