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History of Inequality Computation > Answer
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☆1 inequalities
[ 1/1Inequality]
Assignment:Find the solution set of inequality 1 <2 <3 <4 <5 <5 >4 >3 >2 >1 .
Question type: Inequality
Solution:
The inequality can be reduced to 9 inequalities:
1 <2 (1)
2 <3 (2)
3 <4 (3)
4 <5 (4)
5 <5 (5)
5 >4 (6)
4 >3 (7)
3 >2 (8)
2 >1 (9)
From inequality(1):
∈ R (R is all real numbers),that is, in the real number range, the inequality is always established!
From inequality(2):
∈ R (R is all real numbers),that is, in the real number range, the inequality is always established!
From inequality(3):
∈ R (R is all real numbers),that is, in the real number range, the inequality is always established!
From inequality(4):
∈ R (R is all real numbers),that is, in the real number range, the inequality is always established!
From inequality(5):
The solution set is empty, that is, within the range of real numbers, the inequality will never be established!
From inequality(6):
∈ R (R is all real numbers),that is, in the real number range, the inequality is always established!
From inequality(7):
∈ R (R is all real numbers),that is, in the real number range, the inequality is always established!
From inequality(8):
∈ R (R is all real numbers),that is, in the real number range, the inequality is always established!
From inequality(9):
∈ R (R is all real numbers),that is, in the real number range, the inequality is always established!
The final solution set is :
The solution set is empty,that is, the inequality will never be estatlished within the real number range.
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