Overview: 1 questions will be solved this time.Among them
           ☆1 inequalities

[ 1/1Inequality]
    Assignment:Find the solution set of inequality 1/(1+x^(1/6)) <= lnx/sqrt(x) .
    Question type: Inequality
    Solution:
    The inequality can be reduced to 1 inequality：
        1 / ( 1 + x ^ ( 1 / 6 ) ) <= ln x / sqrt ( x )         (1)
        From the definition field of divisor
         1 + x ^ ( 1 / 6 ) ≠ 0        (2 )
        From the definition field of ln
        x > 0        (3 )
        From the definition field of √
         x ≥ 0        (4 )

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    From inequality(1)：
         x ≥ 1.927566
    From inequality(2)：
         x ∈ R （R为全体实数），即在实数范围内，不等式恒成立！
    From inequality(3)：
         x ＞ 0
    From inequality(4)：
         x ≥ 0

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    From inequalities (1) and (2)
         x ≥ 1.927566    (5)
    From inequalities (3) and (5)
         x ≥ 1.927566    (6)
    From inequalities (4) and (6)
         x ≥ 1.927566    (7)

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    The final solution set is :
         x ≥ 1.927566

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