Let the equation of the plane containing line x-y-z-4=0, x+y+2 z-4 and parallel to the line of intersection of the planes 2 x+3 y+z=1 and x+3 y+2 z=2 be x+A y+B z+C=0. The find the value of | A + B + C -4|.

Question

Let the equation of the plane containing line x-y-z-4=0, x+y+2 z-4 and parallel to the line of intersection of the planes 2 x+3 y+z=1 and x+3 y+2 z=2 be x+A y+B z+C=0. The find the value of | A + B + C -4|. (A)  (B)  (C)  (D)

Tardigrade Admin · Accepted Answer

A plane containing the line of intersection of the given planes is.

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

i.e.,

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

vector normal to it

V = (λ + 1) \hat{i} + (λ - 1) \hat{j} + (2 λ - 1) \hat{k} S ...

(i)
Now the vector along the line of intersection of the planes

2 x + 3 y + z - 1 = 0

and

x + 3 y + 2 z - 2 = 0

is given by

n = ∣ ∣ \hat{i} 21 \hat{j} 33 \hat{k} 12 ∣ ∣ = 3 (\hat{i} - \hat{j} + \hat{k})

As

n

is parallel to the plane (i), we have

n \cdot V = 0

(λ + 1) - (λ - 1) + (2 λ - 1) = 0

2 + 2 λ - 1 = 0

or

λ = \frac{- 1}{2}

Hence, the required plane is.

\frac{x}{2} - \frac{3 y}{2} - 2 z - 2 = 0

x - 3 y - 4 z - 4 = 0

Hence,

∣ A + B + C ∣ = 6

Q. Let the equation of the plane containing line x−y−z−4=0,x+y+2z−4 and parallel to the line of intersection of the planes 2x+3y+z=1 and x+3y+2z=2 be x+Ay+Bz+C=0. The find the value of ∣A+B+C−4∣.

Q. Let the equation of the plane containing line $x - y - z - 4 = 0, x + y + 2 z - 4$ and parallel to the line of intersection of the planes $2 x + 3 y + z = 1$ and $x + 3 y + 2 z = 2$ be $x + A y + B z + C = 0$ . The find the value of $∣ A + B + C - 4∣$ .