Advertisements
Advertisements
प्रश्न
The shortest distance between the skew lines `overliner= (6hati + 2hatj + 2hatk) + t(hati - 2hatj + 2hatk)` and `overliner = (-4hati - hatk) + s(3hati - 2hatj - 2hatk)` is ______.
पर्याय
9
`40/7`
108
120
Advertisements
उत्तर
The shortest distance between the skew lines `overliner= (6hati + 2hatj + 2hatk) + t(hati - 2hatj + 2hatk)` and `overliner = (-4hati - hatk) + s(3hati - 2hatj - 2hatk)` is 9.
Explanation:
Step 1: Identify vectors
A point on line 1: `bara = 6hati + 2hatj + 2hatk`
A point on line 2: `bara_2 = -4hati - hatk`
Direction vector of line 1: `barb_1 = hati -2hatj + 2hatk`
Direction vector of line 2: `barb_2 = 3hati -2hatj - 2hatk`
Step 2: Vector between the points on lines
`bara_2 - bara_1 = (-4 - 6)hati + (0 - 2)hatj + (-1 - 2)hatk = -10hati - 2hatj - 3hatk`
Step 3: Cross product `barb_1 xx barb_2`
`barb_1 xx barb_2 = |(hati, hatj, hatk),(1, -2, 2),(3, -2, -2)|`
Expand determinant:
`hati` component: (−2)(−2) − (2)(−2) = 4 + 4 = 8
`hatj` component: −[(1)(−2) − (2)(3)] = −[−2 − 6] = 8
`hatk` component: (1)(−2) − (−2)(3) = −2 + 6 = 4
So: `barb_1 xx barb_2 = 8hati + 8hatj + 4hatk`
Step 4: Magnitude of the cross product
`|barb_1 xx barb_2| = sqrt(8^2 + 8^2 + 4^2) = sqrt(64 + 64 + 16) = sqrt144 = 12`
Step 5: Dot product with vector between lines
`(barb_1 xx barb_2) * (bara_2 - bara_1) = (8)(−10) + (8)(−2) + (4)(−3) = −80 − 16 − 12 = −108`
Step 6: Shortest Distance Formula
`D = (|(barb_1 xx barb_2) * (bara_2 - bara_1)|)/(|barb_1 xx barb_2|) = (|-108|)/12 = 9`
