Class 6 Maths NCERT
Solutions
Chapter 5 Understanding
Elementary Shapes
Exercise
5.1
Q.1: What is the
disadvantage in comparing line segments by mere observation?
Ans:
By
mere observation, we cannot be absolutely sure about the judgement. When we compare
two line segments of almost same lengths, we cannot be
sure about the line segment of greater length. Therefore, it is not an
appropriate method to compare line segments having a slight difference between
their lengths. This is the disadvantage in comparing line segments by mere
observation.
Q.2: Why is it better to
use a divider than a ruler, while measuring the length of a line segment?
Ans:
It
is better to use a divider than a ruler because while using a ruler,
positioning error may occur due to the incorrect positioning of the eye.
Q.3: Draw any line
segment, say 
. Take any point C
lying in between A and B. Measure the lengths of AB, BC and AC. Is AB = AC +
CB?
[Note: If A, B, C are
any three points on a line such that AC + CB = AB, then we can be sure that C
lies between A and B]
Ans:
It
is given that point C is lying somewhere in between A and B. Therefore, all
these points are lying on the same line segment . Hence, for every
situation in which point C is lying in between A and B, it may be said that
AB = AC + CB.
For
example,
is a line segment of 6 cm and C is a point
between A and B, such that it is 2 cm away from point B.
We can find that the measure of line segment 
comes to 4 cm.
Hence,
relation AB = AC + CB is verified.
Q.4: If A, B, C are three
points on a line such that AB = 5 cm, BC = 3 cm and AC = 8 cm, which one of
them lies between the other two?
Ans:
Given that,
AB = 5 cm
BC = 3 cm
AC = 8 cm
It
can be observed that AC = AB + BC
Clearly,
point B is lying between A and C.
Q.5: Verify, whether D is
the mid-point of 
.
Ans:
From
the given figure, it can be observed that
= 4 − 1 = 3 units
= 7 − 4 = 3 units
= 7 − 1 = 6 units
Clearly,
D is the mid-point of .
Q.6: If B is the mid point of and C is the
mid-point of 
, where A, B, C, D
lie on a straight line, say why AB = CD?
Ans:
Since
B is the mid-point of AC,
AB = BC ……… (1)
Since
C is the mid-point of BD,
BC = CD ……… (2)
From
equation (1) and (2), we may find that
AB = CD
Exercise
5.2
Q.1: What fraction of a
clock wise revolution does the hour hand of a clock turn through when it goes
from
(a) 3 to 9
(b) 4 to 7
(c) 7 to 10
(d) 12 to 9
(e) 1 to 10
(f) 6 to 3
Ans:
We
may observe that in 1 complete clockwise revolution, the hour hand will rotate
by 360º.
(a) When the hour
hand goes from 3 to 9 clockwise, it will rotate by 2 right angles or 180º.
Fraction = 
(b) When the hour
hand goes from 4 to 7 clockwise, it will rotate by 1 right angle or 90º.
Fraction = 
(c) When the hour
hand goes from 7 to 10 clockwise, it will rotate by 1 right angle or 90º.
Fraction =
(d) When the hour
hand goes from 12 to 9 clockwise, it will rotate by 3 right angles or 270º.
Fraction = 
(e) When the hour
hand goes from 1 to 10 clockwise, it will rotate by 3 right angles or 270º.
Fraction =
(f) When the hour
hand goes from 6 to 3 clockwise, it will rotate by 3 right angles or 270º.
Fraction =
Q.2: Where will the hand
of a clock stop if it
(a) Starts at 12 and
makes 
of a
revolution, clockwise?
(b) Starts at 2 and
makes of a revolution, clockwise?
(c) Starts at 5 and makes 
of a revolution,
clockwise?
(d) Starts at 5 and
makes 
of a revolution,
clockwise?
Ans:
In
1 complete clockwise revolution, the hand of a clock will rotate by 360º.
(a) If the hand of
the clock starts at 12 and makes of a revolution
clockwise, then it will rotate by 180º and hence, it will stop at 6.
(b) If the hand of
the clock starts at 2 and makes of a revolution
clockwise, then it will rotate by 180º and hence, it will stop at 8.
(c) If the hand of
the clock starts at 5 and makes of a revolution
clockwise, then it will rotate by 90º and hence, it will stop at 8.
(d) If the hand of
the clock starts at 5 and makes of a revolution
clockwise, then it will rotate by 270º and hence, it will stop at 2.
Q.3: Which direction will
you face if you start facing
(a) East and make of a revolution clockwise?
(b) East and make 
of a revolution clockwise?
(c) West and make of a revolution anti-clockwise?
(d) South and make
one full revolution?
(Should we specify clockwise
or anti-clockwise for this last question? Why not?)
Ans:
If
we revolve one complete round in either clockwise or anti-clockwise direction,
then we will revolve by 360º and the two adjacent directions will be at 90º or of a complete
revolution away from each other.
(a) If we start
facing East and make of a revolution
clockwise, then we will face the West direction.
(b) If we start
facing East and make of a revolution
clockwise, then we will face the West direction.
(c) If we start
facing West and make of a revolution
anti-clockwise, then we will face the North direction.
(d) If we start
facing South and make a full revolution, then we will again face the South
direction.
In
case of revolving by 1 complete round, the direction in which we are revolving
does not matter. In both cases, clockwise or anti-clockwise, we will be back at
our initial position.
Q.4: What part of a
revolution have you turned through if you stand facing
(a) East and turn
clock wise to face north?
(b) South and turn
clockwise to face east?
(c) West and turn
clockwise to face east?
Ans:
If
we revolve one complete round in either clockwise or anti-clockwise direction,
then we will revolve by 360º and the two adjacent directions will be at 90º or of a complete
revolution away from each other.
(a) If we start
facing East and turn clockwise to face North, then we have to make of a revolution.
(b) If we start
facing South and turn clockwise to face east, then we have to make of a revolution.
(c) If we start
facing West and turn clockwise to face East, then we have to make of a revolution.
Q.5: Find the number of
right angles turned through by the hour hand of a clock when it goes from
(a) 3 to 6
(b) 2 to 8
(c) 5 to 11
(d) 10 to 1
(e) 12 to 9
(f) 12 to 6
Ans:
The
hour hand of a clock revolves by 360º or 4 right angles in 1 complete round.
(a) The hour hand of
a clock revolves by 90º or 1 right angle when it goes from 3 to 6.
(b) The hour hand of
a clock revolves by 180º or 2 right angles when it goes from 2 to 8.
(c) The hour hand of
a clock revolves by 180º or 2 right angles when it goes from 5 to 11.
(d) The hour hand of
a clock revolves by 90º or 1 right angle when it goes from 10 to 1.
(e) The hour hand of a
clock revolves by 270º or 3 right angles when it goes from 12 to 9.
(f) The hour hand of
a clock revolves by 180º or 2 right angles when it goes from 12 to 6.
Q.6: How many right angles
do you make if you start facing
(a) South and turn
clockwise to west?
(b) North and turn
anti-clockwise to east?
(c) West and turn to
west?
(d) South and turn to
north?
Ans:
If
we revolve one complete round in either clockwise or anti-clockwise direction,
then we will revolve by 360º or 4 right angles and the two adjacent directions
will be at 90º or 1 right angle away from each other.
(a) If we start
facing South and turn clockwise to West, then we make 1 right angle.
(b) If we start
facing North and turn anti-clockwise to East, then we make 3 right angles.
(c) If we start
facing West and turn to West, then we make 1 complete round or 4 right angles.
(d) If we start
facing South and turn to North, then we make 2 right angles.
Q.7: Where will the hour
hand of a clock stop if it starts
(a) From 6 and turns
through 1 right angle?
(b) From 8 and turns
through 2 right angles?
(c) From 10 and turns
through 3 right angles?
(d) From 7 and turns
through 2 straight angles?
Ans:
In
1 complete revolution (clockwise or anti-clockwise), the hour hand of a clock will
rotate by 360º or 4 right angles.
(a) If the hour hand
of a clock starts from 6 and turns through 1 right angle, then it will stop at
9.
(b) If the hour hand
of a clock starts from 8 and turns through 2 right angles, then it will stop at
2.
(c) If the hour hand
of a clock starts from 10 and turns through 3 right angles, then it will stop
at 7.
(d) If the hour hand
of a clock starts from 7 and turns through 2 straight angles, then it will stop
at 7.
Exercise
5.3
Q.1: Match the following:
|
(i) Straight angle |
(a) Less than
one-fourth of a revolution |
|
(ii) Right angle |
(b) More than half
a revolution |
|
(iii) Acute angle |
(c) Half of a
revolution |
|
(iv) Obtuse angle |
(d) One-fourth of a
revolution |
|
(v) Reflex angle |
(e) Between |
|
|
(f) One complete
revolution |
Ans:
(i) Straight angle is
of 180º and half of a revolution is 180º.
Hence, (i) →
(c)
(ii) Right angle is
of 90º and one-fourth of a revolution is 90º.
Hence, (ii) →
(d)
(iii) Acute angles
are the angles less than 90º. Also, less than one-fourth of a revolution is the
angle less than 90º.
Hence, (iii) →
(a)
(iv) Obtuse angles
are the angles greater than 90º but less than 180º. Also, between and of a revolution
is the angle whose measure lies between 90º and 180º.
Hence, (iv) →
(e)
(v) Reflex angles are
the angles greater than 180º but less than 360º. Also, more than half a
revolution is the angle whose measure is greater than 180º.
Hence, (v) →
(b)
Q.2: Classify each one of
the following angles as right, straight, acute, obtuse or reflex:
Ans:
(a) Acute angle as
its measure is less than 90º.
(b) Obtuse angle as
its measure is more than 90º but less than 180º.
(c) Right angle as
its measure is 90º.
(d) Reflex angle as
its measure is more than 180º but less than 360º.
(e) Straight angle as
its measure is 180º.
(f) Acute angle as
its measure is less than 90º.
Exercise
5.4
Q.1: What is the measure
of (i) a right angle? (ii) a straight angle?
Ans:
(i) The measure of a
right angle is 90°.
(ii) The measure of a
straight angle is 180°.
Q.2: Say True or False:
(a) The measure of an
acute angle < 90°
(b) The measure of an
obtuse angle < 90°
(c) The measure of a
reflex angle > 180°
(d) The measure of
one complete revolution = 360°
(e) If m∠A = 53° and m∠B
= 35°, then m∠A > m∠B.
Ans:
(a) True
The measure of an
acute angle is less than 90°.
(b) False
The measure of an
obtuse angle is greater than 90º but less than 180º.
(c) True
The measure of a
reflex angle is greater than 180°.
(d) True
The measure of one
complete revolution is 360º.
(e) True
Q.3: Write down the
measures of
(a) Some acute
angles. (b) Some obtuse angles.
(Give at least two
examples of each).
Ans:
(a) 45°, 70°
(b) 105°, 132°
Q.4: Measure the angles
given below using the Protractor and write down the measure.
Ans:
(a) 45º
(b) 120º
(c) 90º
(d) 60º, 90º, and
130º
Q.5: Which angle has a
large measure? First estimate and then measure.
Measure of angle A =
Measure of angle B =
Ans:
Measure of angle A =
40º
Measure of angle B =
68º
∠B
has the greater measure than ∠A.
Q.6: From these two angles
which has larger measure? Estimate and then confirm by measuring them.
Ans:
The
measures of these angles are 45º and 55º. Therefore, the angle shown in 2nd figure
is greater.
Q.7: Fill in the blanks
with acute, obtuse, right or straight:
(a) An angle whose
measure is less than that of a right angle is _______.
(b) An angle whose
measure is greater than that of a right angle is _______.
(c) An angle whose
measure is the sum of the measures of two right angles is _______.
(d) When the sum of
the measures of two angles is that of a right angle, then each one of them is
_______.
(e) When the sum of
the measures of two angles is that of a straight angle, and if one of them is
acute then the other should be _______.
Ans:
(a) Acute angle
(b) Obtuse angle (if
the angle is less than 180º)
(c) Straight angle
(d) Acute angle
(e) Obtuse angle
Q.8: Find the measure of
the angle shown in each figure. (First estimate with your eyes and then find
the actual measure with a protractor).
Ans:
The
measures of the angles shown in the above figure are 40º, 130º, 65º, 135º
respectively.
Q.9: Find the angle
measure between the hands of the clock in each figure:
Ans:
(a) 90°
(b) 30°
(c) 180°
Q.10: Investigate
In the given figure,
the angle measures 30°. Look at the same figure through a magnifying glass.
Does the angle become larger? Does the size of the angle change?
Ans:
The measure of this
angle will not change.
Q.11: Measure and classify
each angle:
|
Angle |
Measure |
Type |
|
∠AOB |
- |
- |
|
∠AOC |
- |
- |
|
∠BOC |
- |
- |
|
∠DOC |
- |
- |
|
∠DOA |
- |
- |
|
∠DOB |
- |
- |
Ans:
|
Angle |
Measure |
Type |
|
∠AOB |
40º |
Acute |
|
∠AOC |
125º |
Obtuse |
|
∠BOC |
85º |
Acute |
|
∠DOC |
95º |
Obtuse |
|
∠DOA |
140º |
Obtuse |
|
∠DOB |
180º |
Straight |
Exercise
5.5
Q.1: Which of the
following are models for perpendicular lines:
(a) The adjacent
edges of a table top.
(b) The lines of a
railway track.
(c) The line segments
forming the letter ’L’
(d) The letter V.
Ans:
(a) The adjacent
edges of a table top are perpendicular to each other.
(b) The lines of a
railway track are parallel to each other.
(c) The line segments
forming the letter ’L’ are perpendicular to each other.
(d) The sides of
letter V are inclined at some acute angle on each other.
Hence, (a) and (c)
are the models for perpendicular lines.
Q.2: Let 
be the
perpendicular to the line segment 
. Let and intersect in
the point A. What is the measure of ∠PAY?
Ans:
From the figure, it
can be easily observed that the measure of ∠PAY is 90°.
Q.3: There are two
set-squares in your box. What are the measures of the angles that are formed at
their corners? Do they have any angle measure that is common?
Ans:
One has a measure of
90°, 45°, 45°.
Other has a measure
of 90°, 30°, 60°.
Therefore, the angle
of 90° measure is common between them.
Q.4: Study the diagram.
The line l is perpendicular to line m.
(a) Is CE = EG?
(b) Does PE bisect
CG?
(c) Identify any two line segments for which PE is the perpendicular
bisector.
(d) Are these true?
(i) AC > FG.
(ii) CD = GH.
(iii) BC < EH.
Ans:
(a) Yes. As CE = EG =
2 units
(b) Yes. PE bisects
CG since CE = EG.
(c) 
and 
(d) (i) True. As
length of AC and FG are of 2 units and 1 unit respectively.
(ii) True. As both
have 1 unit length.
(iii) True. As the
length of BC and EH are of 1 unit and 3 units respectively.
Exercise
5.6
Q.1: Name the types of
following triangles:
(a) Triangle with
lengths of sides 7 cm, 8 cm and 9 cm.
(b) ΔABC with AB
= 8.7 cm, AC = 7 cm and BC = 6 cm.
(c) ΔPQR such
that PQ = QR = PR = 5 cm.
(d) ΔDEF with m∠D = 90°
(e) ΔXYZ with m∠Y = 90° and XY = YZ.
(f) ΔLMN with m∠L = 30°, m∠M
= 70° and m∠N = 80°
Ans:
(a) Scalene triangle
(b) Scalene triangle
(c) Equilateral
triangle
(d) Right-angled
triangle
(e) Right-angled
isosceles triangle
(f) Acute-angled
triangle
Q.2: Match the following:
|
Measures of Triangle |
Type of Triangle |
|
(i) 3 sides of equal length |
(a) Scalene |
|
(ii) 2 sides of equal length |
(b) Isosceles right angled |
|
(iii) All sides are of
different length |
(c) Obtuse angled |
|
(iv) 3 acute angles |
(d) Right angled |
|
(v) 1 right angle |
(e) Equilateral |
|
(vi) 1 obtuse angle |
(f) Acute angled |
|
(vii) 1 right angle with two
sides of equal length |
(g) Isosceles |
Ans:
(i) Equilateral (e)
(ii) Isosceles (g)
(iii) Scalene (a)
(iv) Acute-angled (f)
(v) Right-angled (d)
(vi) Obtuse-angled
(c)
(vii) Isosceles
right-angled (b)
Q.3: Name each of the
following triangles in two different ways: (you may judge the nature of the
angle by observation)
Ans:
(a) Acute-angled and
isosceles
(b) Right-angled and
scalene
(c) Obtuse-angled and
isosceles
(d) Right-angled and
isosceles
(e) Acute-angled and
equilateral
(f) Obtuse-angled and
scalene
Q.4: Try to construct
triangles using match sticks. Some are shown here. Can you make a triangle with
(a) 3 matchsticks?
(b) 4 matchsticks?
(c) 5 matchsticks?
(d)6 matchsticks?
(Remember you have to
use all the available matchsticks in each case)
Name the type of
triangle in each case. If you cannot make a triangle, think of reasons for it.
Ans:
(a) By using 3
matchsticks, we can form a triangle as
(b) By using 4
matchsticks, we cannot form a triangle. This is because the sum of the lengths
of any two sides of a triangle is always greater than the length of the
remaining side of the triangle.
(c) By using 5
matchsticks, we can form a triangle as
(d) By using 6
matchsticks, we can form a triangle as
Exercise
5.7
Q.1: State True or False:
(a) Each angle of a
rectangle is a right angle.
(b) The opposite
sides of a rectangle are equal in length.
(c) The diagonals of
a square are perpendicular to one another.
(d) All the sides of
a rhombus are of equal length.
(e) All the sides of
a parallelogram are of equal length.
(f) The opposite
sides of a trapezium are parallel.
Ans:
(a) True
(b) True
(c) True
(d) True
(e) False
(f) False
Q.2: Give reasons for the
following:
(a) A square can be
thought of as a special rectangle.
(b) A rectangle can
be thought of as a special parallelogram.
(c) A square can be
thought of as a special rhombus.
(d) Squares,
rectangles, parallelograms are all quadrilaterals.
(e) Square is also a
parallelogram.
Ans:
(a) In a rectangle,
all the interior angles are of the same measure, i.e., 90º and only the
opposite sides of the rectangle are of the same length whereas in case of a
square, all the interior angles are of 90° and all the sides are of the same
length. In other words, a rectangle with all sides equal becomes a square.
Therefore, a square is a special rectangle.
(b) Opposite sides of
a parallelogram are parallel and equal. In a rectangle, the opposite sides are
parallel and equal. Also, all the interior angles of the rectangle are of the
same measure, i.e., 90º. In other words, a parallelogram with each angle a
right angle becomes a rectangle. Therefore, a rectangle can be thought of as a
special parallelogram.
(c) All sides of a
rhombus and a square are equal. However, in case of a square, all interior
angles are of 90º measure. A rhombus with each angle a right angle becomes a
square. Therefore, a square can be thought of as a special rhombus.
(d) All are closed
figures made of 4 line segments. Therefore, all these
are quadrilaterals.
(e) Opposite sides of
a parallelogram are parallel and equal. In a square, the opposite sides are
parallel and the lengths of all the four sides are equal. Therefore, a square
can be thought of as a special parallelogram.
Q.3: A figure is said to
be regular if its sides are equal in length and angles are equal in measure.
Can you identify the regular quadrilateral?
Ans:
In
a square, all the interior angles are of 90° and all the sides are of the same
length. Therefore, a square is a regular quadrilateral.
Exercise
5.8
Q.1: Examine whether the
following are polygons. If any one among them is not,
say why?
Ans:
(a) It is not a
polygon as it is not a closed figure.
(b) Yes, it is a
polygon made of 6 sides.
(c) No, it is not
made of line segments.
(d) No, it is not
made of only line segments.
Q.2: Name each polygon.
Make two more
examples of each of these.
Ans:
(a) The given figure
is a quadrilateral as this closed figure is made of 4 line
segments. Two more examples are
(b) The given figure
is a triangle as this closed figure is made of 3 line
segments. Two more examples are
(c) The given figure
is a pentagon as this closed figure is made of 5 line
segments. Two more examples are
(d) The given figure
is an octagon as this closed figure is made of 8 line
segments. Two more examples are
Q.3: Draw a rough sketch
of a regular hexagon. Connecting any three of its vertices, draw a triangle.
Identify the type of the triangle you have drawn.
Ans:
An
isosceles triangle by joining three of the vertices of a hexagon can be drawn
as follows.
Q.4: Draw a rough sketch
of a regular octagon. (Use squared paper if you wish). Draw a rectangle by
joining exactly four of the vertices of the octagon.
Ans:
Q.5: A diagonal is a line
segment that joins any two vertices of the polygon and is not a side of the
polygon. Draw a rough sketch of a pentagon and draw its diagonals.
Ans:
It
can be observed here that AC, AD, BD, BE, CE are the diagonals.
Exercise
5.9
Q.1: Match the following:
|
(a) |
Cone |
(i) |
|
|
(b) |
Sphere |
(ii) |
|
|
(c) |
Cylinder |
(iii) |
|
|
(d) |
Cuboid |
(iv) |
|
|
(e) |
Pyramid |
(v) |
|
Give two new examples
of each shape.
Ans:
(a) (ii)
(b) (iv)
(c) (v)
(d) (iii)
(e) (i)
Q.2: What shape is
(a) Your instrument box?
(b) A brick?
(c) A match box?
(d) A road-roller?
(e) A sweet laddu?
Ans:
(a) Cuboid
(b) Cuboid
(c) Cuboid
(d) Cylinder
(e) Sphere
End of Questions