Question

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" alt="" /> 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.) 
    A 95 Correct Answer Incorrect Answer
    B 110 Correct Answer Incorrect Answer
    C 140 Correct Answer Incorrect Answer
    D 166 Correct Answer Incorrect Answer
    E None of these Correct Answer Incorrect Answer

    Solution

    ATQ,

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