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

[ 1/1Inequality]
    Assignment:Find the solution set of inequality 1833.03*（2.36+n)+267.21n+6.246n^2+128055*(12.7-1.5)+565.66*(12.7-5.5)-1.25*(747.78*(3.86+n)+((445.95n+22.01n^2)/(676.92+66.03n))*(112.82n+11n^2) ) ≥0 .
    Question type: Inequality
    Solution:
    The inequality can be reduced to 1 inequality：
        1833.03 * ( 2.36 + n ) + 267.21 * n + 6.246 * n ^ 2 + 128055 * ( 12.7 - 1.5 ) + 565.66 * ( 12.7 - 5.5 ) - 1.25 * ( 747.78 * ( 3.86 + n ) + ( ( 445.95 * n + 22.01 * n ^ 2 ) / ( 676.92 + 66.03 * n ) ) * ( 112.82 * n + 11 * n ^ 2 ) ) ≥0         (1)
        From the definition field of divisor
         676.92 + 66.03 * x ≠ 0        (2 )

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    From inequality(1)：
         n ≤ 63.34802
    From inequality(2)：
         n < -10.251704 或  n ＞ -10.251704

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    From inequalities (1) and (2)
         n < -10.251704 或  -10.251704 < n ≤ 63.34802     (3)

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    The final solution set is :
         n < -10.251704 或  -10.251704 < n ≤ 63.34802

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