If the length of shortest distance between the two lines (1/2)(x-1)=(1/4)(y-3)=z+2 and 3 x-y-2 z+4=0=2 x+y+z+1 is √(a/b) where a and b are coprime then find the value of (a+b).

Question

If the length of shortest distance between the two lines (1/2)(x-1)=(1/4)(y-3)=z+2 and 3 x-y-2 z+4=0=2 x+y+z+1 is √(a/b) where a and b are coprime then find the value of (a+b). (A)  (B)  (C)  (D)

Tardigrade Admin · Accepted Answer

Any plane through the second line is given by

(3 x - y - 2 z + 4) + 1 (2 x + y + z + 1) = 1

(3 + 2 λ) x + (λ - 1) y + (λ - 2) z + (4 + λ) = 0

If this plane is parallel to first line then its normal must be at right angles to first line

(3 + 2 λ) 2 + (λ - 1) 4 + (λ - 2) = 0 \Rightarrow λ = 0

∴

equation of plane through the second line and parallel to first line is

3 x - y - 2 z + 4 = 0

Shortest distance

=⊥

distance of a point

(1, 3, - 2)

on the first line to the plane

3 x - y - 2 z + 4 = 0

S.D. = \frac{∣3 - 3 + 4 + 4∣}{3 ^{2} + 1 ^{2} + 2 ^{2}} = \frac{8}{14} = \frac{64}{14} = \frac{32}{7} = \frac{a}{b}

a = 32; b = 7

∴ (a + b) = 39

Q. If the length of shortest distance between the two lines 21​(x−1)=41​(y−3)=z+2 and 3x−y−2z+4=0=2x+y+z+1 is ba​​ where a and b are coprime then find the value of (a+b).

Q. If the length of shortest distance between the two lines $\frac{1}{2} (x - 1) = \frac{1}{4} (y - 3) = z + 2$ and $3 x - y - 2 z + 4 = 0 = 2 x + y + z + 1$ is $\frac{a}{b}$ where $a$ and $b$ are coprime then find the value of $(a + b)$ .