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Question
Prove that the acute angle θ between the lines represented by the equation ax2 + 2hxy+ by2 = 0 is tanθ = `|(2sqrt(h^2 - ab))/(a + b)|` Hence find the condition that the lines are coincident.
Solution
Let m1 and m2 be slopes of lines represented by the equation
ax2 + 2hxy + by2 = 0.
∴ `m_1 + m_2 = (-2h)/b and m_1 m_2 = a/b`
∴ `(m_1 - m_2)^2 = (m_1 + m_2)^2 - 4m_1 m_2`
= `((2h)/b)^2 - 4(a/b)`
= `(4h^2)/b^2 - (4a)/b`
= `(4h^2 - 4ab)/b^2`
= `(4(h^2 - ab))/b^2`
∴ `m_1 - m_2 = ± (2sqrt(h^2 - ab))/b`
As θ is the acute angle between the lines, then:
`tan theta = |(m_1 - m_2)/(1 + m_1m_2)|`
`= |((2sqrt(h^2 - ab))/(b))/(1 + a/b)|`
`tan theta = |(2sqrt(h^2 - ab))/(a + b)|`
Now, if the lines are coincident,
then θ = 0
tan θ = 0
Lines represented by ax2 + 2hxy + by2 = 0 are coincident if and only if m1 = m2
∴ m1 - m2 = 0
∴ `(2sqrt(h^2 - ab))/b = 0`
∴ `h^2 - ab = 0`
∴ `h^2 = ab`
Lines represented by ax2 + 2hxy + by2 = 0 are coincident if and only if h2 = ab.
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