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GOA UNIVERSITY
Taleigao Plateau
SYLLABUS FOR GOA UNIVERSITY ADMISSIONS RANKING TEST(GU-ART) IN MATHEMATICS
1. CALCULUS OF ONE VARIABLE
1. FUNCTIONS AND GRAPHS.
Prerequisites: Real Numbers, bounded sets. Definitions: Function, domain and range;
One-one and onto functions. Examples. Graphical representation of functions.
Polynomial and Rational functions. Power function: where is a real
yx
number ( x 0), General exponential function: x where a is a positive number
ya
y log x a
not equal to unity. Logarithmic function: a where is a positive number not
equal to unity. Trigonometric functions: sinx, cosx, tanx, cotx, secx and cosecx.
Inverse trigonometric functions: arcsinx, arccosx, arctanx, arccotx, arcsecx and
arccosecx. Absolute value function Properties of the absolute Value function.
()
Greatest integer function[ ].
Definitions of ‘sup’ and ‘inf ’ of a non-empty subset S of lR .Theorems on ‘sup’ and
‘inf ‘. Axiom of Lub (sup) .
2. LIMIT AND CONTINUITY.
Limit, left limit and right limit. Theorems:
(a) lim ( f g)(x) lim f (x) lim g(x) .
xc xc xc
(b) lim lim lim .
( fg)(x) f(x) g(x)
xc xc xc
lim fx()
(c) lim ( f )(x) xc provided lim
xc g lim gx( ) 0
gx() xc
xc
Limit of a function. Definition of ‘lim f(x) as x -> infinity.’ Uniqueness of limit of a Function.
Continuity at a point, continuity in an interval, types of discontinuities. Theorems on
continuity: (a) If a function is continuous on a closed interval, then it attains its bounds at
least once in it. (b) If a function f is continuous at an interior point c of an interval and
fc( ) 0 then f keeps the same sign of f(c) in a neighbourhood of c. (c) If a function f is
continuous on a closed & bounded interval [a, b], and f (a) f (b) 0, then there exists at
least one point such that (d) Intermediate value theorem.(e) fixed
c()a b fc( ) 0
point theorem.
3. THE DERIVATIVE
Drivability (Differentiability) at a point, Drivability in an interval, increasing and decreasing
functions, Sign of the derivative. Higher order derivatives. Theorems: (a) A function which is
derivable at a point is necessarily continuous at that point. (b) If f is derivable at c and
Goa University, Taleigao Plateau, Goa. Page 1
fc( ) 0, then 1f is also derivable at c. (c) Darboux’s theorem. (d) Intermediate value
theorem for derivatives.( e) Rolle’s theorem. (f) Lagranges mean value theorem.(g) Cauchy’s
mean value theorem.(h) Taylor’s theorem.(i) Maclaurin’s theorem. Increasing and
decreasing functions.
4. APPLICATION OF TAYLOR’S THEOREM
Approximations. Extreme Values, Investigation of the points of Maximum and Minimum
00
Values. Indeterminate forms, form, form, Problems. Theorems:
(a) If is an extreme value of a function f, then in case it exists, is zero. (b) If c is
fc() fc()
an interior point of the domain of a function f and then the function has a
fc( ) 0
maxima or a minima at c according as is negative or positive. (c) If f, g be two
fc()
lim lim
functions such that (i) and (ii) f (a)g (a) exist and ga( ) 0
f (x) g(x) 0
xa x a
lim f (x) f (a) 00
then g(x) g(a) . (d) L’Hopital’s Rule for form. (e) If f, g be two functions such that
xa
lim lim
x0
(i) and (ii) f (a)g (a) exist and gx( ) 0 for all except
f (x) g(x) 0
xx
lim fx() lim f (x) lim f (x)
possibly at and (iii) exists ,then (f) L’Hopital’s Rule for
gx() g(x) g (x)
x xx
form. Point of inflexion
Goa University, Taleigao Plateau, Goa. Page 2
2 : ANALYTICAL GEOMETRY
1 Analytic Geometry of two Variables. General Equation of
Second Degree. Equation ax2hxyby2gx2fyc0 Transformation of Co-
ordinates. Change of Origin and Rotation of Axes. To show that the general second degree
equation represents. (a)Ellipse if 2 (b) Parabola if 2 (c) Hyperbola if 2 .
h ab h ab h ab
(d) Circle if and (e) Rectangular Hyperbola if (f) Two straight lines if
ab h0 ab 0
a h g
0 (g) Two parallel straight lines if o and 2 whereh b f .
h ab
g f c
2.Conic sections.
Standard equations of conics using focus-directrix property. Parametric equations of
standard conics. Tangent at a point (x , y ). Tangents in terms of slope. Tangent in terms of
1 1
parametric co-ordinations. Condition of tangency. Properties of i) Parabola ii) Ellipse and iii)
Hyperbola as listed in Annexure 1. Center of a Conic, Central Conic. Tangents and Normals.
Pole & Polar with respect to conic.
3. Three Dimensional Geometry: Prerequisites
Direction Cosines, direction ratios. Equations of lines, planes, intersection of two planes,
symmetric forms of equation, lines perpendicular to planes, angles between two lines and
between a line and a plane. Projection of a line on a plane. Sphere: Intersection of a sphere
by planes, intersection of two spheres
4.Central conicoids:
Shapes, ellipsoids, hyperboloid of one sheet, two sheets. Intersection
of a conicoid and a line. Cone and right cylinder. Standard equations
Goa University, Taleigao Plateau, Goa. Page 3
3: Discrete Mathematical Structures.
1. Propositional Calculus (Chapter 1. Last section only)
2. Graphs (Chapter 5.)
3. Trees (Chapter 6.)
4. Discrete Numeric Functions (Chapter 9.)
5. Recurrence Relation and Recursive Algorithms. (Chapter 10.)
7. Boolean Algebra (Chapter 12.)
Goa University, Taleigao Plateau, Goa. Page 4
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