BITSAT Time Duration 2025

BITSAT Session 2 Registration: Your Ultimate Guide with Masterclass Space

Math in the BITSAT Syllabus (The Masterclass Space provides a good preparation for the BITSAT Time Duration 2025.)

1. The algebra

1. The fundamental theorem of algebra covers the following topics: complex numbers, addition, multiplication, conjugation, polar representation, properties of modulus and principal argument, triangle inequality, roots of complex numbers, and geometric interpretations.
2. Quadratic Equation Theory, including quadratic equations in complex and real number systems and their solutions.
3. Arithmetic and geometric progressions, arithmetic, geometric, and arithmetico-geometric series, sums of the first n natural numbers' squares and cubes, sums of finite arithmetic and geometric progressions, and infinite geometric series.
4. Properties of logarithms.
5. An exponential series.
6. Mixtures and permutations, Combinations as selection and permutations as arranging are basic uses.
7. Properties of binomial coefficients, Pascal's triangle, and the binomial theorem for a positive integral index
8. Matrices and determinants of order two or three, matrix addition and multiplication, adjoint and inverse of matrices, determinant characteristics and evaluation, Simple row and column operations on matrices, simultaneous linear equation solutions in two or three variables, determinant applications, and matrix types for calculating triangles' areas.
9. Algebraic applications of sets, equivalence relations, mappings, one-to-one, into and onto mappings, composition of mappings, binary operations, inverse of a function, and functions of real variables such as polynomial, modulus, signum, and largest integer.
10. Statements that are admissible in mathematics, mathematical reasoning, and proof techniques. Connecting words/phrases: strengthening comprehension of "if and only if (necessary and adequate) condition," "implies," "and/or," "implied" by," "and," "or," and "there exists," as well as a range of examples about mathematics and real life. Verifying the claims using the connecting words—the distinction between contrapositive, converse, and contradiction, and Inductive mathematics
11. Linear Inequalities: Algebraic and graphical solutions to linear inequalities in one and two variables, respectively.

2. The trigonometric formula

• Measurement of positive and negative angles, trigonometric ratios, functions with their graphs and identities, and angles in radians and degrees.
• Trigonometric equations and their solutions.
• Inverse functions of trigonometry

3. Two-Dimensional Geometry of Coordinates

• Cartesian coordinates, shift of origin, section equations, and distance between two points.
• Straight lines and pairs of straight lines: equations for several types of straight lines, angles between two lines, distances between points and lines, lines through the intersection of two provided lines, equation for the bisector of the angle between two lines, and concurrent lines.
• Circles: Standard form circle equations and parametric circle equations.
• The eccentricity, directrices, and foci of the parabola, ellipse, and hyperbola conic sections.

4. Coordinate geometry in three dimensions

• Coordinate planes and axes, distance between two points, section formula, direction ratios and cosines, equation of a straight line in space, and skew lines.
• The shortest distance between two lines, as well as the angle between them, whose direction ratios are supplied.
• A plane's equation, a point's separation from a plane, the coplanarity requirement for three lines, angles between two planes, and the angle between a line and a plane.

5. Differential calculus

• The domain and range of a function with a real value. Continuity and limits of the product, quotient, difference, and sum of two functions; differentiability.
• Differential derivatives of functions (polynomial, rational, trigonometric, inverse trigonometric, exponential, logarithmic, implicit functions), derivatives of the product, quotient, difference, and sum of two functions, chain rule, and parametric form.
• Interpretation of derivatives, tangents, and normal in geometry
• Function maxima and minima, increasing and decreasing functions.
• The mean value, intermediate value, and Rolle's theorem

6. Calculus of integration

• Integration, or indefinite integrals of standard functions, is the opposite of differentiation.
• Integration techniques include trigonometric identities, partial fractions, substitution, and parts integration.
• Applications in determining the areas under simple curves, the Fundamental Theorem of Integral Calculus, and finite integrals and their characteristics.
• Using definite integrals to calculate the areas of regions enclosed by simple curves

7. Equations of Ordinary Differential

• The variables separable technique, the formulation of a differential equation, and the order and degree of the differential equation are listed.
• Solution of first-order and first-degree homogeneous differential equations
• First-order linear differential equations

8. Probability

• A variety of probability-related terms, axiomatic and other techniques, and addition and multiplication rules
• Theorem of Bayes, conditional probability, and total probability
• Individual occurrences
• Discrete random variables and mean-variance distributions.

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9. The vectors

• Direction ratio/cosines of vectors, vector addition, scalar multiplication, and position vector of a point that divides a line segment in a certain ratio.
• To project a vector on a line, the dot and cross products of two vectors are used.
• Scalar triple products and how to interpret them geometrically.

10. Statistics

• Dispersion metrics
• Examination of frequency distributions that differ in variance but have equal means

11. The Linear Programming Method

• Different terms and ways to formulate linear programming
• Graphical solution of linear programming, regions that are feasible and infeasible, feasible and infeasible solutions, and optimal feasible solutions (up to three nontrivial requirements)

12. Modelling in mathematics

• Using linear programming, calculus, and matrices, a basic real-world problem is formulated and solved.

The English BITSAT Syllabus

The English Proficiency BITSAT Syllabus

The purpose of this test is to evaluate the candidates' overall use of the English language as a medium of self-expression in everyday contexts. BITSAT Time Duration 2025 can be prepared well with Masterclass Space. It is intended to test the candidates' vocabulary, basic grammar, comprehension, speed of reading skills, and application of the components of effective writing.

1. The use of grammar

1. Relative pronouns, determiners, prepositions, modals, and adjectives
2. Time, Agreement, and Tension
3. Concurrent Building
4. Voice, Change
5. Question Marks, Comparative Phrases

2. Vocabulary

1. Spelling and Word Formation, Odd Words, One Word, and Homophones
2. Contextual Meanings of Vocabulary (Academic Vocabulary, Definitions, Connotation)
3. Antonyms, Collocations, and Synonyms
4. Idioms & Phrasal Verbs
5. Comparative Analysis

3. Reading comprehension

1. Content/Ideas (identifying key concepts, drawing conclusions from supporting data, anticipating concepts, and differentiating facts from opinions)
2. Vocabulary (Using Metaphors and Similes in a Figurative Way; Choose CLOZE)
3. Summary (Correct Summary Based on Options)
4. Sources
5. Rearranging Data (Jigsaw Reading)

4. Make-up

• Reorganization (Word Order; Paragraph Logical Organization)
• Unity & Paragraph (Determining the Appropriate Topic Sentence;)
• Connectives/Linkers

Conclusion

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