Answer to Question #202788 in Analytic Geometry for tanya

Question #202788

Prove that the planes

7x+ 4y− 4z+ 30 = 0,36x−51y+12z+17 = 0,14x+8y−8z−12 = 0 and 12x−17y+4z−3 = 0 form the four faces of a cuboid.

please solve this ASAP.

Expert's answer

Given

Both planes are parallel if condition suffices

"\\frac{a_1}{a_2} = \\frac{b_1}{b_2} = \\frac{c_1}{c_2}."

where a₁x + b₁y + c₁z = d₁and a₂x + b₂y + c₂z = d₂are planes.

Let's consider 1st and 2nd equation.

"\\frac{7}{7} = \\frac{4}{4} = \\frac{-4}{-4}"

Let's consider 3th and 4th equation.

"\\frac{12}{12} = \\frac{-17}{-17} = \\frac{4}{4}"

So, 1,2 and 3,4 planes are parallel. A cuboid is a figure bounded by six face parallel to each opposite one. So, the planes form cuboid.

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