The number of critical points of is:
- A
- B
- C
- D
The number of critical points of is:
Correct answer:A
Standard Method
Given:
Find: The number of critical points of .
A critical point occurs where or where is undefined.
Using the product rule for and ,
where
So,
Taking the common factor ,
Now simplify the bracket:
Hence,
Now find critical points:
because appears in the denominator.
Therefore, the function has two critical points, at and . Hence, the correct option is A.
Direct Simplification
Given:
Find: Number of critical points.
After differentiating once and combining terms quickly,
So the derivative is zero at
and undefined at
Both belong to the domain of , so both are critical points.
Therefore, the number of critical points is , so the correct option is A.
Ignoring points where is undefined. A critical point can occur even when the derivative does not exist, provided the function itself is defined there. So check separately.
Setting only the numerator equal to zero without first identifying domain restrictions of the derivative. This misses the critical point arising from the denominator at .
Differentiating incorrectly. The correct derivative is , not .
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