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IX_Maths Chapter Notes

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IX

Mathematics Chapter 1: Number Systems

Chapter Notes

Key Concepts

1. Numbers 1, 2, 3……., which are used for counting are called Natural

numbers and are denoted by N.

2. 0 when included with the natural numbers form a new set of numbers

called Whole number denoted by W

3. -1,-2,-3……………..- are the negative of natural numbers.

4. The negative of natural numbers, 0 and the natural number together

constitutes integers denoted by Z.

5. The numbers which can be represented in the form of p/q whereq 0 and p and q are integers are called Rational numbers. Rational

numbers are denoted by Q. If p and q are coprime then the rational number is in its simplest form.

6. Irrational numbers are the numbers which are non-terminating and

non-repeating.

7. Rational and irrational numbers together constitute Real numbers

and it is denoted by R.

8. Equivalent rational numbers (or fractions) have same (equal)

values when written in the simplest form.

9. Terminating fractions are the fractions which leaves remainder 0 on

division.

10. Recurring fractions are the fractions which never leave a remainder

0 on division.

11. There are infinitely many rational numbers between any two rational

numbers.

12. If Prime factors of the denominator are 2 or 5 or both only. Then the

number is terminating else repeating/recurring.

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13. Two numbers p & q are said to be co-prime if, numbers p & q have nocommon factors other than 1.

14. The decimal expansion of rational number is either terminating or

non-terminating recurring

15. The decimal expansion of an irrational number is non-terminating,

non-recurring.

16. Real numbers satisfy the commutative, associate and distributive

law of addition and multiplication.

17. Commutative law of addition: If a and b are two real numbers then,

a + b = b + a

19. Commutative law of multiplication: If a and b are two real numbers

then, a. b = b. a

20. Associative law of addition: If a, b and c are real numbers then,

a + (b + c) = (a + b) + c

21. Associative law of multiplication: If a, b and c are real numbers

then, a. (b. c) = (a. b). c

22. Distributive of multiplication with respect to addition: If a, b and

c are real numbers then, a. (b+ c) = a. b + a. c

23. Removing the radical sign from the denominator is called

rationalisation of denominator.

24. The multiplication factor used for rationalising the denominator is called

the rationalising factor.

25. The exponent is the number of times the base is multiplied by itself.

26. In the exponential representation ma , a is called the base and m is

called the exponent or power.

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27. If a number is to the left of the number on the number line, it is less

than the other number. If it is to the right, then it is greater than the

number.

28. There is one to one correspondence between the set of real

numbers and the set of point on the number line.

30. Irrational numbers like 2, 3 , 5 … n , for any positive integer n can

be represented on number line by using Pythagoras theorem.

31. The process of visualisation of representation of numbers on the

number line through a magnifying glass is known as the process of

successive magnification.

Key Formulae:

1. Rational number between two numbers x and y =x y

2

2. Irrational number between two numbers x and y

xy, if xandybothareirrationalnumbers

xy, if xisrationalnumber andyisirrationalnumber

xy, if x yisnot aperfect squareandx,ybotharerationalnumbers

3. Irrational number between two rational number x and y = xy , if and

only if x y is not a perfect square.

4. Irrational number between a rational number x and irrational number

y = xy

5. 2 x y 2x = y

6. 3 x y 3x = y

7. n x y nx = y

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8. Square root identities: For real numbers a>0 and b>0

ab a b

a a

b b

( a b)( a b) a b

( a b)( c d) ac bc ad bd

2(a b)(a b) a b

2( a b) a b 2 ab

9. 1

nn na a a

where a >0 and is a real number and n is positive integer.

10. m m

n mnna a a

where a, n > 0 and ‘a’ is a real number, m and n co prime integers.

11. 0a 1 , where a is a real number.

12. Pythagoras Theorem: (AB) 2 + (BC) 2 = (AC) 2

where AC is hypotenuse, AB and BC are the sides of the right triangle.

13.

2 2x 1 x 1

x2 2

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IX Math Ch 2: Polynomials

Chapter Notes

Top Definitions

1. A polynomial p(x) in one variable x is an algebraic expression in x ofthe form

p(x) = 1 2 2

1 2 2 1 0

n n n

n n na x a x a x ........ a x a x a

, where

(i) 0 1 2 na ,a ,a ......a are constants

(ii)0 1 2 nx ,x ,x ......x are variables

(iii)0 1 2 na ,a ,a ......a are respectively the coefficients of

0 1 2 nx ,x ,x ......x .

(iv) Each of 1 2 2

1 2 2 1 0

n n n

n n na x a x ,a x ,........a x ,a x,a ,

with 0na , is called a

term of a polynomial.

2. A leading term is the term of highest degree.

3. Degree of a polynomial is the degree of the leading term.

4. A polynomial with one term is called a monomial.

5. A polynomial with two terms is called a binomial.

6. A polynomial with three terms is called a trinomial.

7. A polynomial of degree 1 is called a linear polynomial. It is of the form

ax+b. For example: x-2, 4y+89, 3x-z.

8. A polynomial of degree 2 is called a quadratic polynomial. It is of the

form ax2 + bx + c. where a, b, c are real numbers and a 0 For

example: 2 2 5x x etc.

9. A polynomial of degree 3 is called a cubic polynomial and has the

general form ax3 + bx2 + cx +d. For example: 3 22 2 5 x x x etc.

10. A bi-quadratic polynomial p(x) is a polynomial of degree 4 which can

be reduced to quadratic polynomial in the variable z = x2 by

substitution.

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11. The zero polynomial is a polynomial in which the coefficients of all the

terms of the variable are zero.

12. Remainder theorem: Let p(x) be any polynomial of degree greater

than or equal to one and let a be any real number. If p(x) is divided by

the linear polynomial x – a, then remainder is p(a).

13. Factor Theorem: If p(x) is a polynomial of degree n≥ 1and a is any

real number then (x-a) is a factor of p(x), if p(a) =0.

14. Converse of Factor Theorem: If p(x) is a polynomial of degree n≥ 1and

a is any real number then p(a) =0 if (x-a) is a factor of p(x).

15. An algebraic identity is an algebraic equation which is true for all

values of the variables occurring in it.

Top Concepts

1. The degree of non-zero constant polynomial is zero.

2. A real number ‘a’ is a zero/ root of a polynomial p(x) if p (a) = 0.

3. The number of real zeroes of a polynomial is less than or equal to the

degree of polynomial.

4. Degree of zero polynomial is not defined.

5. A non zero constant polynomial has no zero.

6. Every real number is a zero of a zero polynomial.

7. Division algorithm: If p(x) and g(x) are the two polynomials such that

degree of p(x) degree of g(x) and g(x)≠ 0, then we can find

polynomials q(x) and r(x) such that:

p (x) = g(x) q(x) + r(x)

where, r(x) =0 or degree of r(x) < degree of g(x).

8. If the polynomial p(x) is divided by (x+a), the remainder is given by

the value of p (-a).

9. If the polynomial p(x) is divided by (x-a), the remainder is given by

the value of p (a).

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10. If p (x) is divided by ax + b = 0; a 0, the remainder is given by

b

pa

; a 0.

11. If p (x) is divided by ax - b = 0 , a 0 , the remainder is given by

b

pa

; a 0.

12. A quadratic polynomial ax2 + bx+ c is factorised by splitting the middle

term bx as px +qx so that pq =ac.

13. The quadratic polynomial ax2 + bx+ c will have real roots if and only if

b2-4ac ≥ 0.

14. For applying factor theorem the divisor should be either a linear

polynomial of the form x-a or it should be reducible to a linear

polynomial.

Top Formulae

1. Quadratic identities:

a. 2 2 2x y x 2xy y

b. 2 2 2x y x 2xy y

c. 2 2x y (x y) x y

d. 2x a (x b) x (a b)x ab

e. 2 2 2 2x y z x y z 2xy 2yz 2zx

Here x, y, z are variables and a, b are constants

2. Cubic identities:

a. 3 3 3x y x y 3xy(x y)

b. 3 3 3x y x y 3xy(x y)

c. 3 3 2 2x y (x y)(x xy y )

d. 3 3 2 2x y (x y)(x xy y )

e. 3 3 3 2 2 2x y z 3xyz (x y z)(x y z xy yz zx)

f. If x y z 0 then 3 3 3x y z 3xyz

Here, x, y & z are variables.

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IX

Mathematics Chapter 3: Coordinate Geometry

Points to Remember

Key Concepts

1. Two perpendicular number lines intersecting at point zero are called

coordinate axes. The horizontal number line is the x-axis (denoted by X’OX) and the vertical one is the y-axis (denoted by Y’OY).

2. The point of intersection of x axis and y axis is called origin anddenoted by ‘O’.

3. Cartesian plane is a plane obtained by putting the coordinate axes

perpendicular to each other in the plane. It is also called coordinate plane or xy plane.

4. The x-coordinate of a point is its perpendicular distance from y axis.

5. The y-coordinate of a point is its perpendicular distance from x axis.

6. The point where the x axis and the y axis intersect is represented by

coordinate points (0, 0) and is called the origin. It is denoted by ‘O’

on a Cartesian plane.

7. The abscissa of a point is the x-coordinate of the point.

8. The ordinate of a point is the y-coordinate of the point.

9. If the abscissa of a point is x and the ordinate of the point is y, then

(x, y) are called the coordinates of the point.

10. The axes divide the Cartesian plane into four parts called the

quadrants (one fourth part), numbered I, II, III and IV anticlockwise

from OX.

11. The origin O has zero distance from both the axes.

12. The coordinate of a point on the x axis are of the form (x,0) and that

of the point on y axis are (0,y)

13. Sign of coordinates depicts the quadrant in which it lies. Thecoordinates of a point are of the form (+, +) in the first quadrant,

(-, +) in the second quadrant, (-,-) in the third quadrant and (+,-) in

the fourth quadrant.

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14. To plot a point P (3, 4) in the Cartesian plane. Start from origin count

3 units on the positive x axis then move 4 units towards positive y axis

and mark the point P.

15. If x ≠ y, then (x,y)≠(y,x) and if (x,y) = (y,x), then x=y.

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IX Mathematics Chapter 4: Linear Equations in Two Variables

Chapter Notes

Top Definitions

1. An equation of the form ax + by + c = 0, where a, b and c are real

numbers, such that a and b are not both zero, is called a linear

equation in two variables.

2. A linear equation in two variables is represented geometrically by a

straight line the points of which make up the collection of solutions of

equation. This is called the graph of the linear equation.

Top Concepts

1. A linear equation in two variables has infinitely many solutions.

2. The graph of every linear equation in two variables is a straight line.

3. x = 0 is the equation of the y – axis and y = 0 is the equation of the

x–axis.

4. The graph of x = k is a straight line parallel to the y –axis.

5. The graph of y = k is a straight line parallel to the x – axis.

6. An equation of the type y = mx represents a line passing through the

origin, where m is a real number.

7. Every point on the line satisfies the equation of the line and every

solution of the equation is a point on the line.

8. The solution of a linear equation is not effected when:

(i) The same number is added or subtracted from both the side of

an equation.

(ii) Multiplying or dividing both the sides of the equation by the same non zero number.

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Top Diagrams

1. Graph of a line passing through the origin.

2. Graph of a line parallel to x axis.

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3. Graph of a line parallel to y axis.

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IX Mathematics Chapter 4: Linear Equations in Two Variables

Chapter Notes

Top Definitions

1. An equation of the form ax + by + c = 0, where a, b and c are real

numbers, such that a and b are not both zero, is called a linear

equation in two variables.

2. A linear equation in two variables is represented geometrically by a

straight line the points of which make up the collection of solutions of

equation. This is called the graph of the linear equation.

Top Concepts

1. A linear equation in two variables has infinitely many solutions.

2. The graph of every linear equation in two variables is a straight line.

3. x = 0 is the equation of the y – axis and y = 0 is the equation of the

x–axis.

4. The graph of x = k is a straight line parallel to the y –axis.

5. The graph of y = k is a straight line parallel to the x – axis.

6. An equation of the type y = mx represents a line passing through the

origin, where m is a real number.

7. Every point on the line satisfies the equation of the line and every

solution of the equation is a point on the line.

8. The solution of a linear equation is not effected when:

(i) The same number is added or subtracted from both the side of

an equation.

(ii) Multiplying or dividing both the sides of the equation by the same non zero number.

2

Top Diagrams

1. Graph of a line passing through the origin.

2. Graph of a line parallel to x axis.

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3. Graph of a line parallel to y axis.

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IX Mathematics

Ch 6: Lines and Angles

Chapter Notes

Top Definitions

1. A line segment is a part of a line which has two end points.

2. A ray is a part of a line which has only one end point.

3. A line is a breadth less length which has no end point.

4. Three or more points when lie on the same line are called collinear points.

5. Three or more points when don’t lie on a straight line are called non

collinear points.

6. An angle is formed when two rays originate from the same end point.

7. The rays making an angle are called the arms of the angle.

8. The end point from the two rays forming the angle originate is called the

vertex of the angle.

9. Two angles whose sum is 90° are called complementary angles.

10. Two angles whose sum is 180° are called supplementary angles.

11. Two angles are adjacent, if they have a common vertex, a common arm

and their non–common arms are on different sides of the common arm.

12. If a ray stands on a line, then the sum of the two adjacent angles so

formed is 180° and vice – verse. This property is called as the linear pair

axiom.

13. The vertically opposite angles formed when two lines intersect each other.

There are two pairs of vertically opposite angles.

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14. A line which intersects two or more lines at distinct points is called a

transversal.

a Corresponding angles:

(i) 1 and 5 (ii) 2 and 6

(iii) 4 and 8 (iv) 3 and 7

b Alternate interior angles:

(i) 4 and 6 (ii) 3 and 5

c Alternate exterior angles:

(i) 1 and 7 (ii) 2 and 8

d Interior angles on the same side of the transversal:

(i) 4 and 5 (ii) 3 and 6

Top Concepts

1. If a ray stands on a line, then the sum of two adjacent angles so formed

is 180°.

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2. If the sum of two adjacent angles is 180°, then the non – common arms

of the angles form a line.

3. If two lines intersect each other, then the vertically opposite angles are

equal.

4. If a transversal intersects two parallel lines, then

a. Each pair of corresponding angles is equal.

b. Each pair of alternate interior angles is equal.

c. Each pair of interior angles on the same side of the transversal is

supplementary.

5. If a transversal intersects two lines such that a pair of interior angles on

the same side of the transversal is supplementary, then the two lines are

parallel.

6. If two lines are parallel to the same line, will they be parallel to each

other.

7. Lines which are parallel to the same line are parallel to each other.

8. The sum of the angles of a triangle is 180°.

9. If a side of a triangle is produced, then the exterior angle so formed is

equal to the sum of the two interior opposite angles.

10. In exterior angle of a triangle is greater then either of its interior opposite

angles.

11. If a side of a triangle is produced, the exterior angle so formed is equal to

the sum of the two interior opposite angles.

Top Diagrams

1. A line

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2. A ray

3. A line segment

4. Intersecting and non intersecting lines.

(i) Intersecting lines (ii) Non–intersecting (parallel) lines

5. ABD and DBC are linear pair of angles

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6. Types of Angles

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IX Mathematics

Chapter 7: Triangles

Chapter Notes

Top Definitions

1. Two figures are congruent, if they are of the same shape and of the same

size.

2. Two figures are similar, if they are of the same shape but of different size.

3. SAS congruence rule: Two triangles are congruent if two sides and the

included angle of one triangle are equal to the two sides and the included

angle of the other triangle.

4. ASA congruence rule: Two triangles are congruent if two angles and the

included side of one triangle are equal to two angles and the included side

of other triangle.

5. AAS congruence rule: Two triangles are congruent if any two pairs of

angles and one pair of corresponding sides are equal.

6. SSS congruent rule: If three sides of one triangle are equal to the three

sides of another triangle, then the two triangles are congruent.

7. RHS congruence rule: If in two right triangles the hypotenuse and one

side of one triangle are equal to the hypotenuse and one side of the other

triangle, then the two triangles are congruent.

8. A triangle in which two sides are equal is called an isosceles triangle.

Top Concepts

1. If two triangles ABC and PQR are congruent under the corresponding A ↔

P, B ↔Q and C ↔ R, then symbolically, it is expressed as Δ ABC Δ PQR.

2. Two circles of the same radii are congruent.

3. Two squares of the same sides are congruent.

4. Each angle of an equilateral triangle is of 60°.

5. In congruent triangles corresponding parts are equal and we write this as

‘CPCT’ for corresponding parts of congruent triangles.

6. SAS congruence rule holds but not ASS or SSA rule.

7. Angles opposite to equal sides of an isosceles triangle are equal.

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8. The sides opposite to equal angles of a triangle are equal.

9. RHS stands for Right Angle – Hypotenuse – Side.

10. If two sides of a triangle are unequal, then the greater angle is opposite

to the greater side.

11. If two angles of a triangle are unequal, the greater side is opposite to the

greater angle.

12. The sum of any two sides of a triangle is greater than the third side.

13. The difference between any two sides of a triangle is less than the third

side.

14. If the sum of two adjacent angles is 180°, then the non – common arms

of the angles form a line.

Top Diagrams

1. Δ ABC Δ DEF

2. Δ ABD Δ DEF

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IX

Mathematics Chapter 8: Quadrilaterals

Chapter Notes

Top Definitions

1. A quadrilateral is a closed figure obtained by joining four points (with no

three points collinear) in an order.

2. A diagonal is a line segment obtained on joining the opposite vertices.

3. Two sides of a quadrilateral having no common end point are called its

opposite sides.

4. Two angles of a quadrilateral having common arm are called its adjacent

angles.

5. Two angles of a quadrilateral not having a common arm are called its

opposite angles.

6. A trapezium is quadrilateral in which one pair of opposite sides are parallel.

7. In the non – parallel sides of trapezium are equal, it is known as isosceles

trapezium.

8. A parallelogram is a quadrilateral in which both the pairs of opposite sides

are parallel.

9. A rectangle is a quadrilateral whose each angle is 90°

10. A rhombus is quadrilateral whose all the sides are equal.

11. A square is a quadrilateral whose all sides are equal and each angle is 90°.

12. A kite is a quadrilateral in which two pairs of adjacent sides are equal.

Top Concepts

1. Properties of parallelogram:

i The opposite sides of a parallelogram are parallel.

ii A diagonal of a parallelogram divides it in two congruent triangles.

iii The opposite sides of a parallelogram are equal.

iv The opposite angles of a parallelogram are equal.

v The consecutive angles (conjoined angles) of a parallelogram are

supplementary.

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vi The diagonals of a parallelogram bisect each other.

2. A diagonal of a parallelogram divides the parallelogram into two congruent

triangles.

3. In a parallelogram opposite sides are equal.

4. If each pair of opposite sides of a quadrilateral is equal, then it is a

parallelogram.

5. In a parallelogram opposite angles are equal.

6. If in quadrilateral, each pair of opposite angles is equal, then it is a

parallelogram.

7. The diagonals of a parallelogram bisect each other.

8. If the diagonals of a quadrilateral bisect other, then it is a parallelogram.

9. A quadrilateral is a parallelogram, if a pair of opposite sides is equal and

parallel.

10. Square, rectangle and rhombus are all parallelograms.

11. Kite and trapezium are not parallelogram.

12. A square is a rectangle.

13. A square is a rhombus.

14. A parallelogram is a trapezium.

15. Every rectangle is a parallelogram; therefore, it has all the properties of a

parallelogram. Additional properties of a rectangle are:

i All the (interior) angles of are rectangle are right angles.

ii The diagonals of a rectangle are equal.

16. Every rhombus is a parallelogram; therefore, it has all the properties of a

parallelogram. Additional properties of a rhombus are:

i All the sides of rhombus are equal.

ii The diagonals of a rhombus intersect at right angles.

iii The diagonals bisect the angles of a rhombus.

17. Every square is a parallelogram; therefore, it has all the properties of a

parallelogram. Additional properties of a rhombus are:

i All the sides are equal

ii All the angles are equal to 90° each

iii Diagonals are equal

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iv Diagonal bisect each other at right angle

v Diagonals bisects the angles of vertex

18. Sum of all the angles of a quadrilateral is 3600.

19. Mid Point Theorem (Basic Proportionality Theorem): The line segment joining

the mid point of any two sides of a triangle is parallel to the third sides and

equal to half of it.

20. Converse of mid-point theorem: The line drawn through the mid-point of one

side of a triangle parallel to the another side, bisects the third side.

21. If there are three or more parallel lines and the interests made by them on a

transversal are equal, then the corresponding intercepts on any other

transversal are also equal.

22. A quadrilateral formed by joining the mid-points of the sides of a

quadrilateral, in order is a parallelogram.

Top Diagrams

1. A quadrilateral ABCD.

2. A trapezium ABCD with sides AB || DC and non parallel sides AD and BC.

3. A parallelogram ABCD in which AB||DC and AD||BC.

4

a

4. A rectangle ABCD with AD||BC, AB||DC and A = 90° = B = C = D.

5. A rhombus ABCD with AB = BD = CD = DA.

6. A square ABCD in which AB = BC = CD, = DA and A = B = C = D =

90°.

7. A kite ABCD with AB = AD and BC = CD

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8. Diagonal properties of special parallelograms:

Properties Parallelogram Rectangle Rhombus Square

Diagonals bisect each other √ √ √ √

Diagonals are equal – √ – √

Diagonals bisect vertex angles – – √ √

Diagonals are perpendicular to each

other – – √ √

Diagonals from 4 equal triangle √ √ √ √

Diagonals from 4 congruent

triangle – – √ √

9. The relations between special parallelograms can be represented by a Veen-

diagram.

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IX

Mathematics Chapter 9: Area of Parallelograms and Triangles Quadrilaterals

Chapter Notes

Top Definitions

1. Any side of a parallelogram is called the base.

2. The length of perpendicular drawn from any point form the parallel

sides to the base is called the (corresponding) altitude or height.

3. The part of the plane enclosed by a simple closed figure is called aplanar region corresponding to that figure.

4. The magnitude or measure of that planar region is called its area.

5. Two figures are called congruent, if they have the same shape and thesame size.

6. Area of a figure is a number (in same unit) associated with the part ofthe plane enclosed by the two properties.

Top Concepts

1. If two figures A and B are congruent, they must have equal areas.

2. Two figures having equal areas need not be congruent.

3. If a planner region formed by a figure T is mad up of two non –overlapping planner regions formed by figures P and Q, then ar(T) =

ar(P) + ar(Q).

4. Two figures are said to be on the same base and between the same

parallels, if they have a common base (side) and the vertices (or the vertex) opposite to the common base of each figure lie on a line

parallel to the base.

5. Parallelograms on the same base and between the same parallels areequal in area.

2

6. Area of a parallelogram is the product of its any side and the

corresponding altitude.

7. Parallelograms on the same base or equal bases and between the

same parallels are equal in area.

8. Parallelograms on the same base (or equal bases) and having equal

areas lie between the same parallels.

9. Two triangles on the same base (or equal base) and between the sameparallel are equal in area.

10. Area of triangle is half the product of its base (or any side) and thecorresponding altitude (or height).

11. Two triangles with same base (or equal bases) and equal areas willhave equal corresponding altitudes.

12. Two triangles having the same base (or equal bases) and equal areaslie between the same parallels.

13. Parallelograms on the same base (or equal bases) and having equalareas lie between the same parallels.

14. A median of a triangle divides it into triangles of equal areas.

Top Diagrams

1. Congruent Figures

2. Parallelograms on the same base and between the same Parallels

3

3. Triangles on the same base and between the same parallels

1

IX

Mathematics Chapter 10: Circles

Chapter Notes

Top Definitions

1. A circle is a collection (set) of all those points in a plane, each one ofwhich is at a constant distance from a fixed point in the plane.

2. The fixed point is called the centre and the constant distance is called

the radius of the circle.

3. All the points lying inside a circle are called its interior points and all

those points which lie outside the circle are called its exterior points.

4. The collection (set) of all interior points of a circle is called the interior

of the circle while the collection of all exterior points of a circle is called the exterior of the circle.

5. A line segment joining two points on a circle is called the chord of thecircle.

6. A chord passing through the center of the circle is called a diameter of

the circle.

7. A line which meets a circle in two points is called a secant of the circle.

8. A polygon is a closed figure made up of three or more line segments(sides) such that each line segment intersects exactly two others at its

end – points (vertices) and no two line segments which intersect are collinear.

9. A polygon is called a regular polygon, if it has all its sides equal andhas all its angles equal.

10. A (continuous) part of a circle is called an arc of the circle. The arc of acircle is denoted by the symbol ‘ ’.

11. Circumference: The whole arc of a circle is called the circumference of

the circle.

12. Semi- circle: One – half of the whole arc of a circle is called a semi –

circle of the circle.

13. Minor and Major arcs: An arc less than one - half of the whole arc of a

circle is called a minor arc of the circle, and an arc greater than one – half of the whole arc of a circle is called a major arc of the circle.

14. Central Angle: Any angle whose vertex is centre of the circle is called acentral angle.

2

15. Degree measure of an Arc: The degree measure of a minor arc is the

measure of the central angle subtended by the arc.

16. Congruent Circle: Two circles are said to be congruent if and only if

either of them can be superposed on the other so as to cover it exactly.

17. Congruent Arc: Two arcs of a circle (or of congruent) circles) are

congruent if either of them can be superposed on the other so as to cover it exactly.

18. Sector of a circle: The part of the plane region enclosed by an arc of acircle and its two bounding radii is called a sector of a circle.

19. Segment of a circle: A chord of a circle divides it into two parts. Eachpart is called a segment.

20. The part containing the minor arc is called the minor segment, and thepart containing the major arc is called the major segment.

21. A quadrilateral, all the four vertices of which lie on a circle is called a

cyclic quadrilateral. The four vertices A, B, C and D are said to be Concyclic points.

Top Concepts

1. A diameter of circle is its longest chord.

2. A line can meet a circle at the most in two points.

3. In a circle, perpendicular from the center to a chord bisects the chord.

4. In a circle, the line joining the mid – point of a chord to the centre isperpendicular to the chord.

5. Equal chords of a circle are equivalent from the centre of the circle.

6. In a circle, chords which subtend equal angles at the centre are equal.

7. The two points of intersections determine a chord of the circle.

8. In a circle, equal chords subtend equal angles at the centre.

9. In a circle, chords which subtend equal angles at the centre are equal.

10. Triangle is a polygon with 3 sides.

11. Quadrilateral is a polygon with 4 sides.

12. The chords corresponding to congruent arcs are equal.

3

13. If two arcs of a circle (or of congruent circles) are congruent, then the

corresponding chords are equal.

14. If two chords of a circle (or of congruent circles) are equal, then their

corresponding arcs (minor, major or semi – circular) are congruent.

15. One and only one circle can be drawn through three non – collinear

points.

16. An infinite number of circles can be drawn through a given point P.

17. An infinite number of circles can be drawn through the two givenpoints.

18. Perpendicular bisectors of two chords of a circle, intersect each otherat the centre of the circle.

19. The angle subtended by an arc at the centre is double the anglesubtended by it at any point on the remaining part of the circle.

20. Angles in the same segment of a circle are equal.

21. An angle in a semi–circle is a right angle.

22. The arc of a circle subtending a right angle at any point of the circle inits alternate segment is a semi–circle.

23. If a line segment joining two points subtends equal angles at two otherpoints lying on the same side of the line segment, the four points are

concyclic, i.e., lie on the same circle.

24. An angle in a semi–circle is a right angle.

25. The arc of a circle subtending a right angle at any point of the circle inits alternate segment is a semi–circle.

26. If a line segment joining two points subtends equal angles at two other

points lying on its same side of the line segment, the four points are concyclic i.e., lie on the same circle.

27. If the sum of any pair of opposite angles of a quadrilateral is 180°,then the quadrilateral is cyclic.

28. Any exterior angle of a cyclic quadrilateral is equal to the interioropposite angle.

Top Formulae

1. Diameter = 2 x Radius.

2. If the degree measure of AB is θ°, we write m AB is θ°.

4

3. The degree measure of a semi – circles is 180°

4. The degree measure of a circle is 360°.

5. The degree measure of a major arc is (360° - θ°), where θ° is thedegree measure of the corresponding minor arc.

6. For a quad. ABCD, A + C = 180° or B = D = 180°, then ABCD is

cyclic.

7. Area of a circle = 2r

Top Diagrams

1. Interior and Exterior of a Circle

2. Concentric circles

3. Secant, Diameter and Chord in a circle.

5

4. Arc of a circle

5. Circumference of a circle

6. Semi-Circle

7. Minor and Major arc

6

8. Minor and Major Sector

8. Minor and Major Segment

9. Circles passing through a point.

10. Circles passing through two points.

7

11. Chord bisectors meet at center.

12. Cyclic Quadrilateral

1

IX

Mathematics Chapter 11: Geometric Constructions

Chapter Notes

Top Concepts

1. To construct an angle equal to a given angle.

Given : Any POQ and a point A.

Required : To construct an angle at A equal to POQ.

Steps of Construction:

1. With O as centre and any (suitable) radius, draw an arc to meet

OP at R and OQ at S.

2. Through A draw a line AB.

3. Taking A as centre and same radius (as in step 1), draw an arc

to meet AB at D.

4. Measure the segment RS with compasses.

5. With d as centre and radius equal to RS, draw an arc to meet

the previous arc at E.

6. Join AE and produce it to C, then BAC is the required angle

equal to POQ

2. To bisect a given angle.

Given : Any POQ

Required : To bisect POQ.

Steps of Construction:

1. With O as centre and any (suitable) radius, draw an arc to meet

OP at R and OQ at S.

2

2. With R as centre and any suitable radius (not necessarily) equal

to radius of step 1 (but > 1

2 RS), draw an arc. Also, with S as

centre and same radius draw another arc to meet the previous

arc at T.

3. Join OT and produce it, then OT is the required bisector of

POQ.

3. To construct angles of 60°, 30°, 120°, 90°, 45°

(i) To construct an angle of 60°

Steps of Construction:

1. Draw any line OP.

2. With O as centre and any suitable radius, draw an arc to meet

OP at R.

3. With R as centre and same radius (as in step 2), draw an arc to

meet the previous arc at S.

4. Join OS and produce it to Q, then POQ = 60°.

3

(ii) To construct an angle of 30°

Steps of Construction

1. Construct POQ = 60° (as above).

2. Bisect POQ (as in construction 2). Let OT be the bisector of

POQ, then POT = 30°

(iii) To construct an angle of 120°

1. Draw any line OP.

2. With O as centre and any suitable radius, draw an arc to meet

OP at R.

3. With R as centre and same radius (as in step 2), draw an arc to

meet the previous arc at T. With T as centre and same radius,

draw another arc to cut the first arc at S.

4. Join OS and produce it to Q, then POQ = 120°.

4

(iv) To construct an angle of 90°

Steps of Construction

1. Construct POQ = 60°

(as in construction 3(i)).

2. Construct POV = 120° (as above).

3. Bisect QOV (as in construction 2). Let OU be the bisector of

QOV, then POU = 90°.

(v) To construct an angle of 45°

Steps of Construction

1. Construct AOP = 90° (as above).

2. Bisect AOP (as in construction 2).

Let OQ be the bisector of AOP, then AOQ = 45°

5

4. To bisect a given line segment.

Given : Any line segment AB.

Required : To bisect line segment AB.

Steps of Construction:

1. At A, construct any suitable angle BAC.

2. At B, construct ABD = BAC on the other side of the line AB.

3. With A as centre and any suitable radius, draw an arc to meet

AC at E.

4. From BD, cut off BF = AE.

5. Join EF to meet AB at G, then EG is a bisector of the line

segment AB and G is mid – point of AB.

(ii) To divided a given line segment in a number of equal part.

6

5. Divided a line segment AB of length 8 cm into 4 equal part.

Given : A line segment AB of length 8 cm.

Required : To divide line segment 8 cm into 4 equal parts.

Steps of Construction:

1. Draw lien segment AB = 8 cm.

2. At A, construct any suitable angle BAX.

3. At B, construct ABY = BAX on the other side of the line AB.

4. From AX, cut off 4 equal distances at the points C, D, E and F

such that AC = CD = DE = EF.

5. With the same radius, cut off 4 equal distances along BY at the

points H, I, J and K such that BH = HI = IJ = JK.

6. Join AK, CJ, DI, EH and FB. Let CJ, DI and EH meet the line

segment AB at the points M, N and O respectively. Then, M, N

and O are the points of division of AB such that AM = MN = NO

= OB.

6. To draw a perpendicular bisector of a line segment.

Given : Any line segment PQ.

Required : To draw a perpendicular bisector of lien segment PQ.

Steps of Construction:

7

1. With P as centre and any line suitable radius draw arcs, one on

each side of PQ.

2. With Q as centre and same radius (as in step 1), draw two more

arcs, one on each side of PQ cutting the previous arcs at A and

B.

3. Join AB to meet PQ at M, then AB bisects PQ at M, and is

perpendicular to PQ, Thus, AB is the required perpendicular

bisector of PQ.

7. To construct an equilateral triangle when one of its side is given.

E.g.: Construct and equilateral triangle whose each side is 5 cm.

Given : Each side of an equilateral triangle is 5 cm.

Required : To construct the equilateral triangle.

Steps of Construction:

1. Draw any line segment AB = 5 cm.

2. With A as centre and radius 5 cm draw an arc.

3. With B as centre and radius 5 cm draw an arc to cut the

previous arc at C.

4. Join AC and BC. Then ABC is the required triangle.

8

8. To construct an equilateral triangle when its altitude is given.

E.g.: Construct an equilateral triangle whose altitude is 4 cm.

Steps of Construction:

1. Draw any line segment PQ.

2. Take an point D on PQ and At D, construct perpendicular DR to

PQ. From DR, cut off DA = 4 cm.

3. At A, construct DAS = DAT =1

602 = 30° on either side of

AD. Let AS and AT meet PQ at points B and C respectively.

Then, ABC is the required equilateral triangle.

9. Construction of a triangle, given its Base, Sum of the other Two sides

and one Base Angle.

9

E.g Construct a triangle with base of length 5 cm, the sum of the

other two sides 7 cm and one base angle of 60°.

Given: In ΔABC, base BC = 5 cm, AB + AC = 7 cm and ABC = 60°

Required : To construct the ΔABC.

Steps of Construction:

1. Draw BC = 5 cm.

2. At B, construct CBX = 60°

3. From BX, cut off BD = 7 cm.

4. Join CD.

5. Draw the perpendicular bisector of CD, intersecting BD at a

point A.

6. Join AC. Then, ABC is the required triangle.

10. Construction of a triangle, Given its Base, Difference of the Other Two

Sides and one Base Angle.

Eg: Construct a triangle with base of length 7.5 cm, the difference of

the other two sides 2.5 cm, and one base angle of 45°

Given : In ΔABC, base BC = 7.5 cm, the difference of the other

two sides, AB – AC or AC – AB = 2.5 cm and one base angle is 45°.

Required : To construct the ΔABC,

CASE (i) AB – AC = 2.5 cm.

Steps of Construction:

10

1. Draw BC = 7.5 cm.

2. At B, construct CBX = 45°.

3. From BX, cut off BD = 2.5 cm.

4. Join CD.

5. Draw the perpendicular bisector RS of CD intersecting BX at a

point A.

6. Join AC. Then, ABC is the required triangle.

CASE (ii) AC – AB = 2.5 cm

Steps of Construction:

1. Draw BC = 7.5 cm.

2. At B, construct CBX = 45° and produce XB to form a line XBX’.

3. From BX’, cut off BD’ = 2.5 cm.

4. Join CD’.

5. Draw perpendicular bisector RS of CD’ intersecting BX at a point

A.

6. Join AC. Then, ABC is the required triangle.

11

e

11. Construction of a Triangle of Given Perimeter and Base Angles.

Construct a triangle with perimeter 11.8 cm and base angles 60° and

45°.

Given : In ΔABC, AB+BC+CA = 11.8 cm, B = 60° & C = 45°.

Required : To construct the ΔABC.

Steps of Construction:

1. Draw DE = 11.8 cm.

2. At D, construct EDP =1

2of 60° = 30° and at E, construct

DEQ = 1

2 of 45° =

122

2 .

3. Let DP and EQ meet at A.

4. Draw perpendicular bisector of AD to meet DE at B.

5. Draw perpendicular bisector of AE to meet DE at C.

6. Join AB and AC. Then, ABC is the required triangle.

12

1

IX

Mathematics Chapter 12: Heron’s Formula

Chapter Notes

Top Definitions

1. The region enclosed with in a simple closed figure is called its area.

2. A plane figure bounded by four sides is a quadrilateral.

3. A quadrilateral is a cyclic quadrilateral if all its four vertices lie on thecircumference of the circle.

4. Semi perimeter is half of the perimeter.

Top Concepts

1. For every triangle, the values of (s – a), (s – b), and (s – b) are

positive.

2. The line segment joining the mid-point to any of the vertex divides the

triangle in two parts, equal in area.

3. The diagonal of a quadrilateral divides the quadrilateral into two

triangles.

4. The diagonal of a parallelogram divides the quadrilateral into two

congruent triangles.

5. Area of a quadrilateral whose sides and one diagonal are given can be

calculated by dividing the quadrilateral into two triangles and using

Heron’s formula.

Top Formulae

1. In triangle ABC right angled at B, AB2 + BC2 = AC2

2. Area of equilateral triangle = 23

4a sq units, where ‘a’ is the side length

of an equilateral triangle.

3. Semi-perimeter of equilateral triangle =3a

2

4. Area of a triangle =1

base height2

2

5. Area of triangle = s(s - a)(s - b)(s - c) ,a + b + c

s2

semi perimeter

6. Area of parallelogram = base × height

7. Area of a triangle =1

base height2

8. Area of parallelogram = 2 x (Area of triangle)

9. Area of cyclic quadrilateral = s(s - a)(s - b)(s - c)(s-d)

a + b + c+ds

2 semi perimeter

10. Area of a rhombus =1

Pr oduct of diagonals2

11. Area of a trapezium =1

height x(sumof parallelsides)2

12. Area of a quadrilateral =

1diagonalx sumof perpendicular fromverticesondiagonal

2

1

Class X: MathChapter 13: Surface Areas and Volumes

Chapter Notes

Top Definitions

1. A Cube is a special type of cuboids in which length = breadth = height.Also called an edge of a cube.

2. A sphere is a perfectly round geometrical object in three-dimensionalspace, such as the shape of a round ball.

3. A cylinder is a solid or a hollow object that has a circular base and acircular top of the same size.

4. A hemisphere is half of a sphere.

5. If a right circular is cut off by a plane parallel to its base, then theportion of the cone between the plane and the base of the cone iscalled a frustum of the cone.

Top Concepts

1. The total surface area of the solid formed by the combination of solidsis the sum of the curved surface area of each of the individual parts.

2. A solid is melted and converted to another, volume of both the solidsremains the same, assuming there is no wastage in the conversions.The surface area of the two solids may or may not be the same.

3. A frustum can be obtained by cutting a cone by a plane, parallel to thebase of the cone.

4. The solids having the same curved surface do not necessarily occupythe same volume.

Top Formulae

1. Cuboids:

Lateral surface area Or Area of four walls = 2(ℓ + b) h

Total surface area = 2(ℓb + bh + hℓ)

Volume = ℓ x b x h

Diagonal of a cuboids =2 2 2b h

2. Cube

Lateral surface area Or Area of four walls = 4 x (edge)2

2

Total surface area = 6 x (edge)²

Volume = (edge)3

Diagonal of a cube = 3 x edge.

3. Right circular cylinder:

Area of each end or Base area = r²

Area of curved surface or lateral surface area

= perimeter of the base x height = 2 r h

Total surface area (including both ends)

= 2 rh + 2r² = 2r (h + r)

Volume = (Area of the base0 x height = r²h

4. Right circular hollow cylinder:

Area of curved surface

= (External surface) + (Internal surface)

= (2Rh + 2rh) = 2 (R² - r²)

= [2h(R+ r) + 2 (R² - r²)]

= [2(R + r) (h + R – r)]

Volume of the material

= (External volume) – (Internal volume)

= (R²h - r²h) = h (R² - r²)

5. Right circular cone:

Slant height (ℓ) =2 2h r

Area of curved surface = rℓ = r2 2h r

Total surface area = Area of curved surface + Area of base

= rℓ + r² = r (ℓ + r)

Volume =21

r h3

6. Sphere:

3

Surface area = 4 r²

Volume =34

r3

7. Spherical shell:

Surface area (outer) = 4R²

Volume of material =4 4

r³ r³3 3

= 4R³ r³

3

8. Hemisphere:

Area of curved surface = 2 r²

Total surface Area = Area of curved surface + Area of base

= 2 r² + r²

= 3r²

Volume =32

r3

9. Frustum of a cone:

Total surface area = [R² + r² + ℓ (R + r)]

Volume of the material =1

h R² r² Rr3

Top Diagrams

1. Cuboid

2. Cube

4

3. Right circular cylinder:

4. Right circular hollow cylinder:

5. Right circular cone:

5

6. Sphere:

7. Spherical shell:

8. Hemisphere:

9. Frustum of a cone:

6

1

Class IX: Math

Chapter 14: Statistics Chapter Notes

Top Definitions

1. Facts or figures collected with a definite purpose are called data.

2. Statistics deals with collection, presentation, analysis andinterpretation of numerical data.

3. Arranging data in a order to study their salient features is calledpresentation of data.

4. Data arranged in ascending or descending order is called arrayed dataor an array.

5. When an investigator with a definite plan or design in mind collectsdata first handedly, it is called primary data.

6. Data when collected by someone else, say an agency or an

investigator, comes to you, is known as the secondary data.

7. Variable is a quantity that assumes different values.

8. Range of the data is the difference between the maximum and theminimum values of the observations.

9. The small groups obtained on dividing all the observations are calledclasses or class intervals and the size is called the class size or class

width.

10. Class mark of a class is the mid value of the two limits of that class.

11. A bar graph is the diagram showing a system of connections orinterrelations between two or more things by using bars.

12. A histogram is the bar graph such that the area over each classinterval is proportional to the relative frequency of data within this

interval.

13. The number of times an observation occurs in the data is called thefrequency of the observation.

14. A frequency distribution in which the upper limit of one class differsfrom the lower limit of the succeeding class is called an Inclusive or

discontinuous Frequency Distribution.

15. A frequency distribution in which the upper limit of one class coincides

from the lower limit of the succeeding class is called an exclusive or

continuous Frequency Distribution.

2

16. A bar graph is a pictorial representation of data in which rectangular

bars of uniform width are drawn with equal spacing between them on one axis, usually the x axis. The value of the variable is shown on the

other axis that is the y axis.

17. A histogram is a set of adjacent rectangles whose areas areproportional to the frequencies of a given continuous frequency

distribution.

18. The Cumulative Frequency of a class-interval is the sum of frequenciesof that class and the classes which precede (come before) it.

19. The mean value of a variable is defined as the sum of all the values ofthe variable divided by the number of values.

20. Median is the value of middle most observation(s).

21. Mode of a statistical data is the value of that variate which has themaximum frequency.

Top Concepts

1. In case of continuous frequency distribution, the upper limit of a classis not to be included in that class while in discontinuous both the limits

are included.

2. The height of rectangles corresponds to the numerical value of the

data.

3. Frequency polygons are a graphical device for understanding the

shapes of distributions.

4. Bar charts are used for comparing two or more values.

5. A histogram differs from a bar chart, as in the former it is the area ofthe bar that denotes the value, not the height.

6. The height of the rectangle as the ratio of the frequency of the class tothe width or size of the class.

7. Last cumulative frequency is always the sum total of all thefrequencies.

8. If both a histogram and a frequency polygon are to be drawn on thesame graph, then we should first draw the histogram and then join the

mid-points of the tops of the adjacent rectangles in the histogram with

line-segments to get the frequency polygon.

9. If classes are not of equal width, then the height of the rectangle iscalculated by the ratio of the frequency of that class, to the width of

that class.

3

10. A measure of central tendency tries to estimate the central value

which represents the entire data.

11. The three measures of central tendency for ungrouped data are mean,

mode and median.

12. The disadvantage of arithmetic mean is that it is affected by extreme

values.

13. The median is to be calculated only after arranging the data inascending order or descending order.

22. Average height is the modal value.

23. Disadvantage of the mode is that it is not uniquely defined in manycases.

24. The data is symmetric about the mean position when the threeaverages mean median and mode are all equal.

25. The data is asymmetric when the three measures are unequal.

14. The variate corresponding to the highest frequency is to be taken asthe mode and not the frequency.

Top Formulae

1. Class size =Range

Number of classes

2. Class size = Upper limit – Lower Limit

3. 1

1( )

n

i

i

Mean x xn

4. ( )

i i

i

f xMean x

f

5. (i) If number of observations (n) is odd, Median =1

( )2

nth

observation

(ii) If n is even, then median

( ) ( 1)2 2

2

thn nth

observation

4

Top Diagrams

1. Symmetric Distribution

2. Asymmetrical or skewed distribution

5

3. Bar Graph

4. Mean < Mode

6

5. Mode < Mean

6. Frequency Polygons

7

7. A histogram

1

Class IX: MathChapter 15: Probability

Chapter Notes

Top Definitions

1. Probability is a quantitative measure of certainty.

2. Any activity associated to certain outcome is called an experiment.e.g. (i) tossing a coin (ii) throwing a dice (ii) selecting a card.

3. A trial is an action which will result in one and several outcomes.

4. An event for an experiment is the collection of some outcomes of theexperiment. E.g (i) Getting a head on tossing a coin (ii) getting a facecard when a card is drawn from a pack of 52 cards.

Top Concepts

1. Probability of an event lies between 0 and 1.

2. Probability can never be negative.

3. A pack of playing cards consist of 52 cards which are divided into 4suits of 13 cards each. Each suit consists of one ace, one king, onequeen, one jack and 9 other cards numbered from 2 to 10. Four suitsnamed spades, hearts, diamonds and clubs.

4. King, queen and jack are face cards.

5. The two possible outcomes of tossing a coin are head and tail.

6. The sum of the probabilities of all elementary events of an experimentis 1.

Top Formulae

1. The empirical (experimental) probability of an event E denoted as P(E)is given by:

Number of trialinwhich theeventhappenendP(E)

TotalNumber of Outcomes

2

Top Diagrams

1. Suits of Playing Card

Heart Spades Diamond Club

2. Face Cards

A Queen of Heart A Jack of Club A King of Diamond

‘