Question

If the equation ax² + 5xy – 6y² + 12x + 5y + c = 0 represents a pair of perpendicular straight lines, find a and c.

Answer 1

Comparing ax² + 5xy – 6y² + 12x + 5y + c = 0 with ax² + 2hxy + by² + 2gx + 2fy + c = 0

We get a = a, 2h = 5, (or) h = `5/2`, b = -6, 2g = 12 (or) g = 6, 2f = 5 (or) f = 52, c = c

Condition for pair of straight lines to be perpendicular is a + b = 0

a + (-6) = 0

a = 6

Next to find c. Condition for the given equation to represent a pair of straight lines is

`|(a,h,g),(h,b,f),(g,f,c)|` = 0

`|(6,5/2,6),(5/2,-6,5/2),(6,5/2,c)|`= 0

`|(0,0,6-c),(5/2,-6,5/2),(6,5/2,c)|` = 0

R₁ → R₁ – R₃ 

Expanding along first row we get 0 – 0 + (6 – c) `[25/4 + 36] = 0`

(6-c) `[25/4 + 36]` = 0

6 – c = 0

6 = c (or) c = 6