To the problem of solution of differential geometry problems (Q2761529)

The authors prove the following result. Let a curve \(\gamma\) from \(E_3\) belong to the class \(C^2\). If \(\vec r=\vec r(t)\), \(t\in [\alpha,\beta]\) is the vector equation of the curve \(\gamma\); \({\vec r }'\), \({\vec r }''\) are non-collinear at any point \(M\in\gamma\), and \({\vec r }'=f(t)\vec{\tilde r}(t)\), where \(f(t),\;t\in [\alpha,\beta]\) is a scalar function, then \([{\vec r }'(t),{\vec r }''(t)]=f^2(t)[{\vec{\tilde r}}(t),{\vec{\tilde r} }'(t)]\). Here \([\cdot,\cdot]\) is a vector product. This result is applied to the solution of some problems from differential geometry.