New Enroll for RBI, PFRDA & NABARD Intro Class! April 18 at 9:15 PM

    Question

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" alt="" />
    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.

    Practice Next

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