Consider for continuity. Find .
- A
- B
Infinitely many
- C
- D
Consider for continuity. Find .
Infinitely many
Correct answer:D
Standard Method
Given: The function is defined using the expressions and , and continuity is required.
Find: , the number of ordered pairs in the set .
From the extracted solution, solving the continuity condition at gives the unique solution
Hence the set contains exactly one element.
Therefore, the correct option is D and .
Treating continuity at only one point as giving multiple valid pairs. This is wrong because the extracted solution states that the continuity condition leads to a unique pair . Always use the continuity equations to determine whether the solution is unique or not.
Ignoring the modulus expression while analysing continuity. This is wrong because modulus-based expressions can change form at the zeros of the quadratic. Check the critical points before concluding the number of valid parameter pairs.
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