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N. K. BAGRODIAGLOBALSCHOOL
Sector-17, Phase-II, Dwarka, NewDelhi-78
Annual Syllabus (2022-23) CLASS: IX
SUBJECT: English
Month No of Working Days Topics to be Covered
April and 23+10 Literature Reader :
May ï‚· How I taught my grandmother to read
ï‚· The Brook (P)
Main course Book
ï‚· People
ï‚· Adventure
Grammar:
ï‚· Determiners
ï‚· Tenses
Writing:
ï‚· Notice Writing
Reading:
ï‚· Unseen Passage
July 23 Literature Reader :
ï‚· A Dog Named Duke
ï‚· The Road not Taken (p)
ï‚· The Solitary Reaper (p)
Main Course Book:
ï‚· Environment
Grammar:
ï‚· Active and Passive
ï‚· Reported Speech
ï‚· Integrated Grammar (Cloze passage/ Gap filling/
Editing/ Omission/Sentence Reordering)
Writing:
ï‚· Story Writing
ï‚· Letter Writing (Editor, Complaint on Social themes.)
Reading:
ï‚· Unseen Passage
Activity:
ï‚· Debate Activity
August 23 Literature Reader:
 Lord Ullin’s Daughter (p)
ï‚· Villa For Sale
Main Course Book:
ï‚· The Class IX Radio and Video Show
Grammar:
ï‚· Integrated Grammar (Cloze passage/ Gap filling/
1
Editing/ Omission/ Sentence arrangement)
Reading:
ï‚· Unseen Passage
Activity:
ï‚· Make an Advertisement
September 25 Grammar:
ï‚· Integrated Grammar (Cloze passage/ Gap filling/
Editing/ Omission/ Sentence arrangement)
Revision and P.A-2 Examination
Speaking Skill
Listening Skill
October 17 Revision
Term I Examination
November 24 Literature Reader:
ï‚· The Man who Knew Too much
ï‚· The Seven Ages (p)
Main Course Book:
ï‚· Mystery
ï‚· Children
Grammar :
ï‚· Conjunctions
ï‚· Subject Verb Agreement
Writing:
ï‚· Diary Entry
ï‚· Article Writing/ Paragraph Writing
Reading:
ï‚· Unseen Passage
Activity:
ï‚· Declamation
December 20 Literature Reader:
ï‚· Keep it From Harlod
ï‚· Best Seller
 Oh, I wish I’d Looked After my Teeth (p)
Main Course Book:
ï‚· Sports and Games
Reading:
ï‚· Unseen Passage
Grammar:
ï‚· Integrated Grammar (Cloze passage/ Gap filling/
Editing/ Dialogue writing/ Report dialogue)
January 20 Beehive:
 The Bishop’s Candlesticks (Play)
ï‚· Song of the Rain (p)
Revision
Speaking Skill
Listening Skill
2
February 20 Revision
Term-II Examination
SUBJECT: Mathematics
Month No of Working Topics to be Covered
Days
April Ch 12-Heron’s Formulas
Area of a triangle using Heron's formula (without proof)
Ch 3-Co-ordinate Geometry
The Cartesian plane, coordinates of a point, names and terms
associated with the coordinate plane, notations.
May Ch 4-Linear Equations in Two Variables
Recall of linear equations in one variable. Introduction to the
equation in two variables.
Focus on linear equations of the type ax + by + c=0.Explain that a
linear equation in two variables has infinitely many solutions and
justify their being written as ordered pairs of real numbers, plotting
them and showing that they lie on a line.
Ch 7-Triangles
SAS Congruence,ASA Congruence,SSS Congruence,RHS
Congruence
The angles opposite to equal sides of a triangle are equal(Proof
included)
The sides opposite to equal angles of a triangle are equal
July Ch 6-Lines And Angles
If a ray stands on a line, then the sum of the two adjacent angles so
formed is 180Ëš and the converse(Without Proof)
If two lines intersect, vertically opposite angles are equal(Proof
Included )
Lines which are parallel to a given line are parallel(without Proof)
Ch 14-Statistics
Bar graphs, histograms (with varying base lengths), and frequency
polygons.
August Ch 1-Number System
Review of representation of natural numbers, integers, rational
numbers on the number line.
Rational numbers as recurring/ terminating decimals.
Operations on real numbers.
Examples of non-recurring/non-terminating decimals.
Existence of non-rational numbers (irrational numbers) such as ,
√2,√3 and their representation on the number.
Every real number is represented by a unique point on the number
line and conversely, viz. every point on the number line represents a
unique real number.
Definition of nth root of a real number.
Rationalization of real numbers of the type 1/ í µí±Ž+í µí±Žâˆší µí±Ž and 1/ âˆší µí±Ž+âˆší µí±Ž
(and their combinations) where x and y are natural number and a and
b are integers.
Laws of exponents with integral powers, Rational exponents with
positive real bases.
3
September Chapter 5-Introduction To Euclid's Geometry
History - Geometry in India and Euclid's geometry. Euclid's method
of formalizing observed phenomenon into rigorous Mathematics with
definitions, common/obvious notions, axioms/postulates and
theorems. The five postulates of Euclid. Showing the relationship
between axiom and theorem, for example:(Axiom) 1. Given two
distinct points, there exists one and only one line through
them.(Theorem) 2. (Prove) Two distinct lines cannot have more than
one point in common.
Revision+ Mid Term Exams
October Ch 8-Quadrilaterals
The diagonal divides a parallelogram into two congruent
triangles(Proof included)
In a parallelogram opposite sides are equal, and conversely
In a parallelogram opposite angles are equal, and conversely
A quadrilateral is a parallelogram if a pair of its opposite sides is
parallel and equal.
In a parallelogram, the diagonals bisect each other and conversely.
In a triangle, the line segment joining the mid points of any two sides
is parallel to the third side and in half of it and its converse
November Ch 2-Polynomials
Definition of a polynomial in one variable with examples and counter
examples, Coefficients & terms of a polynomial.
zero polynomial.
Degree of a polynomial.
Constant, linear, quadratic and cubic polynomials.
Monomials, binomials, trinomials.
Factors and multiples.
Zeros of a polynomial.
State the Remainder Theorem with examples.
Statement and proof of the Factor Theorem.
Factorization of ax2 + bx + c, a ≠0 where a, b and c are real
numbers, and of cubic polynomials using the Factor Theorem
Recall of algebraic expressions and identities & Verification of
identities.
and their use in factorization of polynomials.
December Ch 10-Circles
Introduction of circle and related concepts-radius, circumference,
diameter, chord, arc, secant, sector, segment, subtended angle.
Equal chords of a circle subtend equal angles at the centre(proof
included) and its converse.
The perpendicular from the centre of a circle to a chord bisects the
chord and conversely, the line drawn through the centre of a circle to
bisect a chord is perpendicular to the chord.
Equal chords of a circle (or of congruent circles) are equidistant from
the centre (or their respective centres) and conversely.
The angle subtended by an arc at the centre is double the angle
subtended by it at any point on the remaining part of the circle.
Angles in the same segment of a circle are equal.
4
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