GLAET Syllabus 2024 {Soon} All Updates, Exam Pattern Download Direct Link @gla.ac.in

GLAET Syllabus:- The topics covered in the GLAET Syllabus 2024 should be well-prepared for by candidates in order to pass the exam. Competitors looking for confirmation through GLAET 2024 should be all around familiar with the prospectus prior to beginning their arrangement. It will only assist them in studying exam-relevant topics. GLAET B.Tech schedule involves the sections and subjects of Material science, Math and English. GLAET Syllabus Material science, Math and English schedule is accessible on this page exhaustively. In addition, candidates should review the GLAET exam pattern to learn about the marking scheme, number of questions, and other details. On the following page, examine the GLAET syllabus for 2024 in detail.

The GLAET syllabus covers a wide range of subjects and topics, with a focus on testing the knowledge and aptitude of candidates in various fields. The GLAET Syllabus includes sections on mathematics, physics, chemistry, English language and comprehension, general knowledge, and current affairs. GLAET Syllabus Candidates can expect questions on topics such as algebra, trigonometry, calculus, mechanics, thermodynamics, organic and inorganic chemistry, grammar and vocabulary usage, history, geography and politics. The exam is designed to test not only the candidate’s knowledge but also their problem-solving skills and analytical abilities. With a rigorous syllabus that covers a diverse range of subjects, the GLAET Syllabus provides an excellent opportunity for candidates to showcase their academic potential and gain admission into some of the top institutions in the country.

GLAET Syllabus 2024

This article can be consulted by candidates who are looking for the GLAET Syllabus for 2024. Additionally, the examination will be administered by GLA University administrators. Therefore, all applicants must download the GLA University Entrance Test syllabus. In addition, we have organized the details of the GLA University Entrance Test Pattern for 2024 on this page. As a result, all competitors must read this article GLAET Syllabus to get ready for the exam. In addition, the GLA Entrance Test Syllabus for 2024 has been organized in PDF format. As a result, candidates can download the GLAET Syllabus 2024 by clicking on the link provided. In addition, in order to prepare for the test, refer to the following sections.

The GLAET syllabus includes topics in Mathematics, Physics, Chemistry, and English. In Mathematics, students can expect to cover topics such as algebra, trigonometry, calculus, and geometry. Physics topics will include mechanics, thermodynamics, and electricity and magnetism. Similarly, Chemistry topics will cover physical, organic, and inorganic chemistry. The GLAET Syllabus English section will test the student’s comprehension skills through reading passages and questions related to grammar and vocabulary. It is important for students to thoroughly study each of these subjects in order to perform well on the GLAET Syllabus. With the right preparation and a solid understanding of the syllabus, students can increase their chances of success on this important exam.

GLAET Syllabus 2024 Details

GLA University Entrance Test Pattern 2024

GLA University’s entrance test pattern for 2024 is designed to assess the knowledge and skills of students applying to various undergraduate and postgraduate programs. The test will consist of multiple choice questions, with each question carrying one mark. The duration of the exam will be two hours, and it will comprise four sections: English language, quantitative aptitude, logical reasoning, and general awareness. The English language section will evaluate the candidate’s comprehension, grammar, and vocabulary skills. The quantitative aptitude section will test their mathematical abilities, while the logical reasoning section will assess their analytical and problem-solving skills.

For B.Tech:

For B.Pharm:

For D. Pharm-

For B.com and BBA-

For BCA:

For B.Sc.-

 GLAET Syllabus 2024 PDF

Candidates can download the GLAET Schedule 2024. In addition, candidates can access the GLA University Entrance Test syllabus by clicking on the link. Additionally, each course has a unique syllabus. As a result, each candidate must review the course-specific syllabus. Students will also have to wait a few additional days to learn about the negative marking on the test. Thus, the members need to remain tuned to this post to know the incessant updates. In light of the course, competitors need to check the GLAET Prospectus 2024 and practice every one of the points. Likewise, competitors need to address the inquiries in the test in view of the negative checking. As a result, students must practice all topics without skipping any of them.

Mathematics

Algebra

• Functions- Types of functions – Definitions – Inverse functions &Theorems – Domain, Range, Inverse of real valued functions.
• Mathematical Induction- Principle of Mathematical inauguration & Theorems – Applications of Mathematical Induction – Problems on divisibility.
• Matrices: Matrix types, such as the scalar multiple and multiplication of matrices, the interchange of a matrix, the determinants, the adjoint and inverted matrix, the consistency and inconsistency of equations, the rank of a matrix, and the simultaneous solution of linear equations.
• The fundamental operations of complex numbers; the representation of complex numbers in the form a+ib; the modulus and amplitude of complex numbers; illustrations- the geometrical and polar representation of complex numbers in the Argand plane; and the Argand diagram are all examples of complex numbers. Multi-conceptual Issue based on the aforementioned ideas
• De Moivre’s Theorem- De Moivre’s theorem- Integral and Rational indices – nth radicle of unity-Geometrical Interpretations – Illustrations.
• Quadratic Expressions- Quadratic expressions, su in one variable – Sign of quadratic expressions – Change in signs – Maximum and minimum values – Quadratic inequations.
• The theory of equations includes the following topics: the relationship between an equation’s roots and coefficients; solving equations in which two or more of the roots are connected by a particular relation; real coefficients in equations; the occurrence of complex roots in conjugate pairs and the consequences of this; transformation of equations; reciprocal equations and more.
• Changes and Blends Basic Guideline of counting – direct and round Stages of ‘n’ different things taken ‘r’ at a time – Permutations when reiterations permitted – Round changes – Changes with imperative reiterations – Mixes definitions, certain hypotheses and their applications.
• Binomial Theorem- Binomial theorem for positive integral index – Binomial theorem for rational Index (without proof) – Approximations using Binomial theorem.
• Partial fractions- Partial fractions of f(x)/g(x) when g(x) contains non –repeated linear factors – Partial fractions of f(x)/g(x) where both f(x) and g(x) are polynomials and when g(x) contains repeated and/or non-repeated linear factors – Partial fractions of f(x)/g(x) when g(x) contains irreducible factors

Coordinate Geometry

• Locus- Definition of locus – Illustrations – To find sum of locus – Problems connected to it.
• Transformation of Axes- Transformation of axes – Rules, Derivations and Illustrations – Rotation of axes – Derivations – Illustrations.
• The Straightest Path: Revision of fundamental results—Straight line—Normal form—Examples—Straight line—Symmetric form—Reduction into various forms—Intersection of two straight lines—Family of straight lines—Concurrent lines—Condition for concurrent lines—Angle between two lines—Length of perpendicular from a point to a Line—Distance between two parallel lines—Concurrent lines—Properties related to a triangle
• Straight lines in a pair: Equations of a pair of lines passing through the origin: angle between a pair of lines; condition for parallel and coincident lines; bisectors of angles; pair of bisectors of angles; pair of lines; second-degree general equation; conditions for parallel lines; distance between them; point at which a pair of lines intersect; homogenizing a second-degree equation with a first-degree equation for x and y.
• Circle- Condition of circle – standard structure community and span condition of a circle with a given line section as breadth and condition of circle through three non collinear focuses – parametric conditions of a circle – Position of a point in the plane of a circle – force of a point-meaning of digression length of digression – Position of a straight line in the plane of a circle-conditions for a line to be digression – harmony joining two focuses on a circle – condition of the digression at a point on the circle-resource condition of ordinary – Harmony of contact – post and polar-form focuses and form lines – condition of harmony in term of its midpoint – Relative place of two circles contacting each other remotely, inside normal digressions – focuses of likeness condition of sets of digressions from an outer point.
• System of circles- Radial axis of two circles, properties, common chord and common tangent of two circles, radical center, and line-circle intersection are all examples of angles.
• Parabola- Conic sections –Parabola- equation of parabola in standard form-different forms of parabolaparametric equations – Equations of tangent and normal at a point on the parabola ( Cartesian and parametric) – conditions for straight line to be a tangent.
• Ellipse: Equation of ellipse in standard form- Parametric equations – Equation of tangent and normal at a point on the ellipse (Cartesian and parametric) – condition for a straight line to be a tangent.
• Parametric equations, tangent and normal equations at a point on the hyperbola (Cartesian and parametric), conditions for a straight line to be a tangent, and asymptotes are all examples of hyperbolic equations.
• Three Dimensional Coordinates: Coordinates – Section formulae – Centroid of a triangle and tetrahedron.
• Direction Cosines and Direction Ratios: Direction Cosines – Direction Ratios.
• Plane: Cartesian equation of Plane – Simple Illustrations.

Probability

• Random Experiment: outcome, sample spaces.
• Events: Mutually exclusive and exhaustive events. Axiomatic (set theoretic) probability, probability of an event, probability of “Not” and “Or” events.
• Baye’s theorem, the probability, distribution, mean, and variance of a random variable, and the multiplication theorem on probability, conditional probability, independent events, and total probability.
• Repeated independent (Bernoulli) trials and Binomial distribution

Trigonometry

• Trigonometric Ratios up to Transformations: Graphs and Periodicity of Trigonometric functions – Trigonometric ratios and Compound angles – Trigonometric ratios of multiple and sub- multiple angles – Transformations – Sum and Product rules.
• Trigonometric Equations- General Solution of Trigonometric Equations – Simple Trigonometric Equations – Solutions.
• Inverse Trigonometric Functions: To reduce a Trigonometric Function into a bijection – Graphs of Inverse Trigonometric Functions – Properties of Inverse Trigonometric Functions.
• Hyperbolic Functions- Definition of Hyperbolic Function – Graphs – Definition of Inverse Hyperbolic Functions – Graphs – Addition formulae of Hyperbolic Functions.
• Properties of Triangles: Relation between sides and angles of a Triangle – Sine, Cosine, Tangent and Projection rules – Half angle formulae and areas of a triangle – Incircle and Excircle of a Triangle.

Calculus

• Limits and Continuity: Intervals and neighbourhoods – Limits – Standard Limits – Continuity.
• Differentiation: Derivative of a function – Elementary Properties – Trigonometric, Inverse Trigonometric, Hyperbolic, Inverse Hyperbolic Function – Derivatives – Methods of Differentiation – Second Order Derivatives.
• Applications of Derivatives: Errors and approximations – Geometrical Interpretation of a derivative – Equations of tangents and normals – Lengths of tangent, normal, sub tangent and sub normal – Angles between two curves and condition for orthogonality of curves – Derivative as Rate of change – Rolle’s Theorem and Lagrange’s Mean value theorem without proofs and their geometrical interpretation – Increasing and decreasing functions – Maxima and Minima.
• Integration : Integration as the inverse process of differentiation- Standard forms -properties of integrals – Method of substitution- integration of Algebraic, exponential, logarithmic, trigonometric and inverse trigonometric functions – Integration by parts – Integration by Partial fractions method – Reduction formulae.
• Definite Integrals: Definite Integral as the limit of sum – Interpretation of Definite Integral as an area – Fundamental theorem of Integral Calculus (without proof) – Properties – Reduction formulae – Application of Definite integral to areas.

Differential Equations

Formation of differential equation-Degree and order of an ordinary differential equation – Solving differential equation by i) Variables separable method, ii) Homogeneous differential equation, iii) Non – Homogeneous differential equation, iv) Linear differential equations.

Vector

• Vectors and scalars, magnitude and direction of a vector Direction Cosines and ratios of a vector.
• Types of vector, equal, zero, unit, parallel and collinear vectors. Position vector of a point , negative of a vector, components of a vector, addition of vectors, Scalar multiplication, position vector of a point dividing a line segment in a given ratio.
• Scalar (dot) product of vectors, projection of a vector on a line.
• Vector (cross) product of vectors, Scalar triple product.
• Coordinate axes and Coordinate planes in three dimensions of a point, distance between two points and sectional formula.

Statistics

Mean, Median, and Mode of grouped data (bimodal situation to be avoided). Cumulative frequency graph.

English

• Antonym
• Synonyms
• One Word Substitutions
• Sentence Completion
• Preposition
• Articles
• Spellings
• Common Errors

Physics

Magnetic Effects of Electric Current

• Magnetic field and field lines
• Magnetic field due to a current a) Straight conductor b) Circular loop c) Solenoid
• Fleming’s Right Hand Thumb Rule
• Left Hand Rule
• Electric Motor, Electromagnetic Induction
• Electric Generator and Domestic Electric Circuit

The Human Eye and the Colorful World

• The Human Eye.
• Power of Accommodation
• Defects of Vision and Their correction
• Refraction of Light Through Prism
• Dispersion of light and scattering of light
• Atmospheric Refraction a) Twinkling of Stars b) Tyndall Effect

Light- Reflection and refraction

• Reflection of light
• Spherical Mirrors: Concave and convex
• Image Formation with Ray diagrams.
• Mirror Formula and Magnification
• Refraction of light through Glass Slab and lenses (convex and concave) and Image
• formation by lenses.
• Lens formula and Magnification
• Uses of Mirrors and Lenses
• Power of Lens.

Sources of Energy

• Different forms of Energy.
• Leading to different Sources of Human use: Fossil fuels, solar energy, biogas, wind water
• and tidal energy.
• Renewable and Non-renewable sources.

Management of Natural Resources.

• Conservation and Judicious use of natural resources.
• Forests and Wild life
• Stake holders and sustainable management
• Dams and Water Harvesting
• Cool and Petroleum.

Electricity

• Electric Current and circuit
• Electric potential and potential difference
• Ohm’s Law
• Series and Parallel combination of resistors
• Heating Effect of Electric Current
• Electric Power
• Inter relation between P,V,I and R.

Can Check:- BPSC CDPO Syllabus

How to Check GLAET Syllabus 2024 Online?

GLAET exam in 2024, it’s important to know the syllabus so you can prepare accordingly. The GLAET Syllabus 2024 is available online and can be accessed easily from the official website. The syllabus covers a range of topics, including mathematics, physics, chemistry, biology, and English language and comprehension. It is designed to test your knowledge and understanding of these subjects at the high school level. By familiarizing yourself with the syllabus, you’ll be able to focus your preparation efforts on the areas that need improvement and increase your chances of success on exam day.

• Visit the official website or click on the link gla.ac.in, which will be updated here later.
• Login page will open in a new tab.
• Enter user ID and password in the given space and click on submit button.
• GLAET 2024 Syllabus will appear on the screen in PDF format.
• Check the details given on the Syllabus carefully.
• login it and keep it safe for further use.

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