Mathematics
Grade-2
Easy
Question
Prepare a table for the given data.
![](data:image/png;base64,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)
Classes
No. of girls
Class 5
30
Class 6
35
Class 7
20
Class 8
25
Class 9
40
Classes
No. of girls
Class 5
35
Class 6
30
Class 7
20
Class 8
25
Class 9
40
Classes
No. of girls
Class 5
10
Class 6
5
Class 7
40
Class 8
35
Class 9
60
Classes
No. of girls
Class 5
20
Class 6
55
Class 7
20
Class 8
15
Class 9
45
Classes |
No. of girls |
Class 5 |
30 |
Class 6 |
35 |
Class 7 |
20 |
Class 8 |
25 |
Class 9 |
40 |
Classes |
No. of girls |
Class 5 |
35 |
Class 6 |
30 |
Class 7 |
20 |
Class 8 |
25 |
Class 9 |
40 |
Classes |
No. of girls |
Class 5 |
10 |
Class 6 |
5 |
Class 7 |
40 |
Class 8 |
35 |
Class 9 |
60 |
Classes |
No. of girls |
Class 5 |
20 |
Class 6 |
55 |
Class 7 |
20 |
Class 8 |
15 |
Class 9 |
45 |
The correct answer is:
Classes
No. of girls
Class 5
30
Class 6
35
Class 7
20
Class 8
25
Class 9
40
Classes
Class 5
30
Class 6
35
Class 7
20
Class 8
25
Class 9
40
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)
From, the above figure x axis shows the classes and y axis shows number of girls in class.
Thus, the following table correctly depicts the graph.
Classes
No. of girls
Class 5
30
Class 6
35
Class 7
20
Class 8
25
Class 9
40
Classes
Class 5
30
Class 6
35
Class 7
20
Class 8
25
Class 9
40