14.1 Express linear inequalities graphically and algebraically
Linear Inequalities are more like Linear Equations that have >, <, $\geq$ or $\leq$ instead of an equal sign. Say for example you have the equation x>4 then this means the solution of this inequality is any number that is more than 4. The graph on the number line would then be a line with an open circle to exclude 4 but include all points that are found beyond 4 like 4.1 or 4.01.
In graphing the solution set, we can either use an open circle which would indicate that the point is not included like in the case of the example we have earlier or a closed circle which means that the point is included if you see $\geq$ or $\leq$ in the equation.
In solving for the values of x, we are just going to treat the inequality as a linear equation. We discussed all about linear equations and how to solve them in chapters on linear relations and solving linear equations. So, it would really be useful to review the concepts we learned there. It would also be very handy to review the basic concepts we have learned on linear Relations and linear equations, in earlier grade.
This chapter has three parts and each part would focus on specific topics about Linear Equalities. In the first part, we will be looking at how to graph and express linear equalities. This is where we will get to learn how to identify the boundary points or the critical points which are basically the values of x.
In the second part of this chapter we will be learning all about solving one step linear inequalities. Again, using the concepts we learned in Grade 8 about Linear Relations and Linear Equations, we will be able to solve one step inequalities like how we solved one step linear equations.
Lastly, in the third part of this chapter we will be looking at solving multistep inequalities by applying all of the concepts we learn in solving onestep linear equations.
Express linear inequalities graphically and algebraically
Basic concepts:
 Cartesian plane
 Comparing and ordering rational numbers
Lessons

1.
Express the following inequalities algebraically.

2.
Graph each inequality on a number line.

3.
Find the possible values of $x$ on a number line.

4.
A Christmas tree must be 2 feet or taller so that the farmers will cut it down and sell it in the market.