2. Student Objectives
Understand the properties of inequalities
Learn how to solve singular inequality expressions
Learn how to solve absolute value inequalities
Identify how to graph inequalities on a number line
Implement the use of inequalities to real life situations
CA standards that will be met
Compare models
Graphing of functions
3. How do inequalities play into
effect in our daily lives ?
Have any of you seen this type of stop sign on your way to
or from school? What does it represent?
As our general knowledge we know that the sign
represent the hours we are able to park
We know that we can park between the hours of 9
AM and 7 PM (19 hour)
This can be represented by the inequality
9 ≤ 𝑥 ≤ 19
4. Fill in the KWL Chart before we start
lecture
What I
know:
What I
want to
learn:
What I
learned:
As a guide for our lecture let us fill
in the first two columns of our
KWL chart
You will take 5 min to fill in
anything you know about
inequalities and what you would
like to learn about inequalities
5. Key information for inequalities
An inequality makes a compares between two values.
there are four different compares that can be made and represented
1) < - represents the less than sign, and can be depicted with an open dot
2) > - represents the greater than sign, and can be depicted with an open dot
3) ≥ - represents greater than or equal to sign, and can be depicted with a closed dot
4) ≤ - represents less then or equal to, and can be depicted with a close dot
Absolute value - can be written as |a| or ±𝑎 which means that the value of a is both a
positive and negative. Where a is represented by any positive number.
If the value of a is negative the a automatically becomes a positive number since the
absolute value neutralizes the a.
6. Properties of inequalities video
As we watch the following video fill in the
boxes provided in the lecture handout
Note the 3 important properties of
inequalities.
Note the a,b, and c represent whole
numbers which are numbers that range
from any negative number to any positive
number
7. Steps in solving inequalities
1)Determine what type of inequality you have
simple comparison or an absolute value inequality
2) Solve for the specific variable. If given a comparison directly solve the equation if
given an absolute, we must show that a contains both a positive and negative number
that the inequality is set equal to. (a < x < -a)
3) When solving inequalities we must remember that whatever we do to one side we
must do to the other. (This include multiplying, adding, subtracting, and dividing)
4) Graph the inequalities based on the comparison inequality we found.
8. Example problem #1
5x -2 < 3
5x -2+2 < 3+2
5x < 5
5
5
x <
5
5
X < 1
2 -1 0 1 2 3 4
Determine that it is a regular inequality
equation
Add 2 to both sides and divide by 5 to
both sides to isolate the x variable
Obtain the new inequality x< 1
Since the inequality is a less then
inequality, we use an open circle.
Since the inequality is not bounded from
the negative side it is continuous
9. Example problem #2 solving absolute
inequalities
|4x-8|≤ 4
-4 ≤ 4x-8 ≤ 4
-4 + 8 ≤ 4x ≤ 4 + 8
4 ≤ 4x ≤ 12
4
4
≤ x ≤
12
4
1 ≤ x ≤ 3
-2 -1 0 1 2 3 4
Rewrite the problem since it has an
absolute value. We obtain both a
positive and negative value of 4
Use algebra to solve for x. We add the
8 to both side and divide by 4 to both
sides.
We obtain an inequality 1 ≤ x ≤ 3
which can be graphed
Since the inequality contains a greater
than or equal to and a less then and
equal to the graph contains closed
dots on 1 and 3.
10. Now take 10 min to apply what you learned
and solve a and b on your own
A) 5|2x-4| < 10 B) |-3x-2| > 6
11. Answers to problems A and B
A) 5|2x-4| < 10
|2x-4| < 2
-2 < 2x-4 < 2
2 < 2x < 6
1 < x < 3
-1 0 1 2 3 4 5
B) |4x-2| ≤ 6
-6≤ 4x -2 ≤ 6
-4 ≤ 4x ≤ 8
-1 ≤ x ≤ 2
-2 -1 0 1 2 3
12. Example problem 3 solving inequalities
|x+2| > 3 - 9x
-3+9x > x+2 > 3-9x
-2-3+9x > x > 3-9x -2
-5 +9x > x > 1-9x
or
-5 + 9x > x x > 1-9x
-5 > -8x 10x > 1
5
8
< x x > 1/10
-2 -1 0 1 2 3 4
Since I have an absolute value, I take the positive and
negative of the equation 3-9x.
I subtract a 2 to both sides of the inequality
Since in this case both inequalities are facing the same
direction and I still need to solve for x I create two separate
equations
I solve for x in each of the separate equations using algebra.
Now we obtain 2 answers
Since both inequalities illustrate that x is greater than
5
8
and
1
10
we need to pick the smallest value of the two since x will
always be grater then that value.
Our graph will then start at
1
10
since it is smaller than 5/8 and
will be continuous since the value of x will always be any
number greater than 1/10.
13. Example problem 4
2|x-4| ≥ 4 – 8x
|x-4| ≥ 2 -4x
-2 +4x ≥ x-4 ≥ 2-4x
2 + 4x ≥ x ≥ 6-4x
Or
2 + 4x ≥ x x ≥ 6-4x
2 ≥ -3x 5x ≥ 6
2≤3x x ≥
6
5
2
3
≤ x
-1 0 1 2 3 4
Divide both sides by 2
Set the inequalities equal to the positive
and negative version of 2-4x
Separate into 2 equations
Solve for x for the two inequalities
Graph the value of x which is continuous
from 1.5
14. Now take the time to think and answer
these questions with a partner .
How do simple inequalities differ from absolute
value inequalities?
How are we able to determine whether the graph of
the inequality will have an open or closed dot ?
In the previous problem why was the value of x
continuous between [1.5, )
15. Real world inequality problem
Karla has $30 and wants to buy cupcakes for her friend
Jade but does not want to spend more than $20.
Recently she found a bakery website that sells
cupcakes at a price of $2 for each cupcake with a fee
of $6 for delivery. How many cupcakes can she buy for
her friend without going over her spending limit?
1) Determine the important information
2)Create an inequality equation
2x+6 ≤20
2)Solve the inequality equation using algebra
2x ≤ 14
x ≤ 7
3) Interpret the information
Karla is only able to buy 7 cupcakes for her friend jade
without going over her spending limit.
16. Fill in the last column of the KWL chart
What I know: What I want to learn: What I learned:
17. Last culminating activity
After everything you have learned with a partner take the time to analyze this final
question and determine which of these two inequalities can be solved? For the one
that can be solved graph its inequality. For the one that can not be solved explain
why the inequality can not be solved.
a)|5x+8| < -3
b)2|4x-2| > 2