#1
17th April 2015, 02:06 PM
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Syllabus SLIET LEET
Hello friend, I am appearing in the Lateral Entry Entrance Test (LEET) of Sant Longowal Institute of Engineering & Technology so I want to know the exam pattern for that can you please provide me its previous year question paper so that I can get idea about this?
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#2
24th July 2018, 09:40 AM
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Re: Syllabus SLIET LEET
Hello sir, for Sant Longowal Institute of Engineering & Technology LEET exam preparation I want syllabus. Please provide me Syllabus SLIET LEET?
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#3
24th July 2018, 09:42 AM
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Re: Syllabus SLIET LEET
The Sant Longowal Institute of Engineering and Technology is conducting SVIET test. There is no any LEET test for admission in Sant Longowal Institute of Engineering and Technology. The Sant Longowal Institute of Engineering and Technology Entrance Test is conducted by Sant Longowal Institute of Engineering and Technology for admission to various Certificate, Diploma, Degree and PG and Ph.D. level Programmes. This exam is termed as: SLIET Entrance Test-I (SET-I) Certificate Programme SLIET Entrance Test-II (SET-II) Diploma Programme SLIET Entrance Test-III (SET-III) Degree Programme (Lateral Entry) SLIET Entrance Test-IV (SET-IV) MBA Program SLIET Entrance Test-V (SET-V) Ph.D. Program SLIET Entrance Test-VI (SET-VI) M.Sc. Program Sant Longowal Institute of Engineering & Technology LEET exam syllabus: Syllabus: General Knowledge, Mental Aptitude & English Marks: 20 (20 Questions) General Science Current events of National and International importance History of India Indian Politics and Economy Indian National Movement General Mental ability Idioms/Phrases Usage of Tenses Change the form of Narration Fill in the blanks with suitable words. MATHEMATICS Marks: 20 (20Questions) Algebra: Solution of quadratic equations, relationship between their roots and coefficients. Equations reducible to quadratic equation. Symmetric Functions of roots. Formation of a quadratic equation with given roots. Arithmetic progression, Geometric progression and Arithmetico-Geometric series. Series of natural numbers Mathematical induction. Permutations and Combinations. Binomial theorem for any index. Trigonometry: Trigonometric ratios and their relations. Trigonometric Identities. T-ratios of allied angles. Addition and Subtraction formulae. Transformation of product into sum or difference and vice-versa. T-ratios of multiple and sub-multiple angles. Heights and distances. Solution of Trigonometric Equations. Coordinate Geometry: Rectangular Cartesian coordinates. Distance between two points. Section formulae. Locus of a point. Equation of a straight line in various forms. Angle between two given lines. Condition for two lines to be parallel or perpendicular. Distance of a point from a line. Line through point of intersection of two given lines. Concurrency of lines. Equation of a circle in various forms. Intersection of a circle with a straight line. Intersection of two circles. Equations of the parabola, ellipse and hyperbola in the standard forms. Calculus: Function, its domain and range. Limit, continuity and differentiability of a function. Derivative of sum, difference, product and quotient of two functions. Derivative of algebraic, trigonometric, exponential, logarithmic, hyperbolic and inverse trigonometric functions. Chain rule. Derivative of functions expressed in implicit and parametric forms. Maxima & Minima. Equation of tangent and normal. Integration as the inverse process of differentiation. Integration by parts, by substitution and by partial fractions. Integration of rational and irrational functions. Definite integral and its application for the determination of area (simple cases). |