can anyone help me with this problem:
Is it possible to construct three vectors (a,b,c) in 3D, such that angle between a and b is 30 degrees, between a and c is 150 degrees, and between b and c is 30 degrees?
If not, prove it.
can anyone help me with this problem:
Is it possible to construct three vectors (a,b,c) in 3D, such that angle between a and b is 30 degrees, between a and c is 150 degrees, and between b and c is 30 degrees?
If not, prove it.
Fix $a$ and $c$ so that the angle between $a$ and $c$ is $5\pi/6.$ All possible vectors which have angle $\pi/6$ with $a$ form a cone about $a$ with cone angle $\pi/3$. Likewise, all possible vectors which have angle $\pi/6$ with $c$ form a cone about $c$ with central angle $\pi/3$. Any third vector $b$ must lie in the intersection of both cones.
The intersection is $\{0\}$, since the closest the two cones come is in the plane of $a$ and $c$ and they each lie $\pi/6$ from their central vectors, which lie $5\pi/6$ apart.