NCERT Solutions Class 5 Maths
Chapter - 3. How Many Squares?
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1.
Chapter 3 Image 1
(i) Measure the side of the square on the dotted sheet. Draw here as many rectangles as possible using 12 such squares.
Solution:-
The side of the square on the dotted sheet is 1 cm.
Chapter 3 Image 2
(ii) How many rectangles could you make?
Solution:-
We can make 7 rectangles.
2. Each rectangle is made out of 12 equal squares, so all have the same area, but the length of the boundary will be different.
(i) Which of these rectangles has the longest perimeter?
Solution:-
From the above figure, we can say that rectangles 1 and 2 have the longest perimeter.
We know that, perimeter of rectangle = 2 (length + breadth)
= 2 (1 + 12)
= 2 × 13
= 26 cm
(ii) Which of these rectangles has the smallest perimeter?
Solution:-
From the above figure, we can say that rectangles 3, 4, 5 and 6 have the smallest perimeter.
We know that, perimeter of rectangle = 2 (length + breadth)
= 2 (3 + 5)
= 2 × 8
= 16 cm
3.
Chapter 3 Image 3
Look at these interesting stamps.
(a) How many squares of one-centimetre side do stamp A and stamp B cover?
Solution:-
Stamp A covers 18 squares of the one-centimetre side, and Stamp B covers 8 squares of the one-centimetre side.
(b) Which stamp has the biggest area?
Solution:-
Stamp ‘A’ has the biggest area because it has 18 squares.
(i) How many squares of side 1 cm do this stamp cover?
Solution:-
This stamp has 18 squares of side 1 cm.
(ii) How much is the area of the biggest stamp?
Solution:-
The biggest stamp is in the shape of a rectangle.
Thus, the area of the biggest stamp is = length × breadth
= 3 × 6
= 18 cm2
c) Which two stamps have the same area?
Solution:-
Stamp ‘D’ and stamp ‘F’ have the same area.
(i) How much is the area of each of these stamps in square cm?
Solution:-
We know that area of the rectangle = length × breadth
So, the area of the stamp ‘D’ = 3 × 4
= 12 cm2
Area of stamp ‘F’ = 4 × 3
= 12 cm2
Therefore, the area of stamp ‘D’ is equal to the area of stamp ‘F’.
d) The area of the smallest stamp is _____ square cm.
Solution:-
The area of smallest stamp ‘E’ = length × breadth
= 2 × 2
= 4 cm2
Therefore, the area of the smallest stamp is 4 square cm.
(i) The difference between the area of the smallest and the biggest stamp is _____ square cm.
Solution:-
Area of the biggest stamp = 18 cm2
Area of the smallest stamp = 4 cm2
Then,
The difference between the area of the smallest and the biggest stamp = 18 – 4
= 14 cm2
4. Guess
a) Which has the bigger area — one of your footprints or the page of the textbook?
Solution:-
When comparing the area of the footprints and the area of the page of the textbook, the area of the page of the textbook is bigger than the footprints.
b) Which has the smaller area – two five-rupee notes together or a hundred-rupee note?
Solution:-
A hundred rupee note has the smaller area.
c) Look at a 10 rupee note. Is its area more than hundred square cm?
Solution:-
No, the area of a 10 rupee note is not more than hundred square cm.
d) Is the area of the blue shape more than the area of the yellow shape? Why?
NCERT Solutions For Class 5 Maths Chapter 3 Image 4
Solution:-
No, from the given image, we can say that the area of the blue shape is equal to the area of the yellow shape. Because the yellow and blue shaped figures are divided into two triangles of equal areas.
e) Is the perimeter of the yellow shape more than the perimeter of the blue shape? Why?
Solution:-
No, the perimeter of the yellow shape is less than the perimeter of the blue shape. With the help of a ruler, we can find that the length of the boundary of the blue shape is more than the length of the boundary of the yellow shape.
5. Write the area (in square cm) of the shapes below.
Chapter 3 Image 5
Solution:-
Area of triangle fig. A = ½ × base × height
= ½ × 3 × 4
= ½ × 12
= 6 cm2
Area of square fig. B = 4 complete square + 8 half squares + 4 quarter squares
= 4 + (½ × 8) + (¼ × 4)
= 4 + 4 + 1
= 9 cm2
Area of fig. C = 2 complete square + 4 half square
= 2 + (½ × 4)
= 2 + 2
= 4 cm2
Area of fig. D = 5 complete square + 2 half square
= 5 + (½ × 2)
= 5+ 1
= 6 cm2
Area of fig. E = 18 complete square + 6 half square
= 18 + (½ × 6)
= 18 + 3
= 21 cm2
Area of fig. F = 4 complete square + 4 more than half + 4 quarter square
= 4 + (¾ × 4) + (¼ × 4)
= 4 + 3 + 1
= 8 cm2
6. The blue triangle is half of the big rectangle. The area of the big rectangle is 20 square cm. So the area of the blue triangle is _______ square cm.
Chapter 3 Image 6
Solution:-
From the question,
The area of the big rectangle is 20 cm2.
The area of the blue triangle is half of the big rectangle = 20/2
= 10 cm2
7. In the figure below, there are two halves of two different rectangles.
Chapter 3 Image
Find the area of the two rectangles in the figure. What is the area of the red triangle? Explain.
From the figure, we can say that,
The orange rectangle contains 12 squares
So, the area of the orange rectangle = 12 cm2
Then, the green rectangle contains 8 squares
So, the area of the green rectangle = 8 cm2
Now, the area of the orange portion of the triangle = 12/2 = 6 cm2
The area of the yellow portion of the triangle = 8/2 = 4 cm2
Therefore, the area of the red triangle = 6 + 4
= 10 cm2
8. Suruchi drew two sides of a shape. She asked Asif to complete the shape with two more sides so that its area was 10 square cm.
Chapter 3 Image 8
He completed the shape like the following:
Chapter 3 Image 9
(i) Is he correct?
Solution:-
Yes, he is correct.
(ii) Explain how the green area is 4 square cm, and the yellow area is 6 square cm.
Solution:-
Green area = 2 complete square + 4 half square
= 2 + (½ × 4)
= 2 + 2
= 4 cm2
Yellow area = 3 complete square + 2 more than half + 2 half filled
= 3 + 2 + (½ × 2)
= 3 + 2 + 1
= 6 cm2
Practice Questions
1. This is one of the sides of a shape. Complete the shape so that its area is 4 square cm.
Chapter 3 Image 10
Solution:-
Chapter 3 Image 11
The completed shape = 2 complete square + 4 half square
= 2 + (½ × 4)
= 2 + 2
= 4 cm2
2. Two sides of a shape are drawn here. Complete the shape by drawing two more sides so that its area is less than 2 square cm.
Chapter 3 Image 12
Solution:-
Chapter 3 Image 13
3. Here is a rectangle with an area of 20 square cm.
Chapter 3 Image 14
a) Draw one straight line in this rectangle to divide it into two equal triangles. What is the area of each of the triangles?
Solution:-
Chapter 3 Image 15
Area of rectangle = 10 × 2
= 20 cm2
Then, the area of two equal triangles = 20/2
= 10 cm2
Because it is given that a straight line divides the rectangle into two equal triangles.
b) Draw one straight line in this rectangle to divide it into two equal rectangles. What is the area of each of the smaller rectangles?
Solution:-
Chapter 3 Image 16
Area of big rectangle = 10 cm2
The area of each of the smaller rectangles = 20/2
= 10 cm2
c) Draw two straight lines in this rectangle to divide it into one rectangle and two equal triangles.
Solution:-
Chapter 3 Image 17
(i) What is the area of the rectangle?
Solution:-
Area of rectangle = length × breadth
= 2 × 5
= 10 cm2
(ii) What is the area of each of the triangles?
Solution:-
Area of each triangle = ½ × area of the smaller rectangle
= ½ × 10
= 5 cm2
4. Puzzle with five squares
Chapter 3 Image 18
a) How many different shapes can you draw?
Solution:-
Using 5 squares, I can draw 12 shapes, as shown below:
Chapter 3 Image 19
b) Which shape has the longest perimeter? How much?
Solution:-
Shape 4 has the smallest perimeter out of the 12 shapes; the rest of the shapes have the same perimeter, i.e. = 1 + 1 + 1 + 1 + 1 + 1+ 1 + 1 + 1 + 1 + 1 + 1 = 12 cm
c) Which shape has the shortest perimeter? How much?
Solution:-
Out of 12 shapes, 4 have the smallest perimeter.
i.e. = 1 + 1 + 1 + 1 + 1 + 1 + 1 + 1 + 1 + 1 = 10 cm.
d) What is the area of the shapes (in square cm)?
Solution:-
There are 12 shapes, and each shape has five complete squares. The area of 1 square is equal to 1 cm2.
So, the area of each shape = 1 × 5 = 5 cm2
5. Ziri tried to make some tiles. She started with a square of 2 cm side and made shapes like the following:
Chapter 3 Image 20
Look at them carefully and find out:
(i) Which of these shapes will tile a floor (without any gaps)?
Solution:-
By observing the given figure, shape C and shape D will tile a floor without any gaps.
Either way the teacher or student will get the solution to the problem within 24 hours.