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.)

    src="data:image/png;base64,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" alt="" />
    A 10 Correct Answer Incorrect Answer
    B 50 Correct Answer Incorrect Answer
    C 95 Correct Answer Incorrect Answer
    D 25 Correct Answer Incorrect Answer
    E none of these Correct Answer Incorrect Answer

    Solution

    ATQ,

    Practice Next