Answer :
Final answer:
In an Arithmetic Progression, the 7th term from the end in a sequence of three-digit numbers divisible by 7 is determined by identifying the pattern and applying the common difference. The correct value is 634.
Explanation:
Arithmetic Progression (AP) refers to a sequence where each term is obtained by adding a fixed number known as the common difference to the preceding term. In this case, given an AP with the common difference of 7 and a constraint that the terms are divisible by 7, we can determine the value of the 7th term from the end.
To find the 7th term from the end, we need to identify the pattern of the AP. Since the AP consists of three-digit numbers divisible by 7, we can list out the terms and determine the 7th term from the end that satisfies these conditions. The correct answer is 634.
By following the rules of the AP and considering the divisibility constraint, we can arrive at the precise solution of 634 as the 7th term from the end in the given arithmetic progression.