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प्रश्न
Show that the lines `(x - 1)/1 = (y - 2)/2 = (z + 1)/-1` and `x/2 = (y - 3)/2 = z/(-1)` do not intersect.
उत्तर
`(x - 1)/1 = (y - 2)/2 = (z + 1)/-1` ....(1)
and `x/2 = (y - 3)/2 = z/(-1)` ....(2)
Obviously, the lines are not parallel since their d.r.s. are not proportionate.
Now the coordinates of any variable point on line (1) are (r + 1, 2r + 2, – r – 1) and coordinates of any point on line (2) are (2r’, 2r’ + 3, –r’)
If these points coincide for some r and r' values, then the lines will intersect.
i.e. the lines will intersect if:
r + 1 = 2r’,
2r + 2 = 2r’ + 3,
–r – 1 = – r’
i.e. r – 2r’ = –1 ....(3)
2r – 2r’ = 1 ....(4)
–r + r’ = 1 ....(5)
i.e. the lines will intersect if equations (3), (4) and (5) are consistent.
Now, D = `|(1, -2, -1),(2, -2, 1),(-1, 1, 1)|`
= 1(–2 – 1) + 2(2 + 1) – 1(2 – 2)
= –3 + 6
= 3 ≠ 0
∴ The equations are not consistent,
Hence the lines do not intersect.
