User:OluyemiO

Five things I learnt about Wikiversity
Numbered lists are done like
 * 1) ljkl
 * 2) kjlk
 * 3) jhkjhk

Five out of the numerous things I learnt about Wikiversity

1.	Wikiversity is a free online multilingual community devoted to collaborative learning. Wikiversity is a centre for the creation and use of free learning materials and activities, building learning resources from the ground up and also link to existing internet resources. And allows anyone to edit its content.

2.	Wikiversity has the following primary priorities and goals:
 * Create and host a range of free-content, multilingual learning materials/resources, for all age groups and learner levels; Host learning and research projects and communities around existing and new materials.

3.	Wikiversity is just a part of several wiki projects owned by a non profit organisation – Wikimedia Foundation Inc.. Wikiversity main purposes are


 * for learning,
 * for teaching
 * for researching
 * for serving,
 * for sharing material
 * for sharing ideas,
 * for sharing community,

4.	Wikiversity has a culture of diplomatic honesty and good faith is one of its basis. 5.	Wikimedia runs an annual conference for wikiversity and its sister projects - Wiktionary, Wikiquote, Wikibooks, Wikisource, Wikimedia Commons, Wikispecies, Wikinews, Wikipedia, Wikimedia Incubator and Meta-Wiki

Some Complicated Math Formula
= \sum_{n=0}^\infty \frac{(a_1)_n\cdots(a_p)_n}{(c_1)_n\cdots(c_q)_n} \frac{z^n}{n!}$$
 * Maglev First and Second Derivative Derivation $${}_pF_q(a_1,\dots,a_p;c_1,\dots,c_q;z)

A version of Cauchy's integral formula holds for smooth functions as well, as it is based on Stokes' theorem. Let D be a disc in C and suppose that f is a complex-valued C1 function on the closure of D. Then
 * Cauchy’s Intergal Formula


 * $$f(\zeta,\bar{\zeta}) = \frac{1}{2\pi i}\int_{\partial D} \frac{f(z,\bar{z})dz}{z-\zeta} + \frac{1}{2\pi i}\iint_D \frac{\partial f}{\partial \bar{z}}\frac{dz\wedge d\bar{z}}{z-\zeta}.$$

One may use this representation formula to solve the inhomogeneous Cauchy–Riemann equations in D. Indeed, if φ is a function in D, then a particular solution f of the equation is a holomorphic function outside the support of μ.

Acknowledgment

 * http://en.wikipedia.org/wiki/Cauchy's_integral_formula
 * http://en.wikiversity.org/w/index.php?title=Wikiversity:Sandbox