{"id":31194,"date":"2022-05-05T13:04:13","date_gmt":"2022-05-05T13:04:13","guid":{"rendered":"https:\/\/pastexamquestions.com\/?p=31194"},"modified":"2022-05-05T15:54:23","modified_gmt":"2022-05-05T15:54:23","slug":"jamb-syllabus-for-mathematics-2022","status":"publish","type":"post","link":"https:\/\/pastexamquestions.com\/jamb-syllabus-for-mathematics-2022\/","title":{"rendered":"JAMB Syllabus for Mathematics 2022\/2023 Free PDF Download"},"content":{"rendered":"
– JAMB Syllabus for Mathematics 2022 –<\/b><\/p>\n
A<\/strong><\/em>re you interested in partaking in the 2022 Jamb examination? Do you want to download the JAMB Syllabus <\/i><\/b>Mathematics<\/b> 2022\/2023? If you are, then this article will benefit you a lot.<\/i><\/b>\u00a0<\/span><\/p>\n <\/a><\/p>\n This is to announce that the examination board just issued the JAMB <\/span>Mathematics<\/span> syllabus 2022\/2023, which covers a wide range of themes and crucial issues.<\/span><\/p>\n In addition, the examination<\/a> board normally provides the JAMB <\/span>Mathematics<\/span> syllabus 2022\/2023, important points, and recommended textbooks to advise you on the specific area to read and prepare ahead of your classmates. Also, with no JAMB <\/span>Mathematics<\/span> and subject syllabus, it becomes tough to cover all the concepts that you learned in school.<\/span><\/p>\n However, you should not mess around with the JAMB syllabus for <\/a><\/span>Mathematics<\/span> and other topics, no matter how smart you are.<\/span><\/p>\n The purpose of the Mathematics syllabus for the Unified Tertiary Matriculation Examination<\/a> is to prepare candidates<\/a> for the Board’s examination.<\/span><\/p>\n 1. Develop your computational and manipulative abilities.<\/span><\/p>\n 2. Develop your ability to reason precisely, logically, and formally.<\/span><\/p>\n 3. Use mathematical concepts to tackle problems<\/a> in everyday life.<\/span><\/p>\n 1. Obtaining the Mathematics syllabus will allow you to identify the topics for which you must prepare.<\/span><\/p>\n 2. You’ll learn what you need to know about each topic.<\/span><\/p>\n 3. The recommended texts section also includes a list of Mathematics books to read (with titles, authors, and editions).<\/span><\/p>\n 1. Operations on different number bases<\/a> from 2 to 10;<\/span><\/p>\n 2. Conversion from one base to another including fractional parts.<\/span><\/p>\n 1. Fractions and decimals;<\/span><\/p>\n 2.\u00a0 Significant figures;<\/span><\/p>\n 3. Decimal places;<\/span><\/p>\n 4.\u00a0 Percentage errors;<\/span><\/p>\n 5. Simple interest;<\/span><\/p>\n 6. Profit and loss per cent;<\/span><\/p>\n 7. Ratio, proportion and rate;<\/span><\/p>\n 8. Shares and valued-added tax (VAT).<\/span><\/p>\n 1. Laws of indices;<\/span><\/p>\n 2. Standard form;<\/span><\/p>\n 3. Laws of logarithm;<\/span><\/p>\n 4. Logarithm of any positive number<\/a> to a given base;<\/span><\/p>\n 5.\u00a0 Change of bases in logarithm and application;<\/span><\/p>\n 6.\u00a0 Relationship between indices and logarithm;<\/span><\/p>\n 7. Surds.<\/span><\/p>\n 1.\u00a0 Types of sets<\/span><\/p>\n 2. Algebra of sets<\/span><\/p>\n 3. Venn diagrams<\/a> and their applications.<\/span><\/p>\n 1. Change of subject of the formula<\/span><\/p>\n 2.\u00a0 Factor and remainder theorems<\/span><\/p>\n 3. Factorization of polynomials of degree not exceeding 3.<\/span><\/p>\n 4. Multiplication and division<\/a> of polynomials<\/span><\/p>\n 5.\u00a0 Roots of polynomials not exceeding degree 3<\/span><\/p>\n 6. Simultaneous equations<\/a> including one linear and one quadratic;<\/span><\/p>\n 7. Graphs of polynomials of degree not greater than.<\/span><\/p>\n 1. Direct<\/span><\/p>\n 2. Inverse<\/span><\/p>\n 3. Joint<\/span><\/p>\n 4. Partial<\/span><\/p>\n 5. Percentage increase<\/a> and decrease.<\/span><\/p>\n 1. Analytical and graphical solutions to linear inequalities;<\/span><\/p>\n 2. Quadratic inequalities with integral roots only.<\/span><\/p>\n 1. Nth term of a progression<\/a><\/span><\/p>\n 2. Sum of AP and GP.<\/span><\/p>\n 1. Properties of closure, commutativity, associativity and distributivity;<\/span><\/p>\n 2. Identity and inverse elements (simple cases only).<\/span><\/p>\n 1. Algebra of matrices not exceeding 3 x 3;<\/span><\/p>\n 2.\u00a0 determinants of matrices not exceeding 3 x 3;<\/span><\/p>\n 3. Inverses of 2 x 2 matrices [excluding quadratic and higher degree equations].<\/span><\/p>\n 1. Properties of angles and lines<\/span><\/p>\n 2.\u00a0 Polygons: triangles, quadrilaterals and general polygons;<\/span><\/p>\n 3. Circles: angle properties, cyclic quadrilaterals and intersecting chords;<\/span><\/p>\n 4. Construction.<\/span><\/p>\n 1.\u00a0 Lengths and areas of plane geometrical figures;<\/span><\/p>\n 2.\u00a0 Lengths of arcs and chords of a circle;<\/span><\/p>\n 3. Perimeters and areas of sectors<\/a> and segments of circles;<\/span><\/p>\n 4. Surface areas and volumes of simple solids and composite figures;<\/span><\/p>\n 5. The earth as a sphere:- longitudes and latitudes.<\/span><\/p>\n 1. Locus in 2 dimensions based on geometric principles relating to lines and curves.<\/span><\/p>\n 1. Midpoint and gradient of a line segment;<\/span><\/p>\n 2.\u00a0 Distance between two points;<\/span><\/p>\n 3. Parallel and perpendicular lines;<\/span><\/p>\n 4. Equations of straight lines.<\/span><\/p>\n 1.\u00a0 Trigonometrical ratios of angels;<\/span><\/p>\n 2. Angles of elevation and depression;<\/span><\/p>\n 3. Bearings;<\/span><\/p>\n 4. Areas and solutions of a triangle;<\/span><\/p>\n 5. Graphs of sine and cosine;<\/span><\/p>\n 6. Sine and cosine formulae.<\/span><\/p>\n 1. Limit of a function<\/span><\/p>\n 2. Differentiation of explicit algebraic and simple trigonometrical functions-sine, cosine and tangent.<\/span><\/p>\n 1. Rate of change;<\/span><\/p>\n 2. Maxima and minima.<\/span><\/p>\n 1. Integration of explicit algebraic and simple trigonometrical functions;<\/span><\/p>\n 2. Area under the curve.<\/span><\/p>\n 1. Frequency distribution;<\/span><\/p>\n 2. Histogram, bar chart and pie chart<\/a>.<\/span><\/p>\n 1. Mean, mode and median<\/a> of ungrouped and grouped data<\/a> \u2013 (simple cases only);<\/span><\/p>\n 2. Cumulative frequency.<\/span><\/p>\n 1. Range, mean deviation, variance and standard deviation.<\/span><\/p>\n 1.\u00a0 Linear and circular arrangements;<\/span><\/p>\n 2. Arrangements involving repeated objects.<\/span><\/p>\n 1. Experimental probability (tossing of a coin, throwing of a dice etc);<\/span><\/p>\n 2 Addition and multiplication of probabilities (mutual and independent cases).<\/span><\/p>\n The above\u00a0PDF\u00a0File has all you need to know about\u00a0UTME Syllabus\u00a0For\u00a0Mathematics.<\/p>\n Here is the JAMB recommended textbooks below:<\/span><\/p>\n 1. Adelodun A. A (2000) Distinction in Mathematics: Comprehensive Revision Text, (3rd Edition) Ado -Ekiti: FNPL.<\/span><\/p>\n 2. Anyebe, J. A. B (1998) Basic Mathematics for Senior Secondary Schools<\/a> and Remedial Students in Higher\/ institutions, Lagos: Kenny Moore.<\/p>\n 3. Channon, J. B. Smith, A. M (2001) New General Mathematics for West Africa SSS 1 to 3, Lagos: Longman.<\/p>\n 4. David -Osuagwu, M. et al (2000) New School Mathematics for Senior Secondary Schools, Onitsha: Africana \u2013 FIRST Publishers.<\/p>\n 5. Egbe. E et al (2000) Further Mathematics, Onitsha: Africana \u2013 FIRST Publishers<\/p>\n 6. Ibude, S. O. et al (2003) Algebra and Calculus for Schools and Colleges: LANCEL Publishers.<\/p>\n 7. Tuttuh \u2013 Adegun M. R. et al (1997), Further Mathematics Project Books 1 to 3, Ibadan: NPS Educational<\/p>\n 1. What is the JAMB syllabus for <\/b>Mathematics?<\/strong><\/p>\n The JAMB syllabus for <\/span>Mathematics are<\/span> number and numeration, algebra, calculus e.t.c. scroll up to check the full list.<\/span><\/p><\/blockquote>\n 2. Is the jamb 2022 syllabus out?<\/b><\/p>\n Yes, it is.<\/span><\/p><\/blockquote>\n 3. How can I study for a JAMB?<\/b><\/p>\n By following the JAMB syllabus. And reading<\/span> recommended textbooks<\/span><\/a>.<\/span><\/p><\/blockquote>\n 4. What is the JAMB syllabus for <\/b>Mathematics?<\/strong><\/p>\n They are number and numeration, algebra, calculus e.t.c.. Visit the jamb website for more information.<\/span><\/p><\/blockquote>\n 5. What are the main topics in <\/b>Mathematics<\/strong> for JAMB?<\/b><\/p>\n They are all main and important topics<\/a>.<\/span><\/p><\/blockquote>\nObjectives of JAMB Syllabus for Mathematics<\/b><\/h2>\n
Benefits of JAMB Syllabus for Mathematics<\/b><\/h2>\n
JAMB Syllabus for Mathematics 2022<\/b><\/h2>\n
Section I: Number and Numeration<\/strong><\/h3>\n
1. Number Bases<\/b><\/h4>\n
\u00a02.\u00a0 Fractions, Decimals, Approximations and Percentages<\/b><\/h4>\n
3. Indices, Logarithms and Surds<\/b><\/h4>\n
4. Sets<\/b><\/h4>\n
Section II: Algebra<\/b><\/h3>\n
1. Polynomials<\/b><\/h4>\n
2. Variation<\/b><\/h4>\n
3. Inequalities<\/b><\/h4>\n
4. Progression<\/b><\/h4>\n
5. Binary Operations<\/b><\/h4>\n
6. Matrices and Determinants<\/b><\/h4>\n
Section III: Geometry and Trigonometry<\/b><\/h3>\n
1. Euclidean Geometry<\/b><\/h4>\n
2. Mensuration<\/b><\/h4>\n
3. Loci<\/b><\/h4>\n
4. Coordinate Geometry<\/b><\/h4>\n
5. Trigonometry<\/b><\/h4>\n
Section IV: Calculus<\/b><\/h3>\n
1. Differentiation<\/b><\/h4>\n
2. Application of differentiation<\/b><\/h4>\n
3. Integration<\/b><\/h4>\n
Section V: Statistics<\/b><\/h3>\n
1. Representation of data<\/b><\/h4>\n
\u00a02. Measures of Location<\/b><\/h4>\n
3. Measures of Dispersion<\/b><\/h4>\n
4. Permutation and Combination<\/b><\/h4>\n
5. Probability<\/b><\/h4>\n
Click here to Download JAMB Syllabus for Mathematics<\/a><\/h3>\n
JAMB Mathematics Syllabus Recommended Textbooks<\/b><\/h2>\n
FAQS about Jamb Syllabus for Mathematics<\/strong> 2022<\/h3>\n
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