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    Question

    What approximate value will come in place of the question mark (?) in the following question? (Note: You are not expected to calculate the exact value.)

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" alt="" />
    A 195 Correct Answer Incorrect Answer
    B 265 Correct Answer Incorrect Answer
    C 200 Correct Answer Incorrect Answer
    D 240 Correct Answer Incorrect Answer

    Solution

    ATQ, (720/12) - (?/4) ? - 240

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