| Subject
:
MATHS
- IIB |
MONTH
&
No. of Working
Days |
No.
of Teaching Periods |
Topics
to be covered |
Unit
Tests/ Assign./
EAMCET |
Suggested
Activities |
| 1 |
2 |
3 |
4 |
5 |
JUNE
(18) |
10 |
Explanation
of Syllabus: IPE Question Paper - 1 along
with Scheme of Valuation -Weightage of Marks
- Blue Print(2)
INTRODUCTION: (1)
CIRCLE : Equation of Circle (in Cartisian,
Parametric Form)(4)
Position of a Point, Line with reference to
a circle-Power of Point(2) |
Assign.
- 1 |
|
| JULY(26) |
20 |
Equation
of Chord, Tangent and Normal, Length of Tangent,
Chord of Contact(4), Pole - Polar, Conjugate
Points(4)
CIRCLES : Conjugate Lines (2), Relative Position
of Two Circles Touching Each Other Equation
of Common Tangents(4)
SYSTEM OF CIRCLES: Angle between Two Intersecting
Circles - Condition for Orthogonality(2),
Radical Axis - Radical Centre(2) |
Unit
Test - 1(1)
EAMCET
Assign. - 2 |
Mathematics
Club |
AUGUST
(23) |
21 |
Common
Chord and Common Tangent of Two Circles(2)
Equation of the Coaxial System of Circles
- Limiting Points(2)
Orthogonal System of Coaxial System of Circles(2)
PARABOLA : Conic Sections - Parabola - Equation
of Parabola in Standard Form different forms
of Parabola - Parametric Equations(2), Equation
of Tangent and Normal- Condition for a straight
line to be a Tangent(3), Pole and Polar(2)
ELLIPSE: Equation of Ellipse(3);
Equation fo Tangent, Normal - Condition for
a straight line to be a Tangent(4); Pole and
Polar(2) |
Unit
Test - II(1)
EAMCET
Assign. (3) |
Seminars |
September
(25) |
20 |
HYPERBOLA:
Equation of Hyperbola - Rectangular Hyperbola(3);
Equation of Tangent, Normal - Condition for
a straight line to be a Tangent(4); Pole and
Polar(2)
POLAR COORDINATES: Polar Coordinates- Relation
between Polar and Cartesian Coordinates- Distance
between two points - Area of Triangle(4) |
Home
Assign. - I
EAMCET
Assign. - 4 |
|
Quarterly
Examinations from 24-09-2003 to 30-09-2003 |
October
(16) |
18 |
Polar
Equation of straight line, circle and a conic(3)
CALCULUS:
Partial Differentiation: Partial derivatives
- First and Second order onluy(3)
Homogenous Functions - Euler's Theorem, Simple
Application(3)
METHODS OF INTEGRATION:
Integration - Standard Forms - Propertoies
of Integrals(3), Integration by Substitution,
Algebraic, Trigonometric Exponential Functions(2) |
EAMCET
Assign. - 5 & 6 |
Problems
solving sessions |
November
(23) |
20 |
Integration
by Parts - Logrithmic, Function - Inverse
Trignometric Functions, Integrals of the Different
Types of Functions(3)
METHODS OF INTEGRATION:
Integrationof Rational Functions(2); Reduction
Formulae(2)
DIFINITE INTEGRAL: Definite Integral as an
Area-Fundamental Theorem of Calculus Properties
and Evaluation of Definite Integrals(6), Reduction
Formulae(3)
NUMERICAL INTEGRATION: Plane Areas, Areas
under the Curve Sin X and Cos X(3) |
Unit
Test - III(1)
EAMCET
Assign. - 7 |
Seminars |
December
(22) |
20 |
NUMERICAL
INTEGRATION: Plane Areas, Areas under the
Curve Sin X and Cos X(3), Trapezoidal Rule
and Simpson' s Rule - Simple Applications(6)
DIFFERENTIAL EQUATIONS:
Formation - General and Particular Solution
and Primitives - Degree and Order of an ordinary
Differential Equation(3)
Solutions of the First Order and First Degree
equations of the following types-
Variables separable(8) |
EAMCET
Assign. - 8 |
Home
Assign. - 2
Assign - 8 |
Half-Yearly
Exams from 17-12-2003 to 23-12-2003 |
January
(19) |
18 |
DIFFERENTIAL
EQUATIONS:
Solutions of the First Order and First Degree
equation(4)
REVISION OF IMPORTANT CHAPTERS
|
Unit
Test - IV(1)
EAMCET
Assign. - 9 |
Problems
solving sessions |
February
(21) |
14 |
Pre-Final
Exams
Lectures will continue upto IPE, March - 2004 |
EAMCET
(4)
Assign. - 10 |
|
March
(23) |
|
Lectures
will continue upto IPE March - 2004
Annual Exams (IPE) |
|
|
