Final answer:
After analyzing Jada's data (14, 49, 77, 21, 7, 84), it is evident that the correct statement is Option C, which states that all the numbers are multiples of 7.
Step-by-step explanation:
The question deals with identifying a common mathematical property among a list of numbers. In this case, the student has provided a list of the numbers 14, 49, 77, 21, 7, and 84, and we are asked to determine whether all of these numbers are multiples of 2, 3, 7, or 9.
Reflection on the properties of these numbers reveals that:
- Option A is false because numbers such as 7 and 21 are not multiples of 2 (as they are odd numbers).
- Option B is false because not all of the numbers are divisible by 3 without a remainder (e.g., 14 and 77 are not).
- Option C is true because every number in the list can be divided by 7 without leaving a remainder. For example, 14 divided by 7 equals 2, and 84 divided by 7 equals 12.
- Option D is false because numbers like 14 and 21 are not multiples of 9.
Therefore, the accurate statement about Jada's data is that all of the numbers are multiples of 7.