Mathematics
Grade-4-
Easy
Question
What shape comes next?
![](data:image/png;base64,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)
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/answer/888077/1/4675171/Picture54.png)
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/answer/888077/1/4675172/Picture56.png)
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/answer/888077/1/4675173/Picture59.png)
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/answer/888077/1/4675174/Picture60.png)
Hint:
We are given a repeating pattern of two shapes. The two shapes are smiley face and a heart. The rule to write shapes is “Smiley face and heart”. We are asked to find the next shape.
The correct answer is: ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/answer/888077/1/4675171/Picture54.png)
The given pattern In words is Smiley face, heart, Smiley face, heart, Smiley face, heart, Smiley face, heart,
We are asked to find the next shape.
The rule used to write the pattern is “ Smiley face and heart.”
Two shapes are repeating.
The last shape is a heart. And according to the rule, the shape that will come after a heart is a Smiley face.
Therefore, the next shape is a Smiley face.
![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/generalfeedback/888077/1/1207593/Picture61.png)
While solving such questions, we should be careful about the order of the shapes.