Thursday, 24 October 2013
PROBABILITY
PROBABILITY
IMPORTANT POINTS TO
REMEMBER
·
A
event for an experiment is the collection of some outcomes of the experiment.
·
Empirical probability P(E) of an event E is
given by
·
P(E) = Number of trials in which E has happened
P(E) = Number of trials in which E has happened
Total number of trials
·
Probability
of an event lies between 0 and 1 ( both inclusive).
·
Sum of the probabilities of all the events of
an experiment is 1.
HERON'S FORMULA
HERON'S
FORMULA
IMPORTANT
POINTS TO REMEMBER
·
Area of a triangle
= 1 /2* base * corresponding height.
·
Area of a right angled
triangle= 1 /2 ab, where a and b are the
sides adjacent to right angle.
·
Area of an equilateral triangle of side a =√3/4
a².
·
Area of a trapezium = 1 /2 *
(sum of its parallel sides)* distance between parallel sides.
·
Heron's Formula:
Area of a
triangle = s(s-a)(s-b)(s-c)
where s= semi perimeter
and a, b, c are the sides of the triangle.
·
Perimeter of any
triangle=sum of the length of its sides.
·
Perimeter of a rhombus
of side a =4a.
·
Area of a polygon can
be calculated by dividing the polygon into triangles and using Heron's formula
for calculating area of each triangle.
CONSTRUCTIONS
CONSTRUCTIONS
IMPORTANT
POINTS TO REMEMBER
·
To draw geometrical
figure accurately some basic geometrical instruments are needed.
i. A
graduated scale, on whose one edge marked centimeters and millimeters and on the other side inches
and their parts.
ii. A
pair of set-squares, one with angle 60° and 30° and other with angles 45° and
45° .
iii. A
pair of dividers (or divider) with adjustments.
iv. A pair of compasses (or a compass) with
provision of filling a pencil at one end.
v. A protractor.
Normally,
all these instruments are needed in drawing a geometrical figure, such as a
triangle, a circle, a quadrilateral, a polygon etc. with given measurements.
But a geometrical construction is the process of drawing a geometrical figure using only tow instruments an use graduated
ruler, also called a straight edge and compass. In construction where measurements
are also required you may use graduated scale and protractor also.
CIRCLES
CIRCLES
IMPORTANT
POINTS TO REMEMBER
·
The collection of all
the points in a plane, which are at a fixed distance form a fixed point in the
plane, is called a circle.
The fixed point is
called the centre of the circle and the fixed distance is called the radius of the circle .
·
A circle divides the
plane on which it lies into three parts. They are(i) inside the circle, which
is called the interior of the circle;
(ii) the circle and (iii) outside the
circle, which is also called the exterior of the circle. The circle and its
interior make up the circular region.
·
A line segment joining
any two points on a circle is called a chord of the circle.
A chord passing through
the centre of a circle is known as its
diameter. A diameter is the longest chord and its length is equal to twice the
radius.
·
A piece of a circle cut
between two points is called an arc. There are two, one longer and other
smaller .The larger one is called the major arc PQ and the smaller one is
called minor arc PQ. The minor arc PQ us also denoted by PQ arc and the major
arc PQ bt PRQ, where R is some point on the arc between P and Q. Unless
otherwise stated arc PQ and PQ stand for minor arc PQ. When P, Q are ends of a
diameter, then both arcs are equal and each
is called a semicircle.
·
The length of the
complete circle is called its circumference. The region between a chord and its
corresponding arc is called a segment of the circle. There are two types of
segments, major segment and minor segment. The region between an arc and the
two radii, joining centre to the end points of the arc is called a sector. Like
segments you find that minor arc corresponds to minor sector and major arc
corresponds to major sector. The region OPQ is the minor sector and remaining
part of the circular region is the major sector. When two arcs are equal that
is each is a semi-circle, then both segments and both sectors become the same
and each is known as semi- circular region.
·
If the angles subtended
by two chords of a circle(or of congruent circles ) at the centre(
corresponding centres) are equal, the chords are equal.
·
The perpendicular from
the centre of the circle to a chord bisects the chord.
·
The line drawn through
the centre of a circle to bisect a chord is perpendicular to the chord.
·
There is one and only one circle passing though three
non-collinear points.
·
Equal chords of a
circle (or of congruent circles) are equidistant from the centre(or
corresponding centres).
·
Chords equidistant from
the centre (or corresponding centres) of a circle( or of congruent circles are
equal.
·
If the two arcs of a
circle are congruent, then their corresponding chords are equal and conversely
if two chords of a circle are equal, then their corresponding arcs (minor,
major) are congruent.
·
Congruent arcs of a
circle subtend equal angles at the centre.
·
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.
·
Angle in a semicircle
is a right angle.
·
If a line segment
joining two points subtends equal angles at two other points lying on the same
side of the line containing the line segment , the four points lie on a circle.
·
The sum of either pair
of opposite angles of a cyclic quadrilateral is 180°.
·
If sum of a pair of
opposite angles of a quadrilateral is 180°, the quadrilateral is cyclic.
Wednesday, 16 October 2013
NUMBER SYSTEMS
NUMBER SYSTEMS
BRIEF
SYNOPSIS
·
Numbers that can be
expressed in the form p/q , where q is a
non- zero integer and p is any integer are called rational numbers.
·
Numbers that cannot be
put in the form p/q , where q≠0, p , q € are called irrational numbers.
·
Every integer is a
rational number but a rational number need not be an integer.
·
Every fraction is a
rational number but a fraction need not be a rational number.
·
A rational number p/q
is said to be in the standard form if q is positive integer and the integer and
the integers p and q have no common divisor other than 1.
·
Between two
rational numbers x and y , there is a rational number x + y .
Between two
rational numbers x and y , there is a rational number x + y .
2
·
We can find as many
rational numbers between x and y as we want.
·
If x and y are any two
rational numbers, then:
i.
x+ y is a rational
number.
ii.
x-y is a rational
number.
iii.
x× y is a rational
number.
iv.
x÷ y is a rational
number (y≠0)
·
Every rational number
can be expressed as a decimal.
·
The decimal
representation of a rational number is either terminating or non terminating.
·
If the denominator of a
rational number written in standard form contains no prime factors other than 2
or 5 or both, then it can be represented as a terminating decimal.
·
If the denominator of a
rational number written in standard form has prime factors other than 2 or 5 or
, then it cannot be represented as a terminating decimal.
·
A number is the terminating decimal form can be converted to
one in the rational form by summing the place values of all the digits.
·
A number in the
recurring decimal can be converted to one in the rational form by multiplying
the decimal by suitable power of 10 and eliminating the decimal point.
·
A useful result to convert a number in the
recurring decimal form to the rational form:
If all the digits on
the right side of the decimal part are repeated , then
Given decimal = Integral part of the decimal number+ Number
formed by the digits in decimal part
Number formed by the same number of 9's as the
number
of digits in the decimal part
For example
:0.7 = 0+ 7 = 7 ,
2.49 =2+49 , 5.04 =5+4 etc.
9 9 99 99
·
A number can have
decimal representation in one of the following forms:
i.
terminating
ii.
non- terminating but
repeating( recurring)
iii.
non-terminating and non
-repeating.
The numbers of the type (i) and (ii) are rational
numbers where as of type(iii) are known
as irrational.
·
For positive real
numbers a and b, the following identities hold:
i.
√ab = √a √b
ii.
a
a
b
iii.
(√a+√b) (√a-√b) =a-b
iv.
(a+√b)(a-√b)=a²-b
v.
(√a+√b)²=a +2√ab+b
·
To rationalise
the denominator of 1 , we multiply this by √a-b , where a and
b are integers and
To rationalise
the denominator of 1 , we multiply this by √a-b , where a and
b are integers and
√a +b √a-b
·
√a +b≠0 .
·
Let a> 0 be a real number and p and q be
rational numbers .Then
a) ap
AREAS OF PARALLELOGRAMS AND TRIANGLES
AREAS OF PARALLELOGRAMS AND TRIANGLES
SOME IMPORTANT POINTS TO REMEMBER
·
Two
figures are called congruent, if they have the same shape and the same size.
·
Area
of a figure is a number(in some unit) associated with the part of the plane
enclosed by the figure with following two properties:
i.
If A and B are two congruent figures, then ar (A)
= ar (B).
ii.
If
a planar region formed by a figure T is made up of two non-overlapping planar regions formed by figures P and Q ,
then ar(T)= ar (P) + ar(Q).
·
Two
congruent figures have equal areas but the converse need not be true.
·
Parallelograms
on the same base(or equal bases) and between the same parallels are equal in
area.
·
Area
of a parallelogram is the product of its base and the corresponding altitude.
·
Parallelograms
on the same base(or equal bases) and having equal areas lie between the same
parallels.
·
If
a parallelogram and a triangle are on the same base and between the same
parallels, then area of the triangle is half the area of the parallelogram.
·
Triangles
on the same base(or equal bases) and between the same parallels are equal in
area.
·
Area
of a triangle is half the product of its base and the corresponding altitude.
·
Triangles on the same base(or equal bases) and having
equal areas lie between the same parallels.
·
A
median of a triangle divides it two triangles equal areas.
QUADRILATERALS
QUADRILATERALS
SOME IMPORTANT POINTS TO REMEMBER
·
"quadri-----
means four" and " lateral ----- means sides".
·
Quadrilateral
is a closed figure bounded by four sides such that no two line segments cross
each other.
·
The
sum of the angles of a quadrilateral is 360°.
·
A
quadrilateral having exactly one pair of parallel sides, is called a trapezium.
·
A
quadrilateral in which both pairs of opposite sides are parallel, is called a
parallelogram.
·
A
rectangle is a parallelogram whose angles are right angles.
·
A
rhombus is a parallelogram, whose all sides are equal.
·
A
square is a parallelogram whose all angles are right angles and all sides are
equal.
·
A
quadrilateral is a parallelogram , if
i. its opposite sides are equal;
ii. its opposite angles
are equal;
iii. its diagonals bisect
each other;
iv. it has one pair of
opposite sides equal and parallel.
·
In
a parallelogram
i. Diagonals divide it
into congruent triangles;
ii. Opposite sides are
equal;
iii. Opposite angles are
equal;
iv. The diagonals bisect
each other.
·
Diagonals
of a rectangle bisect each other and are equal and vice-versa.
·
Diagonals
of a rhombus bisect each other at right angles and vice -versa.
·
Diagonals
of a square bisect each other at right angles and are equal , and vice- versa.
·
The
line - segment joining the mid-points of any two sides of a triangle is
parallel to the third side and is half of it.
·
A
line through the mid -point of a side of a triangle parallel to another side
bisects the third side.
·
The
quadrilateral formed by joining the mid -points of the sides of a
quadrilateral, in order, is a parallelogram.
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