partial derivative การใช้

• For the higher order partial derivatives is justified in this situation.
• Partial derivatives are key to target-aware image resizing algorithms.
• Partial derivatives are done where more than one variable may change.
• Partial derivatives extend this idea to tangent hyperplanes to a curve.
• This reduces the number of partial derivatives to calculate for some.
• With this choice of independent variables, we can calculate the partial derivative
• Partial derivatives are used in vector calculus and differential geometry.
• We need both and to have continuous first partial derivatives.
• Instead a matrix of partial derivatives ( the Jacobian ) is computed.
• Thus provides a way of encoding the partial derivatives of.
• The involutivity condition is a generalization of the commutativity of partial derivatives.
• Thus Dunkl operators represent a meaningful generalization of partial derivatives.
• The equation above contains partial derivatives and is therefore not manifestly covariant.
• In general, if all order partial derivatives evaluated at a point:
• Each of the three partial derivatives in this expression has a specific meaning.
• Where the partial derivatives are taken with all other natural variables held constant.
• The fifth is just the same relation between time partial derivatives as before.
• Notice only the partial derivatives of with respect to the velocities are needed.
• Sometimes it's used for a partial derivative.
• They use the differences of partial derivatives to define the distances between mappings.