Substitute the values of the variables into the inequality. If the inequality is true then they are a solution, if not, they are not.
Substitute the values of the variables into the inequality. If the inequality is true then they are a solution, if not, they are not.
Substitute the values of the variables into the inequality. If the inequality is true then they are a solution, if not, they are not.
Substitute the values of the variables into the inequality. If the inequality is true then they are a solution, if not, they are not.
Substitute the values of the variables into the inequality. If the inequality is true then they are a solution, if not, they are not.
2 is a solution of the equation, but not if it's an inequality.
any number that makes the inequality true
The answer, which may not even exist, depends on the inequality. There is, for example, no greatest solution for x > 5.
x>-9
Substitute the number in place of the variable, and see whether the inequality is then a true statement.
That will all depend on what the question was!
Solve the inequality and enter your solution as an inequality comparing the variable to the solution. -33+x<-33
4
There is no inequality in the question.
"x281" is an expression, not an inequality. An inequality is supposed to have an inequality sign, such as "<" or ">".
The solution to an inequality generally is a region with one more dimension. If the inequality/equation is of the form x < a or x = a then the solution to the inequality is the 1 dimensional line segment while the solution to the equality is a point which has no dimensions. If the inequality/equation is in 2 dimensions, the solution to the inequality is an area whereas the solution to the equality is a 1-d line or curve. And so on, in higher dimensional spaces.
solution
You didn't show an inequality.
5x20 is not an inequality, it is an expression.
we should prevent inequality by
Before I can even take a guess on a solution, you'll have to let me peek at the inequality.
That is not an inequality. An inequality must have <, >, <=, >=.