12 + CE style paper; 11 + CE style paper

Russian translation: первая и вторая группы будут сдавать вариант экзамен 12 плюс СЕ, а третья группа - вариант 11 плюс СЕ на бумаге

GLOSSARY ENTRY (DERIVED FROM QUESTION BELOW)
English term or phrase:12 + CE style paper; 11 + CE style paper
Russian translation:первая и вторая группы будут сдавать вариант экзамен 12 плюс СЕ, а третья группа - вариант 11 плюс СЕ на бумаге
Entered by: Katia Gygax

06:27 Jul 19, 2009
English to Russian translations [PRO]
Education / Pedagogy / college mathematics
English term or phrase: 12 + CE style paper; 11 + CE style paper
Коллеги, это отчет о проделанной работе и успехах ученика в конце учебного года. Пишет учитель математики родителям ученика. Вот контекст:

This year we have covered the following topics: fractions, algebra, shape, area, perimeter, coordinates, transformations, handling data, angle calculations, probability, averages, graph work and general number work. Set 1 and 2 will take a ***12 + CE style paper*** in the summer, while set 3 will take an ***11 + CE style paper***.

По поводу этой "бумаги" я в полной растерянности. Помогите, пожалуйста.
Katia Gygax
Local time: 10:14
см. версия
Explanation:
Я думаю, существует некий стандартизированный экзамен, называемый СЕ (один пример - в файле по ссылке) (если речь идет о США, то у них множество нешкольных экзаменов, проводимых на уровне штата, или экзаменационных материлов, разрабатываемых коммерчески).
Paper в данном случае означает экзамен (экзаменационное задание, экзаменационный материал, экзаменационный билет).
ce style - "школьный" экзамен по образцу и подобию экзамена СЕ.
Что такое 12+ пока непонятно - или на оценку 12+, или на подтверждение, что достигнут образовательный уровень 12 и выше. В любом случае, можно обойти уточнение использованием термина "уровень".

А фраза в целом будет выглядеть так: "группа 1 и 2 будет сдавать экзамен типа СЕ на уровень 12+ летом, а группа 3 ..."



http://www.hkeaa.edu.hk/DocLibrary/HKCEE/Subject_and_Syllabu...

2008-CE-MATH MATHEMATICS OBJECTIVESThe objectives of the examination are to test the candidates’: 1. knowledge of the mathematical facts, concepts, skills and principles presented in the syllabus; 2. familiarity with and use of mathematical symbols; 3. ability to use appropriate mathematical techniques for solving a variety of problems; 4. ability to communicate ideas and to present arguments mathematically. THE EXAMINATIONThe examination will consist of two papers: Paper 1 (2 hours) (60%)This paper will consist of two sections. Section A will consist of questions on the Foundation Part and Section B will consist of questions on the Whole Syllabus. Section A will further be divided into two parts. Section A(1) (33 marks) will consist of 8 to 10 questions of an elementary type and there will be no choice. Section A(2) (33 marks) will consist of 4 to 5 harder questions and there will be no choice. Section B (33 marks) will consist of questions which will be more demanding and candidates will be required to answer 3 out of 4 questions. Paper 2 ( 112hours) (40%)This paper will consist of two sections. Section A (23of the paper mark) will consist of questions on the Foundation Part and Section B (13of the paper mark) will consist of questions on the Whole Syllabus. All questions in the paper will be multiple-choice questions which will aim at a full coverage of the syllabus and there will be no choice.
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2008-CE-MATH Notes: 1. Candidates are not expected to perform lengthy manipulations. 2. In calculations candidates are expected to give answers to appropriate degrees of accuracy. 3. Electronic calculators* and mathematical drawing instruments may be used in the examination. 4. SI and metric units will be used in the examination wherever appropriate. THE SYLLABUSSyllabus Topics Notes (Whole Syllabus)Notes (Foundation Part)1 Percentages. Applications to real-life problems including simple selling problems, simple and compound interest, growth and depreciation, successive and component changes, taxation and rates. Applications to real-life problems including simple selling problems, simple and compound interest, growth and depreciation, successive and component changes, taxation and rates. Rate and ratio. Including the notation of a : b , a : b : c . Applications to real-life problems. Including the notation of a : b , a : b : c . Applications to real-life problems. Variations. Including direct, inverse, joint and partial variations. Application to real-life problems. Including direct, inverse, joint and partial variations. Application to real-life problems. Estimation.Numerical estimation.Estimation in measurement. Numerical estimation. Estimation in measurement.
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2008-CE-MATH Syllabus Topics Notes (Whole Syllabus)Notes (Foundation Part)2 Polynomials.Fundamental operations.Simple factorization, including , 22, 33, , where h , k , m and n are integers. 22ba −2baba+±ba ±)()(2nmxkhxrqxpx++=++Fundamental operations. Simple factorization, including , 22, , where h , k , m and n are integers. 22ba −2baba+±)()(2nmxkhxrqxpx++=++Remainder theorem. Including the factorization of polynomials up to degree 3 . (This topic is not included.) 3 Laws of indices. Including rational indices. Manipulation of surds, including the rationalization of denominators in the form of a . Inter-convert between simple binary/ hexadecimal numbers to decimal numbers. Using laws of integral indices to simplifyalgebraic expressions up to 2 variables. 4 Sequences. The general terms of sequences. Arithmetic and geometric sequences. Sum to n terms. Sum to infinity of geometric series. Applications to real-life problems. The general terms of sequences.
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2008-CE-MATH Syllabus Topics Notes (Whole Syllabus)Notes (Foundation Part)5 Equations in one unknown. Distinction between identities and equations.Linear equation in one unknown. Solving quadratic equations by factorization, by formula and by graph. Nature of roots. Simple application problems. Equations which can be transformed to quadratic equations. Distinction between identities and equations.Linear equation in one unknown. Solving quadratic equations by factorization, by formula and by graph. Nature of roots. Simple application problems. Simultaneous equations in two unknowns. Solving equations by reading intersecting points of given graphs. Solving two linear equations, including graphical method. Solving one linear and one quadratic equations by algebraic method. Solving equations by reading intersecting points of given graphs. Solving two linear equations, including graphical method. 6 Formulas.Numerical applications. Change of subject, excluding formulas involving radicals. Simple algebraic fractions. Numerical applications. Change of subject, excluding formulas involving radicals. Simple algebraic fractions. Functions and graphs. Notation for function. Transformation on function. Graphs of bf( )xax=+and c . f( )xaxbx=++2Notation for function. Graphs of bf( )xax=+and c . f( )xaxbx=++2
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2008-CE-MATH Syllabus Topics Notes (Whole Syllabus)Notes (Foundation Part)Knowledge of the general features of quadratic functions such as vertex, axis of symmetry and intercepts is required. The method of completing the square. Solving f(x) > k , f(x) < k , f(x) ≥ k and f(x) ≤ k graphically. Knowledge of the general features of quadratic functions such as vertex, axis of symmetry and intercepts is required. Solving f(x) > k , f(x) < k , f(x) ≥ k and f(x) ≤ k graphically. 7 Inequalities. Solving linear inequality in one unknown and representing the solution on a number line. Solving systems of linear inequalities in two unknowns graphically. Applications to linear programming. Solving linear inequality in one unknown and representing the solution on a number line. 8 Exponential and logarithmic functions. Graphs of exponential and logarithmic functions. Properties of logarithms, excluding the change of base. Applications of logarithm in real-life problems. (This topic is not included.)
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2008-CE-MATH Syllabus Topics Notes (Whole Syllabus)Notes (Foundation Part)9 Mensuration of common plane figures and solids. Including triangles, rectangles, parallelograms, trapezia, polygons, circles, cubes, cuboids, prisms, cylinders, pyramids, right circular cones and spheres. Including triangles, rectangles, parallelograms, trapezia, polygons, circles, cubes, cuboids, prisms, cylinders, pyramids, right circular cones and spheres. Length of an arc and area of a sector of a circle. By ratio only.By ratio only.Similar plane figures and solids. Relations between lengths, areas and volumes. Relations between lengths, areas and volumes.10 Deductive reasoning of geometry. The ability to present proofs is expected. The ability to present proofs is expected. Angles and straight lines. Angles at a point, angles on a straight line and vertically opposite angles. Angle properties relating to parallel lines and triangles. The intercept theorem.Angles at a point, angles on a straight line and vertically opposite angles. Angle properties relating to parallel lines and triangles. Triangles. Isosceles and equilateral triangles. Congruent and similar triangles. Medians, perpendicular bisectors, altitudes and angle bisectors in a triangle. Triangle inequality. The in-centre, circumcentre, orthocentre, centroid of a triangle. The mid-point theorem. Isosceles and equilateral triangles. Congruent and similar triangles. Medians, perpendicular bisectors, altitudes and angle bisectors in a triangle.
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2008-CE-MATH Syllabus Topics Notes (Whole Syllabus)Notes (Foundation Part)Pythagoras’ theorem. Including its converse and its applications in real-life problems.Including its converse and its applications in real-life problems.Quadrilaterals and polygons. Properties of squares, rectangles, rhombuses, parallelograms and trapezia. Sums of interior angles and of exterior angles of a convex polygon. The ability to present proofs related to parallelograms is expected. Properties of squares, rectangles, rhombuses, parallelograms and trapezia. Sums of interior angles and of exterior angles of a convex polygon. Circles. Properties of chords and arcs. Angle properties. Cyclic quadrilaterals. Tangents to circles and angles in the alternate segment. (This topic is not included.) Transformation and symmetry in 2-D figures. Including reflection, rotation, translation, dilation transformations, and reflectional, rotational symmetries. Including reflection, rotation, translation, dilation transformations, and reflectional, rotational symmetries. 3-D figures. Reflectional and rotational symmetries of cubes and regular tetrahedra. Identifying angle between two intersecting lines, angle between a line and a plane, angle between two intersecting planes and line of greatest slope. Reflectional and rotational symmetries of cubes and regular tetrahedra. Identifying angle between two intersecting lines, angle between a line and a plane, angle between two intersecting planes and line of greatest slope.
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2008-CE-MATH Syllabus Topics Notes (Whole Syllabus)Notes (Foundation Part)11 Introduction to coordinates. Translation. Reflection with respect to lines parallel to coordinate axes. Rotation about the origin through multiples of 90°. Areas of plane figures that can be cut into common 2-D rectilinear figures. Distance between two points. Coordinates of mid-point. Internal division of a line segment. Polar coordinates. Translation. Reflection with respect to lines parallel to coordinate axes. Rotation about the origin through multiples of 90°. Areas of plane figures that can be cut into common 2-D rectilinear figures. Distance between two points. Coordinates of mid-point. Polar coordinates. Coordinate geometry of straight lines. Slope (gradient) of a straight line. Conditions for parallel lines and perpendicular lines. Equation of a straight line. Knowledge of equations in different forms is not required. However, given two points, or one point and the slope, candidates should be able to find the equation of the straight line. On the other hand, given the equation of a straight line, candidates should be able to find its slope and intercepts. Intersection of straight lines. Slope (gradient) of a straight line. Conditions for parallel lines and perpendicular lines. Equation of a straight line. Knowledge of equations in different forms is not required. However, given two points, or one point and the slope, candidates should be able to find the equation of the straight line. On the other hand, given the equation of a straight line, candidates should be able to find its slope and intercepts. Intersection of straight lines.
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2008-CE-MATH Syllabus Topics Notes (Whole Syllabus)Notes (Foundation Part)Coordinate geometry of circles. Equation of a circle. Coordinates of centre and length of radius. (This topic is not included.) 12 Measure of angles. In degrees only.In degrees only.Trigonometric ratios. Sine, cosine and tangent of angles in the interval 0° to 360°. Graphs and periodicity of sine, cosine and tangent. The exact values of trigonometric ratios on special angles 30° , 45° and 60°. Simplification of sine, cosine and tangent of the angles 90° − A , 180° ± A and 360° − A .AAAcossintan =and . 1cossin22=+AASine, cosine and tangent of angles in the interval 0° to 90°. The exact values of trigonometric ratios on special angles 30° , 45° and 60° . Simplification of sine, cosine and tangent of the angle 90° − A . AAAcossintan =and . 1cossin22=+AASimple trigonometric equations. Solutions in the interval 0° to 360° only.Including graphical method. Equations of the type absinθ= , abcosθ=and abtanθ=only.Only solutions in the interval 0° to 90° are required.
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2008-CE-MATH Syllabus Topics Notes (Whole Syllabus)Notes (Foundation Part)Applications of trigonometric ratios. Finding measures of 2-D figures. Knowledge of bearings, gradients, angles of elevation and depression. Simple 2-D problems. Sine and cosine formulas. The formula 12abCsinand the Heron’s formula for area of a triangle. Angle between two intersecting lines, angle between a line and a plane and angle between two intersecting planes. Simple 3-D problems.Finding measures of 2-D figures. Knowledge of bearings, gradients, angles of elevation and depression. Simple 2-D problems. 13 Probability.Calculation of probabilities by listing the sample space and counting. (The notations n!, P and C will not appear in the question papers.) rnrnThe addition law and the multiplication law. Simple idea of conditional probability, excluding Bayes’ Theorem. Calculation of probabilities by listing the sample space and counting. (The notations n!, P and C will not appear in the question papers.) rnrn
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2008-CE-MATH Syllabus Topics Notes (Whole Syllabus)Notes (Foundation Part)14 Organization and representation of numerical data. Frequency and cumulative frequency tables; broken line graphs, bar charts, pie charts, histograms, stem-and-leaf diagrams, scatter diagrams, frequency polygons and curves, cumulative frequency polygons and curves.Including the construction and interpretation of these statistical diagrams. Frequency and cumulative frequency tables; broken line graphs, bar charts, pie charts, histograms, stem-and-leaf diagrams, scatter diagrams, frequency polygons and curves, cumulative frequency polygons and curves. Including the construction and interpretation of these statistical diagrams. Measures of central tendency.Mean, weighted mean, mode and median for ungrouped data. Mean, weighted mean, modal class and median for grouped data. Mean, weighted mean, mode and median for ungrouped data. Mean, weighted mean, modal class and median for grouped data. Measures of dispersion. Range, inter-quartile range and standard deviation. Box-and-whisker diagrams. Range, inter-quartile range and standard deviation.Box-and-whisker diagrams. Working steps are not required for calculating standard deviation. For the determination of interquartile range for grouped data, use of cumulative frequencypolygon/curve only.Uses and abuses of statistics. Sampling and data collection method. Analysis and interpretation on the data. (This topic is not included.) * See Regulation 5.15.

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Note added at 4 hrs (2009-07-19 10:41:41 GMT)
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Сорри, я и не заметила, что вклеился весь файл...

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Note added at 1 day5 hrs (2009-07-20 11:38:34 GMT)
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Катя, см. релевантные ссылки на "СЕ". СЕ - это экзамен по иностранному языку (есть китайские примеры в отношении английского, английские примеры в отношении французского). Скорее всего это Certification Exam.

вот описание системы оценивания частной школы
http://www.arnoldhouse.co.uk/index.php/for_pupils/french/sub...
• In addition to the above paper:
All boys in Year 3-5 are examined twice a year in 2 other skills (listening and speaking)
Boys in Year 6 and 7 are examined twice a year in all 4 skills (reading, writing, speaking and listening) in tests that reflect the nature of the final CE exam.

• Boys in Year 8 do not sit a “grammar” paper – instead, they sit actual CE exams – the practice exams in November, the mocks in March, the actual listening and speaking CE exams in May and the actual CE reading and writing exams in June.

• The reading and writing exams always take place either with or just before the main school exams in November and June

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Note added at 1 day5 hrs (2009-07-20 11:56:33 GMT)
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Думаю, нашла полный ответ. 12+ и 11+ это возрастные группы (в Великобритании дети оцениваются по достижению ими стандартизированной "уровневой" нормы, где уровни связаны с возрастом).

http://www.tuition.com.hk/common-entrance-exam.htm

Common Entrance Exam UK - 11+ and 13+

Over a hundred years ago the first Common Entrance Examination (CEE) took place at preparatory schools across the UK as the independent school sector made moves to standardize the entry requirements for senior schools. Today, approximately 80% of prep. schools put pupils forward for a CE examination (the shortfall exists as many senior schools continue to set their own entrance examinations).

Candidates are entered for the examinations according to age at entry to senior school and these days examination papers are set for entry at the ages of 11+ or 13+ (the 12+ was dropped a number of years ago). The 11+ is usually for entry to Year 7 and the 13+ for entry to Year 9. Again, schools may agree with parents to use one of these examinations for entry to a different year group, or for a pupil who is at a different age. Usually however, candidates who do not fit the standard profile will be asked to sit a different examination of the school’s own devising, and parents will be given details accordingly.
Selected response from:

Marina Mrouga
Local time: 11:14
Grading comment
Спасибо, Марина.
4 KudoZ points were awarded for this answer



Summary of answers provided
4варианты представления наборов: "12 + CE-стиль оформления (работы)", "11 + CE-стиль оформления "
Val Lysau
3 +1см. версия
Marina Mrouga
2см.
andress


Discussion entries: 22





  

Answers


3 hrs   confidence: Answerer confidence 4/5Answerer confidence 4/5
12 + ce style paper; 11 + ce style paper
варианты представления наборов: "12 + CE-стиль оформления (работы)", "11 + CE-стиль оформления "


Explanation:
$$$

Val Lysau
Belarus
Local time: 12:14
Meets criteria
Works in field
Native speaker of: Native in RussianRussian

Peer comments on this answer (and responses from the answerer)
neutral  Viachaslau: anw what is that???
21 mins
Login to enter a peer comment (or grade)

3 hrs   confidence: Answerer confidence 2/5Answerer confidence 2/5
12 + ce style paper; 11 + ce style paper
см.


Explanation:
экзамен/контрольная работа, выполняемая на бумаге с 12+ и 11+ упражнениями соответственно

andress
Ukraine
Local time: 11:14
Meets criteria
Specializes in field
Native speaker of: Native in RussianRussian, Native in UkrainianUkrainian
PRO pts in category: 36
Login to enter a peer comment (or grade)

4 hrs   confidence: Answerer confidence 3/5Answerer confidence 3/5 peer agreement (net): +1
12 + ce style paper; 11 + ce style paper
см. версия


Explanation:
Я думаю, существует некий стандартизированный экзамен, называемый СЕ (один пример - в файле по ссылке) (если речь идет о США, то у них множество нешкольных экзаменов, проводимых на уровне штата, или экзаменационных материлов, разрабатываемых коммерчески).
Paper в данном случае означает экзамен (экзаменационное задание, экзаменационный материал, экзаменационный билет).
ce style - "школьный" экзамен по образцу и подобию экзамена СЕ.
Что такое 12+ пока непонятно - или на оценку 12+, или на подтверждение, что достигнут образовательный уровень 12 и выше. В любом случае, можно обойти уточнение использованием термина "уровень".

А фраза в целом будет выглядеть так: "группа 1 и 2 будет сдавать экзамен типа СЕ на уровень 12+ летом, а группа 3 ..."



http://www.hkeaa.edu.hk/DocLibrary/HKCEE/Subject_and_Syllabu...

2008-CE-MATH MATHEMATICS OBJECTIVESThe objectives of the examination are to test the candidates’: 1. knowledge of the mathematical facts, concepts, skills and principles presented in the syllabus; 2. familiarity with and use of mathematical symbols; 3. ability to use appropriate mathematical techniques for solving a variety of problems; 4. ability to communicate ideas and to present arguments mathematically. THE EXAMINATIONThe examination will consist of two papers: Paper 1 (2 hours) (60%)This paper will consist of two sections. Section A will consist of questions on the Foundation Part and Section B will consist of questions on the Whole Syllabus. Section A will further be divided into two parts. Section A(1) (33 marks) will consist of 8 to 10 questions of an elementary type and there will be no choice. Section A(2) (33 marks) will consist of 4 to 5 harder questions and there will be no choice. Section B (33 marks) will consist of questions which will be more demanding and candidates will be required to answer 3 out of 4 questions. Paper 2 ( 112hours) (40%)This paper will consist of two sections. Section A (23of the paper mark) will consist of questions on the Foundation Part and Section B (13of the paper mark) will consist of questions on the Whole Syllabus. All questions in the paper will be multiple-choice questions which will aim at a full coverage of the syllabus and there will be no choice.
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2008-CE-MATH Notes: 1. Candidates are not expected to perform lengthy manipulations. 2. In calculations candidates are expected to give answers to appropriate degrees of accuracy. 3. Electronic calculators* and mathematical drawing instruments may be used in the examination. 4. SI and metric units will be used in the examination wherever appropriate. THE SYLLABUSSyllabus Topics Notes (Whole Syllabus)Notes (Foundation Part)1 Percentages. Applications to real-life problems including simple selling problems, simple and compound interest, growth and depreciation, successive and component changes, taxation and rates. Applications to real-life problems including simple selling problems, simple and compound interest, growth and depreciation, successive and component changes, taxation and rates. Rate and ratio. Including the notation of a : b , a : b : c . Applications to real-life problems. Including the notation of a : b , a : b : c . Applications to real-life problems. Variations. Including direct, inverse, joint and partial variations. Application to real-life problems. Including direct, inverse, joint and partial variations. Application to real-life problems. Estimation.Numerical estimation.Estimation in measurement. Numerical estimation. Estimation in measurement.
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2008-CE-MATH Syllabus Topics Notes (Whole Syllabus)Notes (Foundation Part)2 Polynomials.Fundamental operations.Simple factorization, including , 22, 33, , where h , k , m and n are integers. 22ba −2baba+±ba ±)()(2nmxkhxrqxpx++=++Fundamental operations. Simple factorization, including , 22, , where h , k , m and n are integers. 22ba −2baba+±)()(2nmxkhxrqxpx++=++Remainder theorem. Including the factorization of polynomials up to degree 3 . (This topic is not included.) 3 Laws of indices. Including rational indices. Manipulation of surds, including the rationalization of denominators in the form of a . Inter-convert between simple binary/ hexadecimal numbers to decimal numbers. Using laws of integral indices to simplifyalgebraic expressions up to 2 variables. 4 Sequences. The general terms of sequences. Arithmetic and geometric sequences. Sum to n terms. Sum to infinity of geometric series. Applications to real-life problems. The general terms of sequences.
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2008-CE-MATH Syllabus Topics Notes (Whole Syllabus)Notes (Foundation Part)5 Equations in one unknown. Distinction between identities and equations.Linear equation in one unknown. Solving quadratic equations by factorization, by formula and by graph. Nature of roots. Simple application problems. Equations which can be transformed to quadratic equations. Distinction between identities and equations.Linear equation in one unknown. Solving quadratic equations by factorization, by formula and by graph. Nature of roots. Simple application problems. Simultaneous equations in two unknowns. Solving equations by reading intersecting points of given graphs. Solving two linear equations, including graphical method. Solving one linear and one quadratic equations by algebraic method. Solving equations by reading intersecting points of given graphs. Solving two linear equations, including graphical method. 6 Formulas.Numerical applications. Change of subject, excluding formulas involving radicals. Simple algebraic fractions. Numerical applications. Change of subject, excluding formulas involving radicals. Simple algebraic fractions. Functions and graphs. Notation for function. Transformation on function. Graphs of bf( )xax=+and c . f( )xaxbx=++2Notation for function. Graphs of bf( )xax=+and c . f( )xaxbx=++2
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2008-CE-MATH Syllabus Topics Notes (Whole Syllabus)Notes (Foundation Part)Knowledge of the general features of quadratic functions such as vertex, axis of symmetry and intercepts is required. The method of completing the square. Solving f(x) > k , f(x) < k , f(x) ≥ k and f(x) ≤ k graphically. Knowledge of the general features of quadratic functions such as vertex, axis of symmetry and intercepts is required. Solving f(x) > k , f(x) < k , f(x) ≥ k and f(x) ≤ k graphically. 7 Inequalities. Solving linear inequality in one unknown and representing the solution on a number line. Solving systems of linear inequalities in two unknowns graphically. Applications to linear programming. Solving linear inequality in one unknown and representing the solution on a number line. 8 Exponential and logarithmic functions. Graphs of exponential and logarithmic functions. Properties of logarithms, excluding the change of base. Applications of logarithm in real-life problems. (This topic is not included.)
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2008-CE-MATH Syllabus Topics Notes (Whole Syllabus)Notes (Foundation Part)9 Mensuration of common plane figures and solids. Including triangles, rectangles, parallelograms, trapezia, polygons, circles, cubes, cuboids, prisms, cylinders, pyramids, right circular cones and spheres. Including triangles, rectangles, parallelograms, trapezia, polygons, circles, cubes, cuboids, prisms, cylinders, pyramids, right circular cones and spheres. Length of an arc and area of a sector of a circle. By ratio only.By ratio only.Similar plane figures and solids. Relations between lengths, areas and volumes. Relations between lengths, areas and volumes.10 Deductive reasoning of geometry. The ability to present proofs is expected. The ability to present proofs is expected. Angles and straight lines. Angles at a point, angles on a straight line and vertically opposite angles. Angle properties relating to parallel lines and triangles. The intercept theorem.Angles at a point, angles on a straight line and vertically opposite angles. Angle properties relating to parallel lines and triangles. Triangles. Isosceles and equilateral triangles. Congruent and similar triangles. Medians, perpendicular bisectors, altitudes and angle bisectors in a triangle. Triangle inequality. The in-centre, circumcentre, orthocentre, centroid of a triangle. The mid-point theorem. Isosceles and equilateral triangles. Congruent and similar triangles. Medians, perpendicular bisectors, altitudes and angle bisectors in a triangle.
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2008-CE-MATH Syllabus Topics Notes (Whole Syllabus)Notes (Foundation Part)Pythagoras’ theorem. Including its converse and its applications in real-life problems.Including its converse and its applications in real-life problems.Quadrilaterals and polygons. Properties of squares, rectangles, rhombuses, parallelograms and trapezia. Sums of interior angles and of exterior angles of a convex polygon. The ability to present proofs related to parallelograms is expected. Properties of squares, rectangles, rhombuses, parallelograms and trapezia. Sums of interior angles and of exterior angles of a convex polygon. Circles. Properties of chords and arcs. Angle properties. Cyclic quadrilaterals. Tangents to circles and angles in the alternate segment. (This topic is not included.) Transformation and symmetry in 2-D figures. Including reflection, rotation, translation, dilation transformations, and reflectional, rotational symmetries. Including reflection, rotation, translation, dilation transformations, and reflectional, rotational symmetries. 3-D figures. Reflectional and rotational symmetries of cubes and regular tetrahedra. Identifying angle between two intersecting lines, angle between a line and a plane, angle between two intersecting planes and line of greatest slope. Reflectional and rotational symmetries of cubes and regular tetrahedra. Identifying angle between two intersecting lines, angle between a line and a plane, angle between two intersecting planes and line of greatest slope.
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2008-CE-MATH Syllabus Topics Notes (Whole Syllabus)Notes (Foundation Part)11 Introduction to coordinates. Translation. Reflection with respect to lines parallel to coordinate axes. Rotation about the origin through multiples of 90°. Areas of plane figures that can be cut into common 2-D rectilinear figures. Distance between two points. Coordinates of mid-point. Internal division of a line segment. Polar coordinates. Translation. Reflection with respect to lines parallel to coordinate axes. Rotation about the origin through multiples of 90°. Areas of plane figures that can be cut into common 2-D rectilinear figures. Distance between two points. Coordinates of mid-point. Polar coordinates. Coordinate geometry of straight lines. Slope (gradient) of a straight line. Conditions for parallel lines and perpendicular lines. Equation of a straight line. Knowledge of equations in different forms is not required. However, given two points, or one point and the slope, candidates should be able to find the equation of the straight line. On the other hand, given the equation of a straight line, candidates should be able to find its slope and intercepts. Intersection of straight lines. Slope (gradient) of a straight line. Conditions for parallel lines and perpendicular lines. Equation of a straight line. Knowledge of equations in different forms is not required. However, given two points, or one point and the slope, candidates should be able to find the equation of the straight line. On the other hand, given the equation of a straight line, candidates should be able to find its slope and intercepts. Intersection of straight lines.
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2008-CE-MATH Syllabus Topics Notes (Whole Syllabus)Notes (Foundation Part)Coordinate geometry of circles. Equation of a circle. Coordinates of centre and length of radius. (This topic is not included.) 12 Measure of angles. In degrees only.In degrees only.Trigonometric ratios. Sine, cosine and tangent of angles in the interval 0° to 360°. Graphs and periodicity of sine, cosine and tangent. The exact values of trigonometric ratios on special angles 30° , 45° and 60°. Simplification of sine, cosine and tangent of the angles 90° − A , 180° ± A and 360° − A .AAAcossintan =and . 1cossin22=+AASine, cosine and tangent of angles in the interval 0° to 90°. The exact values of trigonometric ratios on special angles 30° , 45° and 60° . Simplification of sine, cosine and tangent of the angle 90° − A . AAAcossintan =and . 1cossin22=+AASimple trigonometric equations. Solutions in the interval 0° to 360° only.Including graphical method. Equations of the type absinθ= , abcosθ=and abtanθ=only.Only solutions in the interval 0° to 90° are required.
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2008-CE-MATH Syllabus Topics Notes (Whole Syllabus)Notes (Foundation Part)Applications of trigonometric ratios. Finding measures of 2-D figures. Knowledge of bearings, gradients, angles of elevation and depression. Simple 2-D problems. Sine and cosine formulas. The formula 12abCsinand the Heron’s formula for area of a triangle. Angle between two intersecting lines, angle between a line and a plane and angle between two intersecting planes. Simple 3-D problems.Finding measures of 2-D figures. Knowledge of bearings, gradients, angles of elevation and depression. Simple 2-D problems. 13 Probability.Calculation of probabilities by listing the sample space and counting. (The notations n!, P and C will not appear in the question papers.) rnrnThe addition law and the multiplication law. Simple idea of conditional probability, excluding Bayes’ Theorem. Calculation of probabilities by listing the sample space and counting. (The notations n!, P and C will not appear in the question papers.) rnrn
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2008-CE-MATH Syllabus Topics Notes (Whole Syllabus)Notes (Foundation Part)14 Organization and representation of numerical data. Frequency and cumulative frequency tables; broken line graphs, bar charts, pie charts, histograms, stem-and-leaf diagrams, scatter diagrams, frequency polygons and curves, cumulative frequency polygons and curves.Including the construction and interpretation of these statistical diagrams. Frequency and cumulative frequency tables; broken line graphs, bar charts, pie charts, histograms, stem-and-leaf diagrams, scatter diagrams, frequency polygons and curves, cumulative frequency polygons and curves. Including the construction and interpretation of these statistical diagrams. Measures of central tendency.Mean, weighted mean, mode and median for ungrouped data. Mean, weighted mean, modal class and median for grouped data. Mean, weighted mean, mode and median for ungrouped data. Mean, weighted mean, modal class and median for grouped data. Measures of dispersion. Range, inter-quartile range and standard deviation. Box-and-whisker diagrams. Range, inter-quartile range and standard deviation.Box-and-whisker diagrams. Working steps are not required for calculating standard deviation. For the determination of interquartile range for grouped data, use of cumulative frequencypolygon/curve only.Uses and abuses of statistics. Sampling and data collection method. Analysis and interpretation on the data. (This topic is not included.) * See Regulation 5.15.

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Note added at 4 hrs (2009-07-19 10:41:41 GMT)
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Сорри, я и не заметила, что вклеился весь файл...

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Note added at 1 day5 hrs (2009-07-20 11:38:34 GMT)
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Катя, см. релевантные ссылки на "СЕ". СЕ - это экзамен по иностранному языку (есть китайские примеры в отношении английского, английские примеры в отношении французского). Скорее всего это Certification Exam.

вот описание системы оценивания частной школы
http://www.arnoldhouse.co.uk/index.php/for_pupils/french/sub...
• In addition to the above paper:
All boys in Year 3-5 are examined twice a year in 2 other skills (listening and speaking)
Boys in Year 6 and 7 are examined twice a year in all 4 skills (reading, writing, speaking and listening) in tests that reflect the nature of the final CE exam.

• Boys in Year 8 do not sit a “grammar” paper – instead, they sit actual CE exams – the practice exams in November, the mocks in March, the actual listening and speaking CE exams in May and the actual CE reading and writing exams in June.

• The reading and writing exams always take place either with or just before the main school exams in November and June

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Note added at 1 day5 hrs (2009-07-20 11:56:33 GMT)
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Думаю, нашла полный ответ. 12+ и 11+ это возрастные группы (в Великобритании дети оцениваются по достижению ими стандартизированной "уровневой" нормы, где уровни связаны с возрастом).

http://www.tuition.com.hk/common-entrance-exam.htm

Common Entrance Exam UK - 11+ and 13+

Over a hundred years ago the first Common Entrance Examination (CEE) took place at preparatory schools across the UK as the independent school sector made moves to standardize the entry requirements for senior schools. Today, approximately 80% of prep. schools put pupils forward for a CE examination (the shortfall exists as many senior schools continue to set their own entrance examinations).

Candidates are entered for the examinations according to age at entry to senior school and these days examination papers are set for entry at the ages of 11+ or 13+ (the 12+ was dropped a number of years ago). The 11+ is usually for entry to Year 7 and the 13+ for entry to Year 9. Again, schools may agree with parents to use one of these examinations for entry to a different year group, or for a pupil who is at a different age. Usually however, candidates who do not fit the standard profile will be asked to sit a different examination of the school’s own devising, and parents will be given details accordingly.


Marina Mrouga
Local time: 11:14
Meets criteria
Specializes in field
Native speaker of: Russian
PRO pts in category: 61
Grading comment
Спасибо, Марина.

Peer comments on this answer (and responses from the answerer)
agree  Angela Greenfield: Группы 1 и 2 будут сдавать экзамен варианта 12+, а группа 3 - варианта 11+//У нас вариант - это уровень сложности. Все дети в классе одной сложности пишут один вариант. Хотя, с учетом рос. реалий, "вариант" может быть не самым лучшим выбором слова.
3 hrs
  -> Спасибо, Анжела. Хотя мне кажется, что все же не вариант. Как правило при тестировании вариант заранее не объявляется. ДОлжны объявляться требования, критерии, перечень содержания, выносимого на оценивание.
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