| Cauchy-schwarz Inequality |
Website Links For Inequality |
Information AboutCauchy-schwarz Inequality |
|
The inequality states that if ''x'' and ''y'' are elements of Real or Complex Inner Product Space s then | ||
| :<math> | \langle x,x
angle - \overline\lambda \langle x,y
angle - \lambda \langle y,x
angle + \lambda^2 \langle y,y
angle </math> |
|
| :<math>\langle X,x Angle \cdot \langle Y,y Angle | \langle x,y
angle^2 + x imes y^2</math> |
|
|