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Question
If the slope of one of the straight lines ax2 + 2hxy by2 = 0 is thrice that of the other, then show that 3h2 = 4ab.
Solution
Let m1 and m2 be the slope of the pair of straight lines ax2 + 2hxy by2 = 0
Then m1 + m2 = `(-2"h")/"b"` and m1m2 = `"a"/"b"`
Given m2 = 3m1
∴ m1 + 3m1 = `(-2"h")/"b"`
⇒ 4m1 = `(-2"h")/"b"`
⇒ m1 = `(-"h")/"2b"` ....(1)
Also m1 (3m1) = `"a"/"b"`
⇒ `3m_1^2 = "a"/"b"`
⇒ `3((-"h")/"2b") = "a"/"b"` ...[Using (1)]
⇒ `("3h"^2)/("4b"^2) = "a"/"b"`
⇒ `("3h"^2)/("4b") = "a"/1`
⇒ 3h2 = 4ab
Hence proved.
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