Inner product from norm

1 · John Cook · June 19, 2021, 2:27 a.m.
If a vector space has an inner product, it has a norm: you can define the norm of a vector to be the square root of the inner product of the vector with itself. You can use the defining properties of an inner product to show that This is a form of the so-called polarization […] The post Inner product from norm first appeared on John D. Cook....