Question

Prove that the tetrahedron with vertices at the points $O(0,0,0),A(0,1,1),B(1,0,1)$ and $C(1,1,0)$ is a regular one.

Answer 1

STEP 1 : Assumptions

Let us assume a tetrahedron with vertices at the points $O(0,0,0),A(0,1,1),B(1,0,1)$ and $C(1,1,0)$ as shown in figure.

The distance between any two points $P(x_1,y_1,z_1)$ and $Q(x_2,y_2,z_2)$ is given by,

$PQ=\sqrt{{\left(x_1-x_2\right)}^2+{\left(y_1-y_2\right)}^2+{\left(z_1-z_2\right)}^2}$

STEP 2 : Finding the distance between all the vertices of tetrahedron

Distance between $O(0,0,0)$ and $A(0,1,1)$

$OA=\sqrt{{\left(0-0\right)}^2+{\left(0-1\right)}^2+{\left(0-1\right)}^2}$

$OA=\sqrt{1^2+1^2}=\sqrt{2}$

Distance between $O(0,0,0)$ and $B(1,0,1)$

$OB=\sqrt{{\left(0-1\right)}^2+{\left(0-0\right)}^2+{\left(0-1\right)}^2}$

$OB=\sqrt{1^2+1^2}=\sqrt{2}$

Distance between $O(0,0,0)$ and $C(1,1,0)$

$OC=\sqrt{{\left(0-1\right)}^2+{\left(0-1\right)}^2+{\left(0-0\right)}^2}$

$OC=\sqrt{1^2+1^2}=\sqrt{2}$

Distance between $A(0,1,1)$ and $B(1,0,1)$

$AB=\sqrt{{\left(0-1\right)}^2+{\left(1-0\right)}^2+{\left(1-1\right)}^2}$

$AB=\sqrt{1^2+1^2}=\sqrt{2}$

Distance between $A(0,1,1)$ and $C(1,1,0)$

$AC=\sqrt{{\left(0-1\right)}^2+{\left(1-1\right)}^2+{\left(1-0\right)}^2}$

$AC=\sqrt{1^2+1^2}=\sqrt{2}$

Distance between $B(1,0,1)$ and $C(1,1,0)$

$BC=\sqrt{{\left(1-1\right)}^2+{\left(0-1\right)}^2+{\left(1-0\right)}^2}$

$BC=\sqrt{1^2+1^2}=\sqrt{2}$

Since, $OA=OB=OC=AB=AC=BC$

Therefore, the tetrahedron with vertices at the points $O(0,0,0),A(0,1,1),B(1,0,1)$ and $C(1,1,0)$ is a regular one.