Let represent a parabola with focus and directrix .
Then contains:
- A
Exactly two elements
- B
Exactly one element
- C
An infinite set
- D
An empty set
Let represent a parabola with focus and directrix .
Then contains:
Exactly two elements
Exactly one element
An infinite set
An empty set
Correct answer:C
Standard Method
Given: The parabola has focus and directrix .
Find: How many elements the set contains.
From the extracted solution, the parabola is written as
so
Thus .
Now the given condition becomes
the solution then uses the domain conditions
which gives
Also, for to be defined,
Combining both,
Therefore,
Hence, the set contains exactly two elements.
Note: The solution concludes with two elements, but the solution's also marks the correct option as C, which conflicts with the listed options. Based on the worked solution, the correct statement is Exactly two elements.
Working Shown on the Page
Given: Focus and directrix .
Find: The number of elements in .
The page shows:
Hence,
Now substitute in the set condition. The page rewrites the condition and imposes:
So,
Also,
Therefore,
Factoring,
Thus,
So contains elements, corresponding to option A among the listed options.
Treating as possible for a finite real without checking the solution's intended domain restrictions. Follow the working shown on the page and use the imposed conditions carefully.
Finding the parabola equation incorrectly from the focus and directrix. The extracted solution gives , so using any other parabola changes the entire set .
Using only and forgetting the square-root condition . Both must hold simultaneously, which forces equality.
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