The sum of all values of satisfying and is:
- A
- B
- C
- D
The sum of all values of satisfying and is:
Correct answer:C
Standard Method
Given: We need the sum of all values of satisfying both and .
Find: The sum of all common values of in the given interval.
Using in the first equation,
so,
which gives
and hence
Therefore, from the first equation,
Now use in the second equation:
so,
Rearranging,
Let . Then
Solving,
Thus,
Since cannot be , we get
Therefore, the common solutions are
Their sum is
Therefore, the sum of all solutions is . The correct option is C.
Intersect the sine values directly
Given: Both equations must be satisfied simultaneously.
Find: The common values of .
From the first equation,
which gives
From the second equation, substituting gives a quadratic in :
This factors to admissible value , since the other value is not possible for sine.
So the common condition is immediately
Hence in ,
and the sum is . The correct option is C.
Taking solutions of the first equation alone and forgetting that both equations must be satisfied simultaneously. This is wrong because the required values are the intersection of the two solution sets. Always solve both equations and keep only the common values of .
Accepting from the quadratic obtained in the second equation. This is wrong because must lie in the interval . Always check whether algebraic roots are admissible for trigonometric functions.
Missing the negative branch when solving and writing only . This is wrong because squaring hides sign information. After taking square roots, include both and before applying the second equation.
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