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    Simplify the expression -:

    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" alt="" />
    A 49/5 Correct Answer Incorrect Answer
    B 43/7 Correct Answer Incorrect Answer
    C 54/5 Correct Answer Incorrect Answer
    D 66/7 Correct Answer Incorrect Answer

    Solution

    ATQ,

    = [{(19/12) × 3 + 10.25 + 6.5} × 6] ÷ {(26 + 58) ÷ 4} = [{(19/4) + 10.25 + 6.5} × 6] ÷ {84 ÷ 4} = [{4.75 + 10.25 + 6.5} × 6] ÷ 21 = (21.5 × 6) ÷ 21 = (129/21) = (43/7)

    Practice Next

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