-
Multivariable calculus (also
known as
multivariate calculus) is the
extension of
calculus in one
variable to
calculus with
functions of
several variables:...
- higher-order
derivatives of single-variable
functions generalizes to the
multivariable case. If y = f(u) is a
function of u = g(x) as above, then the second...
-
domain of
definition (see
Halting problem). A
multivariate function,
multivariable function, or
function of
several variables is a
function that depends...
- Carl
Gustav Jacob Jacobi (/dʒəˈkoʊbi/; German: [jaˈkoːbi]; 10
December 1804 – 18
February 1851) was a
German mathematician who made
fundamental contributions...
-
linear model. Some
suggest that
multivariate regression is
distinct from
multivariable regression, however, that is
debated and not
consistently true across...
- f at (p, q) does not
matter in this
definition of limit. For such a
multivariable limit to exist, this
definition requires the
value of f
approaches L...
-
notation is a
mathematical notation that
simplifies formulas used in
multivariable calculus,
partial differential equations and the
theory of distributions...
-
theorem Inverse function theorem Differential Integral Series Vector Multivariable Advanced Specialized Fractional Malliavin Stochastic Variations Miscellanea...
- {\displaystyle \oint _{C}{\frac {e^{z}}{z^{3}}}dz=\pi i.} To
solve multivariable contour integrals (i.e.
surface integrals,
complex volume integrals...
- In statistics,
particularly in
hypothesis testing, the Hotelling's T-squared
distribution (T2),
proposed by
Harold Hotelling, is a
multivariate probability...
