Maths-
General
Easy
Question
Find the GCF of 16 and 14 :
- 8
- 2
- 14
- 7
The correct answer is: 2
Factors of 16 : 1,2,4,8,16
Factors or 14 : 1,2,7,14
GCF : 2
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)
Find angle x and y :
![](data:image/png;base64,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)
Maths-General
Maths-
What is the LC M of 9 and 18:
What is the LC M of 9 and 18:
Maths-General
Maths-
Find the GCF of 9 and 16 :
Find the GCF of 9 and 16 :
Maths-General
Chemistry-
The correct statement about the following disaccharide is:
I) ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/655636/1/1188918/Picture321.png)
II) ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/655636/1/1188918/Picture322.png)
The correct statement about the following disaccharide is:
I) ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/655636/1/1188918/Picture321.png)
II) ![](https://mycourses.turito.com/tokenpluginfile.php/c161933dbfaab094c54655ab71e9b8f0/1/question/questiontext/655636/1/1188918/Picture322.png)
Chemistry-General