Find the equation of the plane passing through the line of intersection of the planes 
and 
and parallel to x-axis.
Given: equation of the planes 
and 
To find: the equation of the plane passing through the line of intersection of the two given
and parallel to the x-axis.
The given equation of planes can be written in the Cartesian form, as shown below
⇒x+y+z-1=0……..(i)
⇒2x+3y-z+4=0……..(ii)
Hence given equation of planes can be written in Cartesian form are
x+y+z-1=0
2x+3y-z+4=0
The equation of a plane passing through the line of intersection of these two planes is,
x+y+z-1+λ(2x+3y-z+4)=0
⇒ x+y+z-1+2 λx+3 λy-z λ+4λ=0
⇒ (1+2λ)x+(1+3λ)y+(1-λ)z+(4λ-1)=0……………(iii)
Now, direction ratios of normal to the plane (iii), are,
a1=1+2λ, b1=1+3λ, c1=1-λ
Now the direction ratios of x-axis are,
a2=1, b2=0, c2=0
Since the required plane (iii) is parallel to x-axis, then
a1a2+b1b2+ c1c2=0
Substituting the corresponding values, we get
⇒ (1+2λ)(1)+(1+3λ)(0)+(1-λ)(0)=0
⇒ 1+2λ+0+0=0
⇒ 2λ=-1
So substituting the value of λ in equation (iii), we get
⇒ -y+3z-6=0
⇒ y-3z+6=0
Is the required equation of the plane, it can also be written as
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