Let and . If , then
is:
- A
- B
- C
- D
Let and . If , then
is:
Correct answer:D
Standard Method
Given:
Find:
For points in , either or , and they must satisfy both set conditions.
If , then from set :
From set :
Hence,
So the possible points are and .
If , then from set :
From set :
Hence,
So the possible points are and .
Therefore,
Now compute the required sum:
Thus,
Therefore, the correct option is D, and the required sum is .
Boundary Observation
Given: the points must satisfy both and , with or .
Find: the total of over all such points.
On the coordinate axes, the condition or reduces the diamond
to the axis endpoints only when combined with
Because on the axes, becomes either or . So both conditions together force equality:
Hence the only points are the four axis intercepts:
Each contributes
So the total is
Therefore, the correct option is D.
Taking all points on the axes inside instead of only the endpoints. This is wrong because set also requires . On the axes, that additional condition forces or .
Missing the intersection requirement . Checking only set or only set gives too many points. Always apply both inequalities simultaneously before listing the elements of .
Forgetting that is a finite set of points, not line segments. Because of the equalities forced by the two absolute value conditions, only four discrete points remain. Sum over those points only.
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