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प्रश्न
Find the cartesian equation of the plane `vecr = (hati - hatj) + λ(hati + hatj + hatk) + µ(hati - 2hatj + 3hatk)`.
बेरीज
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उत्तर
Given plane in vector form:
`vecr = (hati - hatj) + λ(hati + hatj + hatk) + µ(hati - 2hatj + 3hatk)`
Step 1: Write in component form
Point on plane:
(1, –1, 0)
Direction vectors:
`veca = (1, 1, 1)`
`vecb = (1, -2, 3)`
Step 2: Find normal vector
`vecn = veca xx vecb`
`vecn = |(hati, hatj, hatk),(1, 1, 1),(1, -2, 3)|`
= `hati(1 * 3 - 1(-2)) - hatj(1 * 3 - 1 * 1) + hatk(1(-2) - 1 * 1)`
= `hati(3 + 2) - hatj(3 - 1) + hatk(-2 - 1)`
= `5hati - 2hatj - 3hatk`
So normal vector is (5, –2, –3).
Step 3: Equation of plane
Using point (1, –1, 0):
5(x – 1) – 2(y + 1) – 3(z – 0) = 0
5x – 5 – 2y – 2 – 3z = 0
5x – 2y – 3z – 7 = 0
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