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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 3(x+2)-8 >1-2(x-1) .
Question type: Inequality
Solution:
The inequality can be reduced to 1 inequality:
3 * ( x + 2 ) - 8 >1 - 2 * ( x - 1 ) (1)
From inequality(1):
x > 1
The final solution set is :
x > 1[ 2/6Inequality]
Assignment:Find the solution set of inequality 3x-1 >2x+1 .
Question type: Inequality
Solution:
The inequality can be reduced to 1 inequality:
3 * x - 1 >2 * x + 1 (1)
From inequality(1):
x > 2
The final solution set is :
x > 2[ 3/6Inequality]
Assignment:Find the solution set of inequality 2-5x >8-2x .
Question type: Inequality
Solution:
The inequality can be reduced to 1 inequality:
2 - 5 * x >8 - 2 * x (1)
From inequality(1):
x < -2
The final solution set is :
x < -2[ 4/6Inequality]
Assignment:Find the solution set of inequality 4(3x-1) <5(2x+1) .
Question type: Inequality
Solution:
The inequality can be reduced to 1 inequality:
4 * ( 3 * x - 1 ) <5 * ( 2 * x + 1 ) (1)
From inequality(1):
x < 9/2
The final solution set is :
x < 9/2[ 5/6Inequality]
Assignment:Find the solution set of inequality 2x+3 >6-x .
Question type: Inequality
Solution:
The inequality can be reduced to 1 inequality:
2 * x + 3 >6 - x (1)
From inequality(1):
x > 1
The final solution set is :
x > 1[ 6/6Inequality]
Assignment:Find the solution set of inequality -3(x-1) >(x+4)-1 .
Question type: Inequality
Solution:
The inequality can be reduced to 1 inequality:
-3 * ( x - 1 ) > ( x + 4 ) - 1 (1)
From inequality(1):
x < 0
The final solution set is :
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