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प्रश्न
Find the angle between the lines whose direction cosines l, m, n satisfy the equations 5l + m + 3n = 0 and 5mn − 2nl + 6lm = 0.
उत्तर
Given, 5l + m + 3n = 0 ...(1)
and 5mn − 2nl + 6lm = 0 ...(2)
From (1), m = − (5l + 3n)
Putting the value of m in equation (2), we get,
−5(5l + 3n)n − 2nl − 6l(5l + 3n) = 0
∴ − 25ln − 15n2 − 2nl − 30l2 − 18ln = 0
∴ − 30l2 − 45ln − 15n2 = 0
∴ 2l2 + 3ln + n2 = 0
∴ 2l2 + 2ln + ln + n2 = 0
∴ 2l(l + n) + n(l + n) = 0
∴ (l + n)(2l + n) = 0
∴ l + n = 0 or 2l + n = 0
∴ l = − n or n = − 2l
Now, m = − (5l + 3n), therefore, if l = − n,
m = − (− 5n + 3n) = 2n
∴ − l = `"m"/2 = "n"`
∴ `"l"/-1 = "m"/2 = "n"/1`
∴ the direction ratios of the first line are
a1 = −1, b1 = 2, c1 = 1
If n = − 2l, m = −(5l − 6l) = l
∴ l = m = `"n"/-2`
∴ `"l"/1 = "m"/1 = "n"/-2`
∴ the direction ratios of the second line are
a2 = 1, b2 = 1, c2 = − 2
Let θ be the angle between the lines.
Then cos θ = `|("a"_1"a"_2 + "b"_1"b"_2 + "c"_1"c"_2)/(sqrt("a"_1^2 + "b"_1^2 + "c"_1^2).sqrt ("a"_2^2 + "b"_2^2 + "c"_2^2))|`
`= |((- 1)(1) + 2(1) + 1(-2))/(sqrt((- 1)^2 + 2^2 + 1^2).sqrt(1^2 + 1^2 + (- 2)^2))|`
`= |(- 1 + 2 - 2)/(sqrt6.sqrt6)|`
`= |(- 1)/6|`
= `1/6`
∴ θ = cos−1 `(1/6)`
Notes
Answer in the textbook is incorrect.
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