Calculus/Definitions

Mathematics[edit | edit source]

Mathematics is about numbers (counting), quantity, and coordinates.

Def. "[a]n abstract representational system used in the study of numbers, shapes, structure and change and the relationships between these concepts"^[1] is called mathematics.

Differences[edit | edit source]

Here's a theoretical definition:

Def. an abstract relation between identity and sameness is called a difference.

Notation: let the symbol ${\displaystyle \Delta }$ represent difference in.

Notation: let the symbol ${\displaystyle d}$ represent an infinitesimal difference in.

Notation: let the symbol ${\displaystyle \partial }$ represent an infinitesimal difference in one of more than one.

Changes[edit | edit source]

Def. "[s]ignificant change in or effect on a situation or state"^[2] or a "result of a subtraction; sometimes the absolute value of this result"^[2] is called a difference.

Derivatives[edit | edit source]

Def. a result of an "operation of deducing one function from another according to some fixed law"^[3] is called a derivative.

Let

${\displaystyle y=f(x)}$

be a function where values of ${\displaystyle x}$ may be any real number and values resulting in ${\displaystyle y}$ are also any real number.

${\displaystyle \Delta x}$ is a small finite change in ${\displaystyle x}$ which when put into the function ${\displaystyle f(x)}$ produces a ${\displaystyle \Delta y}$.

These small changes can be manipulated with the operations of arithmetic: addition (${\displaystyle +}$), subtraction (${\displaystyle -}$), multiplication (${\displaystyle *}$), and division (${\displaystyle /}$).

${\displaystyle \Delta y=f(x+\Delta x)-f(x)}$

Dividing ${\displaystyle \Delta y}$ by ${\displaystyle \Delta x}$ and taking the limit as ${\displaystyle \Delta x}$ → 0, produces the slope of a line tangent to f(x) at the point x.

For example,

${\displaystyle f(x)=x^{2}}$

${\displaystyle f(x+\Delta x)=(x+\Delta x)^{2}=x^{2}+2x\Delta x+(\Delta x)^{2}}$

${\displaystyle \Delta y=(x^{2}+2x\Delta x+(\Delta x)^{2})-x^{2}}$

${\displaystyle \Delta y/\Delta x=(2x\Delta x+(\Delta x)^{2})/\Delta x}$

${\displaystyle \Delta y/\Delta x=2x+\Delta x}$

as ${\displaystyle \Delta x}$ and${\displaystyle \Delta y}$ go towards zero,

${\displaystyle dy/dx=2x+dx=\lim _{\Delta x\to 0}{f(x+\Delta x)-f(x) \over \Delta x}=2x.}$

This ratio is called the derivative.

Partial derivatives[edit | edit source]

Let

${\displaystyle y=f(x,z)}$

then

${\displaystyle \partial y=\partial f(x,z)=\partial f(x,z)\partial x+\partial f(x,z)\partial z}$

${\displaystyle \partial y/\partial x=\partial f(x,z)}$

where z is held constant and

${\displaystyle \partial y/\partial z=\partial f(x,z)}$

where x is held contstant.

Areas[edit | edit source]

In the figure on the right at the top of the page, an area is the difference in the x-direction times the difference in the y-direction.

This rectangle cornered at the origin of the curvature represents an area for the curve.

Gradients[edit | edit source]

Notation: let the symbol ${\displaystyle \nabla }$ be the gradient, i.e., derivatives for multivariable functions.

${\displaystyle \nabla f(x,z)=\partial y=\partial f(x,z)=\partial f(x,z)\partial x+\partial f(x,z)\partial z.}$

Curvatures[edit | edit source]

The graph at the top of this page shows a curve or curvature.

Variations[edit | edit source]

Def. "a partial change in the form, position, state, or qualities of a thing"^[4] or a "related but distinct thing"^[4] is called a variation.

Area under a curve[edit | edit source]

Consider the curve in the graph at the top of the page. The x-direction is left and right, the y-direction is vertical.

For

${\displaystyle \Delta x*\Delta y=[f(x+\Delta x)-f(x)]*\Delta x}$

the area under the curve shown in the diagram at right is the light purple rectangle plus the dark purple rectangle in the top figure

${\displaystyle \Delta x*\Delta y+f(x)*\Delta x=f(x+\Delta x)*\Delta x.}$

Any particular individual rectangle for a sum of rectangular areas is

${\displaystyle f(x_{i}+\Delta x_{i})*\Delta x_{i}.}$

The approximate area under the curve is the sum ${\displaystyle \sum }$ of all the individual (i) areas from i = 0 to as many as the area needed (n):

${\displaystyle \sum _{i=0}^{n}f(x_{i}+\Delta x_{i})*\Delta x_{i}.}$

Integrals[edit | edit source]

Def. a "number, the limit of the sums computed in a process in which the domain of a function is divided into small subsets and a possibly nominal value of the function on each subset is multiplied by the measure of that subset, all these products then being summed"^[5] is called an integral.

Notation: let the symbol ${\displaystyle \int }$ represent the integral.

${\displaystyle \lim _{\Delta x\to 0}\sum _{i=0}^{n}f(x_{i}+\Delta x_{i})*\Delta x_{i}=\int f(x)dx.}$

This can be within a finite interval [a,b]

${\displaystyle \int _{a}^{b}f(x)\;dx}$

when i = 0 the integral is evaluated at ${\displaystyle a}$ and i = n the integral is evaluated at ${\displaystyle b}$. Or, an indefinite integral (without notation on the integral symbol) as n goes to infinity and i = 0 is the integral evaluated at x = 0.

Theoretical calculus[edit | edit source]

Def. a branch of mathematics that deals with the finding and properties ... of infinitesimal differences [or changes] is called a calculus.

"Calculus [focuses] on limits, functions, derivatives, integrals, and infinite series."^[6]

"Although calculus (in the sense of analysis) is usually synonymous with infinitesimal calculus, not all historical formulations have relied on infinitesimals (infinitely small numbers that are nevertheless not zero)."^[7]

Line integrals[edit | edit source]

Def. an "integral the domain of whose integrand is a curve"^[8] is called a line integral.

"The pulsar dispersion measures [(DM)] provide directly the value of

${\displaystyle DM=\int _{0}^{\infty }n_{e}\,ds}$

along the line of sight to the pulsar, while the interstellar Hα intensity (at high Galactic latitudes where optical extinction is minimal) is proportional to the emission measure"^[9]

${\displaystyle EM=\int _{0}^{\infty }n_{e}^{2}ds.}$

Hypotheses[edit | edit source]

1. Calculus can be described using set theory.

1. ↑ "mathematics, In: Wiktionary". San Francisco, California: Wikimedia Foundation, Inc. January 13, 2013. Retrieved 2013-01-31.
2. ↑ ^{2.0 2.1} "difference, In: Wiktionary". San Francisco, California: Wikimedia Foundation, Inc. 28 May 2015. Retrieved 2015-06-25.
3. ↑ Poccil (13 January 2015). "derivation, In: Wiktionary". San Francisco, California: Wikimedia Foundation, Inc. Retrieved 2015-06-25. {{cite web}}: |author= has generic name (help)
4. ↑ ^{4.0 4.1} 87.113.182.130 (14 April 2011). "variation, In: Wiktionary". San Francisco, California: Wikimedia Foundation, Inc. Retrieved 2015-06-25. {{cite web}}: |author= has generic name (help)
5. ↑ "integral, In: Wiktionary". San Francisco, California: Wikimedia Foundation, Inc. 30 May 2015. Retrieved 2015-06-25.
6. ↑ "Calculus, In: Wikipedia". San Francisco, California: Wikimedia Foundation, Inc. October 13, 2012. Retrieved 2012-10-14.
7. ↑ "infinitesimal calculus, In: Wiktionary". San Francisco, California: Wikimedia Foundation, Inc. September 19, 2012. Retrieved 2013-01-31.
8. ↑ "line integral, In: Wiktionary". San Francisco, California: Wikimedia Foundation, Inc. September 18, 2013. Retrieved 2013-12-17.
9. ↑ R. J. Reynolds (May 1, 1991). "Line Integrals of n_e and ${\displaystyle n_{e}^{2}}$ at High Galactic Latitude". The Astrophysical Journal 372 (05): L17-20. doi:10.1086/186013. http://adsabs.harvard.edu/full/1991ApJ...372L..17R. Retrieved 2013-12-17.