I would like to welcome everybody on my new blog.

The primary purpose of this blog will be to post various material related to the curriculum of

__A-level mathematics__,

__IB Math HL, SL and Further Math__, and

__mathematics for grades K11-K12__ or equivalent. We will post

**classnotes**,

**material for deepening into the theory** (notes, remarks, various proofs of propositions and theorems which are unlikely to be found on standard textbooks),

**solved exercises of escalating difficulty** (in order to cover even the needs of the most demanding students),

** tests**,

**collections of questions and exercises for practise**,

**projects **, etc.

It is hoped that the material will be of interest to the demanding students and to instructors/teachers/ tutors offering classes at that level.

The topics discussed here will cover a range such as:

* *
*Quadratics* (discriminant, roots, factorization, Vietta's forulae, graph), * *
*Straight line equation *
*elementary Number theory* (Euclidean division, primes, prime factorizations, LCM, GCD),
*Polynomials *(Euclidean division, long division, Horner's scheme, factor and remainder theorem, theorems on roots of polynomials, multiplicities and geometric interpretation), * *
*Partial fractions, *
*arithmetic-geometric series*,
*Mathematical induction*,
*Axioms of Real numbers *(binary relations and their properties:
reflexive, (anti)symmetric, transitive, ordering relations and
equivalence relations, N, Q, R. R as an ordered field: intervals and
bounds, completeness of real numbers and the "nested sphere theorem")
*Exponentials and Logarithms* (completeness of the reals and the definition of an irrational exponent, laws of logarithms, change of base, Exp and Log functions, the number e),
*Binomial theorem*, *Pascal's triangle*, * *
*Combinatorics *(multiplication principle, inclusion-exclusion principle, permutations with or without repetition, arrangements with or without rep., combinations with or without rep., applications), * * * *
*Linear algebra* (matrices, algebra of matrices, determinants, *m*x*n* linear systems of equations and their geometrical interpretation)* *
*$2d$ and $3d$ Coordinate and geometry and Vector geometry* (straight line equation in $2d$ and $3d$, equation of a plane, relative positions between two lines, two planes, a line and a plane, distance between a point and a line or a plane, Conics: circle, ellipse, parabola, hyperbola, coordinate, parametric, vector equations), * *
*Functions* (graphs, "$1-1$", onto, inverse, composite, monotonicity, linear, quadratic, polynomial, rational, irrational, exponential, logarithmic), * *
*Trigonometry* ( radian measures: rad and deg, geometry of a circle, trigonometric ratios in right triangles, oriented angles, trigonometric circle, trigonometric ratios for oriented angles, elementary identities, reduction to the first quadrant, trigonometric functions sinx, cosx, tanx, cotx, secx, cosecx, graphs, trig. equations, general solution formulae, sine-cosine laws, solution of triangles, addition forumale, double angle formulae, asinx+bcosx, transformation formulae from sums to products and vice versa), * *
*Sequences* (Convergent and Cauchy sequences, criteria of convergence, limits, application: e as limit of sequences),
*Limits *(abstract definitions, various computational methods), * *
*Continuity* (Bolzano and
Intermediate value theorem, extreme value theorem,), * *
*Differential and Integral* *Calculus*
(Differentiation, basic derivatives, products-quotients, tangents, chain rule, differentiation of the inverse function, implicit differentiation, Rolle's and mean
value theorem, local extrema, turning points, curve sketching, Integration, Indefinite integral - Antiderivative, basic integrals, integration by factors and by substitution, Definite integral, Fundamental theorem of integral Calculus, areas and volumes, applications, mean value theorem of integral Calculus),
*Complex numbers* (axiomatic description, Argand's diagram, operations and their geometrical interpretation, trigonometric form, exp form, De Moivre's theorem), * *
*Vectors and Vector spaces*, * *
*Groups*, *Rings*, *Fields*, * *
*Statistics *(descriptive and inferential), * *
*Probability*
(intuitive and axiomatic definition, sample spaces, events, mutually
exclusive and independent events, Bayes' theorem, expected values,
discrete and continuous distributions, gaussian, binomial, geometric,
hypergeometric), * *
*Series expansions* (Taylor, McLauren, ratio of convergence, criteria of convergence), * *
*Differential Equations*, * *
*Arithmetic methods and approximations*,
- (axiomatic)
*Euclidean Geometry*, * *
*Mathematical Logic*, .... etc

There will also frequently appear posts related to the syllabus of the

__Greek Panhellenic Exams__
(corresponding to the three classes A' ,B' ,C' of the Greek Lyceum).
These will often appear in greek (however, I will try to provide english
translations for the most interesting of these).

Finally, anything (ranging from Pure to Applied Mathematics) with sufficient interest for mathematically-oriented students/teachers/researchers may appear from time to time (under suitable headings).

You are welcome to send me questions, problems, ideas etc related to the above material or with mathematics in general! I will try my best to respond to possible questions -as soon as possible- and to adopt best practise ideas in order to help anybody taking or giving such courses and to anyone inerested in mathematics generally.

So, keep on reading and thinking!