Question

Show that the combined equation of the pair of lines passing through the origin and each making an angle α with the line x + y = 0 is x² + 2(sec 2α)xy + y² = 0

Answer 1

Let OA and OB be the required lines.

Let OA (or OB) has slope m.

∴ its equation is y = mx        ...(1)

It makes an angle α with x + y = 0 whose slope is - 1.

∴ tan α = `|("m" + 1)/(1 + "m"(- 1))|`

Squaring both sides, we get,

`"tan"^2alpha = ("m" + 1)^2/(1 - "m")^2`

∴ tan²α (1 - 2m + m²) = m² + 2m + 1

∴ tan²α - 2mtan²α + m²tan²α = m² + 2m + 1

∴ (tan²α - 1)m² - 2(1 + tan²α)m + (tan²α - 1) = 0

∴ `"m"^2 - 2((1 + "tan"^2alpha)/("tan"^2alpha - 1))"m" + 1 = 0`

∴ `"m"^2 + 2((1 + "tan"^2alpha)/(1 - "tan"^2alpha)) "m" + 1 = 0`

∴ `"m"^2 + 2(sec 2 alpha)"m" + 1 = 0` ...`[because "cos 2"alpha = (1 - "tan"^2 alpha)/(1 + "tan"^2alpha)]`

∴ `"y"^2/"x"^2 + 2("sec"2alpha)"y"/"x" + 1 = 0`

∴ `"y"^2  2"xy"  "sec" 2 alpha + "x"^2 = 0`   ...[By (1)]

∴ `"y"^2 + 2"xy" "sec 2" alpha + "x"^2 = 0`

∴ x² + 2(sec 2α)xy + y² = 0 is the required equation.