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History of Inequality Computation > Answer
Overview: 6 questions will be solved this time.Among them
☆6 inequalities
[ 1/6Inequality]
Assignment:Find the solution set of inequality x+3 >= 1 .
Question type: Inequality
Solution:
The inequality can be reduced to 1 inequality:
x + 3 >= 1 (1)
From inequality(1):
x ≥ -2
The final solution set is :
x ≥ -2[ 2/6Inequality]
Assignment:Find the solution set of inequality -3+x >5 .
Question type: Inequality
Solution:
The inequality can be reduced to 1 inequality:
-3 + x >5 (1)
From inequality(1):
x > 8
The final solution set is :
x > 8[ 3/6Inequality]
Assignment:Find the solution set of inequality 3x >-2 .
Question type: Inequality
Solution:
The inequality can be reduced to 1 inequality:
3 * x > -2 (1)
From inequality(1):
x > -2/3
The final solution set is :
x > -2/3[ 4/6Inequality]
Assignment:Find the solution set of inequality -2x <-3 .
Question type: Inequality
Solution:
The inequality can be reduced to 1 inequality:
-2 * x < -3 (1)
From inequality(1):
x > 3/2
The final solution set is :
x > 3/2[ 5/6Inequality]
Assignment:Find the solution set of inequality -x+1 <4 .
Question type: Inequality
Solution:
The inequality can be reduced to 1 inequality:
-x + 1 <4 (1)
From inequality(1):
x > -3
The final solution set is :
x > -3[ 6/6Inequality]
Assignment:Find the solution set of inequality -x-1 >= 0 .
Question type: Inequality
Solution:
The inequality can be reduced to 1 inequality:
-x - 1 >= 0 (1)
From inequality(1):
x ≤ -1
The final solution set is :
x ≤ -1Your problem has not been solved here? Please take a look at the hot problems !
