Answer:
The only choice which is simultaneously true where the value of c = -1/5 and d =11 .
Therefore,
Step-by-step explanation:
From the diagram, it is clear that
'c' is the set of rational numbers, and we know that a rational number is a number that can be expressed in the form of [tex]\frac{p}{q}[/tex]. Where p and q are integers and q≠0.
Also from the diagram, it is clear that
'd' consists of whole number, positive integers and zero.
So, from the given options, the only choice which is simultaneously true where the value of c = -1/5 and d = 11.
The remaining options can not be true!
- As the option c = 4.2, d = -12 can not be true because 'd' belongs to the set of whole number and therefore d can not be negative.
- Similarly, the option c =5, and d = -8/4 can not be true as 'd' is is the set of whole number and d = -8/4 is not in the set of whole number.
- And similarly, in the end, the option c = 7 and d = -5/4 can not be true as 'd' is the set of whole number and d = -5/4 is not in the set of whole number.
Therefore, from the given options, the only choice which is simultaneously true where the value of c = -1/5 and d =11 .
Therefore,
