A tetrahedron is called isosceles if each pair of edges which do not share a vertex have equal length.
Prove that a tetrahedron is isosceles if and only if all four faces have the same perimeter.
Let \(OABC\) be an isosceles tetrahedron and let \(\overrightarrow{OA} = \mathbf{a}\), \(\overrightarrow{OB} = \mathbf{b}\) and \(\overrightarrow{OC} = \mathbf{c}\).
By considering the lengths of \(OA\) and \(BC\), show that
\[2\mathbf{b}.\mathbf{c} = |\mathbf{b}|^2 + |\mathbf{c}|^2 - |\mathbf{a}|^2.\]
Show that
\[\mathbf{a}.(\mathbf{b}+\mathbf{c}) = |\mathbf{a}|^2.\]
Let \(G\) be the centroid of the tetrahedron, defined by \(\overrightarrow{OG} = \frac{1}{4}(\mathbf{a}+\mathbf{b}+\mathbf{c})\).
Show that \(G\) is equidistant from all four vertices of the tetrahedron.
By considering the length of the vector \(\mathbf{a}-\mathbf{b}-\mathbf{c}\), or otherwise, show that, in an isosceles tetrahedron, none of the angles between pairs of edges which share a vertex can be obtuse. Can any of them be right angles?
The position vectors, relative to an origin \(O\),
at time \(t\) of the particles \(P\) and \(Q\) are
$$\cos t \; {\bf i} + \sin t\;{\bf j} + 0 \; {\bf k}
\text{ and }
\cos (t+\tfrac14{\pi})\, \big[{\tfrac32}{\bf i} +
{ \tfrac {3\sqrt{3}}2} {\bf k}\big]
+
3\sin(t+\tfrac14{\pi}) \; {\bf j}\;,$$
respectively, where \(0\le t \le 2\pi\,\).
Give a geometrical description of the motion of \(P\) and \(Q\).
Let \(\theta\) be the angle \(POQ\) at time \(t\) that satisfies
\(0\le\theta\le\pi\,\). Show that
\[
\cos\theta = \tfrac{3\surd2}{8} -\tfrac14 \cos( 2t +\tfrac14 \pi)\;.
\]
Show that
the total time for which
\(\theta \ge \frac14 \pi\) is \(\tfrac32 \pi\,\).
Solution:
\(P\) is travelling in a unit circle about the origin in the \(\mathbf{i}-\mathbf{j}\) plane. \(Q\) is travelling in a circle (also about the origin, but in a different plane with radius \(3\)).