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" 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    A 3 Correct Answer Incorrect Answer
    B 4 Correct Answer Incorrect Answer
    C 1 Correct Answer Incorrect Answer
    D 2 Correct Answer Incorrect Answer

    Solution

    ATQ,

    Thus, the expression simplifies to = 3/3 =1 Hence, none of the provided options match the correct value.

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