Mathematics
Grade10
Easy
Question
Identify the domain and range of the following relation.
![](data:image/png;base64,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)
- It is not a relation
- Domain: {Red, Apple, Grey, Panther}; Range: {Pink, Elephant}
- Domain: {Apple, Elephant, Panther}; Range: {Red, Grey, Pink}
- Domain: {Red, Grey, Pink}; Range: {Apple, Elephant, Panther}
Hint: