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

[ 1/1Inequality]
    Assignment:Find the solution set of inequality 1－m+√(m×m－2) <2 .
    Question type: Inequality
    Solution:
    The inequality can be reduced to 1 inequality：
        1 - m + √ ( m × m - 2 ) <2         (1)
        From the definition field of √
         x × x - 2 ≥ 0        (2 )

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    From inequality(1)：
         m ∈ R (R is all real numbers),that is, in the real number range, the inequality is always established!
    From inequality(2)：
         m ≤ -√2 或  m ≥ √2

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    From inequalities (1) and (2)
         m ≤ -√2 或  m ≥ √2    (3)

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    The final solution set is :
         m ≤ -√2 或  m ≥ √2

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