Question

What are the equations of the planes that are parallel to the plane `x+2y-2z=1` and two units away from it?

Answer 1

`x+2y-2z+5=0` and `x+2y-7=0`

Explanation:

First we'll find the equation of ALL planes parallel to the original one.
As a model consider this lesson:

Equation of a plane parallel to other

The normal vector is:
`vec n=<1,2-2>`

The equation of the plane parallel to the original one passing through `P(x_0,y_0,z_0)` is:

`vec n*"< "x-x_0,y-y_0,z-z_0> =0`
`<1,2,-2>*"<"x-x_0,y-y_0,z-z_0> =0`
`x-x_0+2y-2y_0-2z+2z_0=0`
`x+2y-2z-x_0-2y_0+2z_0=0`

Or

`x+2y-2z+d=0` [1]
where `a=1`, `b=2`, `c=-2` and `d=-x_0-2y_0+2z_0`

Now we'll find planes that obey the previous formula and at a distance of 2 units from a point in the original plane. (We should expect 2 results, one for each half-space delimited by the original plane.)
As a model consider this lesson:

Distance between 2 parallel planes

In the original plane let's choose a point.
For instance, when `x=0` and `y=0`:
`x+2y-2z=1` => `0+2*0-2z=1` => `z=-1/2`
`-> P_1 (0,0,-1/2)`

In the formula of the distance between a point and a plane (not any plane but a plane parallel to the original one, equation [1] ), keeping `D=2`, and `d` as `d` itself, we get:

`D=|ax_1+by_1+cz_1+d|/sqrt(a^2 + b^2 + c^2)`
`2=|1*0+2*0+(-2)*(-1/2)+d|/sqrt(1+4+4)`
`|d+1|=2*3` => `|d+1|=6`

First solution:
`d+1=6` => `d=5`
`-> x+2y-2z+5=0`

Second solution:
`d+1=-6` => `d=-7`
`-> x+2y-2z-7=0`