Polyhedra from equilateral triangles and squares only[edit]

Pyramids[edit]

Bipyramids[edit]

Triangular prism[edit]

Square antiprism[edit]

Bicupolae[edit]

Others[edit]

History of Scheme[edit]

Older standards[edit]

• RRS ("The Revised Report on Scheme", G.L. Steele et al., AI Memo 452, MIT, Jan 1978)
• R²RS ("The Revised Revised Report on the Algorithmic Language Scheme", Clinger, AI Memo 848, MIT Aug 1985)
• R³RS ("Dedicated to the Memory of ALGOL 60", Revised(3) Report on the Algorithmic Language Scheme)
• R⁴RS (Revised(4) Report on the Algorithmic Language Scheme)

R⁵RS and R⁶RS are already referenced from Scheme (programming language).

History of call/cc[edit]

• interaction with dynamic-wind (R5RS call/cc & dynamic-wind in terms of r4rs, faking dynamic-wind, dynamic-wind, A new specification for dynamic-wind, call/wc, and call/nwc, implementing dynamic-wind)
• interaction with values and call-with-values

Cosine powers[edit]

${\displaystyle (\cos \alpha )^{n}={\frac {1}{2^{n}}}\sum _{k=0}^{n}{\binom {n}{k}}\cos((2k-n)\alpha )}$

${\displaystyle (\cos \alpha )^{2n}={\frac {1}{4^{n}}}\left\{{\binom {2n}{n}}+2\sum _{k=1}^{n}{\binom {2n}{n-k}}\cos(2k\alpha )\right\}}$

${\displaystyle (\cos \alpha )^{2n+1}={\frac {1}{4^{n}}}\sum _{k=0}^{n}{\binom {2n+1}{n-k}}\cos((2k+1)\alpha )}$

Hermite polynomials[edit]

${\displaystyle H_{2n}(x)=(2n)!\ \sum _{k=0}^{n}{\frac {(-1)^{n-k}}{(2k)!(n-k)!}}(2x)^{2k}}$

${\displaystyle H_{2n+1}(x)=(2n+1)!\ \sum _{k=0}^{n}{\frac {(-1)^{n-k}}{(2k+1)!(n-k)!}}(2x)^{2k+1}}$

Persons with first name Hanan[edit]

• Hanan al-Shaykh, a Lebanese author of contemporary Arab women's literature
• Hanan Ashrawi, a Palestinian legislator, activist, and scholar
• Hanan Habibzai, an Afghan journalist and writer
• Hanan Qassab Hassan, a prominent Syrian writer and academic
• Hanan Ahmed Khaled, an Egyptian female athlete
• Hanan Porat, a former Israeli politician
• Hanan Rubin, a German-born Israeli politician
• Hanan Tork, an Egyptian actress and former ballerina

Semimathematics[edit]

• Semicomputable function
• Semi-continuity
• Semi-deterministic Büchi automaton
• Semi-differentiability
• Semidirect product
• Semi-elliptic operator
• Semifield
• Semigroup
• Semigroup action
• Semigroupoid
• Semi-Hilbert space
• Semi-implicit Euler method
• Semi-infinite
• Semi-infinite programming
• Semilattice
• Semi-local ring
• Seminorm → Norm (mathematics)
• Seminormal subgroup
• Semiorder
• Semiperfect number
• Semiperfect ring
• Semipermutable subgroup
• Semiprime
• Semiprime ring
• Semiprimitive ring
• Semiregular space
• Semiring
• Semi-s-cobordism
• Semiset
• Semisimple algebra
• Semisimple algebraic group
• Semisimple Lie algebra
• Semisimple module
• Semi-simple operator
• Semistable abelian variety
• Semi-Thue system

Field of rational functions[edit]

In mathematics, given a field K, the field of rational functions K(X) is the field of all rational functions in the variable X with coefficients in K. It is the field of fractions of the polynomial ring K[X].

The field of rational functions is not to be confused with the field of rationals, which is the field of fractions for the ring of integers.

Given a field K, the ring K[X] of polynomials in the variable X with coefficients in K is an integral domain so that the field of fractions of K[X] can be constructed. K(X)/K is a field extension of infinite degree.

References[edit]

• David Dummit (2003). Abstract Algebra (third ed.). Wiley. ISBN 0-471-43334-9. {{cite book}}: Unknown parameter |coauthors= ignored (|author= suggested) (help)

Category:Field theory Category:Rational functions