Every inner product space \((V, \langle \cdot, \cdot\rangle)\) is a normed space with the norm \(\lVert \cdot\rVert\) defined by
\[ \lVert v\rVert=\sqrt{\langle v, v\rangle} \]for every \(v\in V\).
Every inner product space \((V, \langle \cdot, \cdot\rangle)\) is a normed space with the norm \(\lVert \cdot\rVert\) defined by
\[ \lVert v\rVert=\sqrt{\langle v, v\rangle} \]for every \(v\in V\).