Linear Inequalities: Linear Inequalities
Solving through equations
You can also solve a linear inequality by
- first replacing the inequality sign with an equals sign,
- then solving the equation,
- and finally by determining the sign of the inequality on the nodes left and right of the solution of the equation.
This method works because the expressions in #x# continuously change together with #x#. This signifies that, if one of the expressions changes sign, this goes through a point in which that expression is zero.
A more precise formulation of this rule requires a notion of function and continuous, which will be dealt with later.
#x \ge \frac{3}{2}#
To see this, we first look at the equation generated by replacing the inequality sign by an equal sign: #2\cdot x-3=0#
With Solving a linear equation by reduction we see that the linear equation with unknown #x# has exactly one solution: #x=\frac{3}{2}#
We now determine the sign of the inequality #2\cdot x-3\geq 0# left of #\frac{3}{2}#, hence, for #x\lt \frac{3}{2}#. To this end we fill for #x# value #0# in. This gives #{-3}\ge 0#. This statement is not true. Another value of #x# smaller than #\frac{3}{2}# may also be used, and will give the same result. The fact that #{-3}\ge {0}# is not true, tells us that for #x\lt{\frac{3}{2}}# inequality #2\cdot x-3\geq 0# is not true.
Inequality #2\cdot x-3\geq 0# is true for #x \gt{\frac{3}{2}}#: if we use #x=2#, then we get #1\geq 0#, which is true.
Because equality is a special case of inequality, #x=\frac{3}{2}# is a solution. Therefore we find the solution to the inequality: #x \ge {\frac{3}{2}}#
Below is a piece of the numbers line. The points #x# where the inequality is true, shown in red. The words no and yes indicate whether the equality holds for #x=0# and #x=2#.
To see this, we first look at the equation generated by replacing the inequality sign by an equal sign: #2\cdot x-3=0#
With Solving a linear equation by reduction we see that the linear equation with unknown #x# has exactly one solution: #x=\frac{3}{2}#
We now determine the sign of the inequality #2\cdot x-3\geq 0# left of #\frac{3}{2}#, hence, for #x\lt \frac{3}{2}#. To this end we fill for #x# value #0# in. This gives #{-3}\ge 0#. This statement is not true. Another value of #x# smaller than #\frac{3}{2}# may also be used, and will give the same result. The fact that #{-3}\ge {0}# is not true, tells us that for #x\lt{\frac{3}{2}}# inequality #2\cdot x-3\geq 0# is not true.
Inequality #2\cdot x-3\geq 0# is true for #x \gt{\frac{3}{2}}#: if we use #x=2#, then we get #1\geq 0#, which is true.
Because equality is a special case of inequality, #x=\frac{3}{2}# is a solution. Therefore we find the solution to the inequality: #x \ge {\frac{3}{2}}#
Below is a piece of the numbers line. The points #x# where the inequality is true, shown in red. The words no and yes indicate whether the equality holds for #x=0# and #x=2#.
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