Terms: calculus
Matches: 52    Displayed: 31
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Categories

• Mathematics > Middle-High School Math > Pre-Calculus
• Mathematics > Middle-High School Math > Calculus
• Mathematics > College Math > Calculus

Specific Results

1. Grade 9 - 12 - Pre-Calculus (Texas)
   Provides math standards related to Pre-Calculus.

2. Calculus Standards (North Carolina Public Schools) 2-00

3. Pre-Calculus Resources (Math Forum)

4. Calculus Resources -SV (Math Forum)
   Provides single variable resources. Includes integration, differentiation, sequences and series, and more.

5. Calculus (Weisstein and Wolfram Research)
   Provides a comprehensive set of advanced resources in calculus. 12-99

6. Calculus Resources - MV (Math Forum)
   Provides multivariable resources. Includes differentiation, vector analysis, integration, and more.

7. Graphics for Calculus (Arnold)
   Provides graphics that can be used in calculus. 5-00

8. Calculus Resources (Fife and Husch)
   Provides nearly 200 sources on calculus. 5-00

9. Pre-Calculus Resources (Fife and Husch)
   Provides close to 100 sources. 5-00

10. Calculus Basic Formulas (Thinkquest Team 20991)
    Provides differentiation and integration formulas. 5-00

11. Preparation for Pre-Calculus and Calculus (Thinkquest Team 20991)
    Provides an organized list of concepts that should be understood before taking pre-calculus or calculus. 5-00

12. Calculus - History and Definitions (Columbia Encyclopedia)
    Provides an explanation of differential and integral calculus. Also provides a history of calculus and definitions. 5-00

13. Calculus Lessons (British Columbia Ministry of Education)
    Provides calculus lessons by topic. Follow the arrows at the bottom of pages to go to specific lessons. 2-01

14. Calculus Basics - Problems and Solutions (WebMath)
    Provides solutions and answers to basic problems in calculus, including Derivatives and Integration (anti-derivative). 2-04

15. Calculus Basics - Problems and Worksheets (The Mathman - Cohen)
    Provides problems and instructions designed for beginning students, but helpful to all students to gain the basics of calculus. Includes 14 examples. 6-02

16. Pre-Calculus

17. Calculus (Math Forum)
    Provides sources of lessons.

18. Calculus Derivatives and Interals (Calc101.com)
    Provides problems and solutions, by topic. Under derivatives, it includes the Product Rule, the Quotient Rule, and the Chain Rule. Under integrals, it includes Substitution, Integration by Parts, Trigonometry Powers, Trig Products, Multiple Angles, Trig Substitutions, Trig Rationals, Partial Fractions, and Using Reduction Formulas. 8-02

19. Calculus Resources (Lanius)
    Provides carefully selected resources and lessons for learning calculus. 8-02

20. Calculus Resources (Merlot.org)
    Provides 89 sites that were highly rated by peers for calculus. 8-04

21. -Calculus (Awesome Library)
    Provides lessons and introductory materials.

22. Math By Topic or Strand - Grades 10 - 12 (Math Central)
    Provides math resources by topic. Includes algebra, geometry, calculus, trigonometry, and more. 1-00

23. Math Lessons (Awesome Library)
    Provides lessons, worksheets, and activities. 6-00

24. Modeling Population Growth (University of Minnesota - Geometry Center)
    Provides equations for Unbounded Populations, Limits on Growth, Equilibria, Stability, and Phase Space Harvesting. 10-09

25. Common Errors in College Math (Vanderbilt University)
    Provides a description of the most common errors by undergraduate students in algebra, calculus, reasoning, and more. 6-02

26. Civil Liberties in a Time of Crisis (American Bar Association - Dempsey)
    "The debate over terrorism is often framed as a trade-off between liberty and security. This is a flawed calculus, in several respects. First, many civil liberties, far from being at odds with security, actually enhance the ability of the government to defend the common good. We guarantee the right to confront one’s accusers, for example, not only as an element of human dignity but also because cross-examination exposes lies and forces the government to continue looking until the truly guilty party is found." 7-02

27. Financial Mathematics (Wikipedia.org)
    Provides a directory of financial math subjects. "Financial mathematics is the branch of applied mathematics concerned with the financial markets. The subject naturally has a close relationship with the discipline of financial economics, however the subject is narrower in scope and more abstract. A central difference is that whilst a financial economist might study the structural reasons why a company may have a certain share price, a mathematician may take the share price as a given, and attempt to use stochastic calculus to obtain the fair value of derivatives of the stock."
    
    Includes the topics of Arbitrage pricing theory, Beta coefficient, Black-Scholes, Bond duration, Bond valuation, Capital asset pricing model, Financial mathematics, Historical volatility, Implied volatility, Malliavin calculus, Modern portfolio theory, Moving average (finance), Put-call parity, Quantitative analyst, Rational pricing, Return (finance), Sharpe ratio, Sortino ratio, Stochastic calculus, The Greeks, Tobin's-q, Value at risk, and Volatility. 10-04

28. Mathematical Theorems (Wikipedia.org)
    "A theorem is a statement which can be proven true within some logical framework. Proving theorems is a central activity of mathematics." Provides 212 theorems.
    
    Includes Abel's theorem, Abel-Ruffini theorem, Almost flat manifold, Arrow's impossibility theorem, Artin-Wedderburn theorem, Atiyah-Singer index theorem, Baire category theorem, Banach fixed point theorem, Banach-Tarski paradox, Barbier's theorem, Bayes' theorem, Beatty's theorem, Beck's theorem, Bell's theorem, Berry-Esséen theorem, Bertrand's ballot theorem, Binomial theorem, Bishop-Gromov inequality, Bolyai-Gerwien theorem, Borsuk-Ulam theorem, Brouwer fixed point theorem, Bruck-Chowla-Ryser theorem, Cantor's theorem, Cantor-Bernstein-Schroeder theorem, Carmichael's theorem, Cartan's theorem, Catalan's conjecture, Cauchy integral theorem, Cauchy's integral formula, Cayley-Hamilton theorem, Central limit theorem, Ceva's theorem, Chebotarev's density theorem, Chinese remainder theorem, Church-Rosser theorem, Closed and exact differential forms, Closed graph theorem, Cluster decomposition theorem, Cochran's theorem, Compact space, Compactness theorem, Convolution theorem, Cramer's rule, De Branges' theorem, De Moivre's formula, De Rham cohomology, Desargues' theorem, Dirichlet's theorem on arithmetic progressions, Dirichlet's unit theorem, Divergence theorem, Division ring, Euler's formula, Euler's identity, Euler's theorem, Extreme value theorem, Faltings' theorem, Fermat's last theorem, Fermat's little theorem, Fixed point theorems in infinite-dimensional spaces, Four color theorem, Frobenius theorem, Fubini's theorem, Fuglede's theorem, Fundamental theorem, Fundamental theorem of Riemannian geometry, Fundamental theorem of algebra, Fundamental theorem of arithmetic, Fundamental theorem of calculus, Fundamental theorem of curves, Fundamental theorem of linear algebra, Fundamental theorem of vector analysis, Gauss-Bonnet theorem, Gauss-Markov theorem, Gel'fand-Naimark theorem, Gelfond-Schneider theorem, Gibbard-Satterthwaite theorem, Girsanov's theorem, Goodstein's theorem, Gradient conjecture, Green's theorem, Gromov's compactness theorem, Gromov's theorem on groups of polynomial growth, Gödel's completeness theorem, Gödel's incompleteness theorem, Haag's theorem, Hahn embedding theorem, Hahn-Banach theorem, Hahn-Jordan decomposition, Hairy ball theorem, Hales-Jewett theorem, Hausdorff paradox, Heine-Borel theorem, Herbrand-Ribet theorem, Heron's formula, Hilbert's basis theorem, Intermediate value theorem, Invariance of domain, Isomorphism theorem, Jordan curve theorem, Kirszbraun theorem, Knaster-Tarski theorem, Kolmogorov's zero-one law, Kronecker's theorem, Kronecker-Weber theorem, Krull's principal ideal theorem, Lagrange inversion theorem, Lagrange reversion theorem, Lagrange's four-square theorem, Lagrange's theorem, Lebesgue's number lemma, Lefschetz fixed-point theorem, Lie-Kolchin theorem, Lindemann-Weierstrass theorem, Linear congruence theorem, Linnik's theorem, Liouville's theorem (complex analysis), List of lemmas, List of mathematical theorems, List of theorems, Löwenheim-Skolem theorem, Mahler's compactness theorem, Mahler's theorem, Marcinkiewitz theorem, Marriage theorem, Matiyasevich's theorem, Maximum power theorem, Mazur's torsion theorem, Mean value theorem, Mertens' theorems, Metrization theorems, Minkowski's theorem, Mordell-Weil theorem, Morera's theorem, Morley's categoricity theorem, Morley's theorem, Morley's trisector theorem, Mumford conjecture, Myers theorem, Myhill-Nerode theorem, Nagell-Lutz theorem, Nash embedding theorem, No cloning theorem, Noether's theorem, Nyquist-Shannon sampling theorem, Open mapping theorem, Paley-Wiener theorem, Pascal's theorem, Pentagonal number theorem, Perfect graph, Peter-Weyl theorem, Picard theorem, Picard-Lindelöf theorem, Pick's theorem, Pontryagin duality, Post's theorem, Poynting theorem, Prime number theorem, Primitive element (field theory), Proof that e is irrational, Proof that holomorphic functions are analytic, Proof that the sum of the reciprocals of the primes diverges, Pythagorean theorem, Quillen-Suslin theorem, Ramsey's theorem, Rao-Blackwell theorem, Reeh-Schlieder theorem, Residue theorem, Rice's theorem, Riemann mapping theorem, Riemann-Roch theorem, Riesz representation theorem, Rolle's theorem, Schreier refinement theorem, Seifert-van Kampen theorem, Shannon-Hartley theorem, Simplicial approximation theorem, Soul theorem, Spectral theorem, Sperner's lemma, Splitting theorem, Star height problem, Stark-Heegner, Stokes' theorem, Stolper-Samuelson theorem, Stone duality, Stone's representation theorem for Boolean algebras, Stone-Weierstrass theorem, Stone-von Neumann theorem, Sylvester-Gallai theorem, Szemerédi's theorem, Szemerédi-Trotter theorem, Taniyama-Shimura theorem, Taylor's theorem, Thales' theorem, Theorem Thue-Siegel-Roth theorem, Tietze extension theorem, Time hierarchy theorem, Turán's theorem, Tychonoff's theorem, Uniform boundedness principle, Uniformization theorem, Urysohn's Lemma, Van der Waerden's Theorem, Vitali-Hahn-Saks theorem, Von Neumann bicommutant theorem, Von Staudt-Clausen theorem, Weierstrass-Casorati theorem, Weil conjectures, Whitehead theorem, Whitney embedding theorem, Wilson's theorem 10-04

29. Newton, Isaac (Artzia.com)
    Provides a picture and a short biography. "English physicist and mathematician: discovered the binomial theorem, invented calculus and produced theories of mechanics, optics and gravitation." 10-04

30. Theorems - Important (Gurupedia.com)
    Provides some of the more important math theorems, including Riemann hypothesis, Continuum hypothesis, P=NP, Pythagorean theorem, Central limit theorem, Fundamental theorem of calculus, Fundamental theorem of algebra, Fundamental theorem of arithmetic, Fundamental theorem of projective geometry, Classification theorems of surfaces, and Gauss-Bonnet theorem. 8-05

31. -Graphing (Awesome Library)
    Provides calculus and pre-calculus lessons, problems, worksheets, standards, sources of lessons, and explanations.