Writing, Graphing and Solving Inequalities
Selected Reading
- Solving a Word Problem Using a One-Step Linear Inequality
- Solving a Two-Step Linear Inequality with Whole Numbers
- Multiplicative Property of Inequality with Whole Numbers
- Additive Property of Inequality with Whole Numbers
- Identifying Solutions to a One-Step Linear Inequality
- Writing an Inequality Given a Graph on the Number Line
- Graphing a Linear Inequality on the Number Line
- Writing an Inequality for a Real-World Situation
- Introduction to Identifying Solutions to an Inequality
- Translating a Sentence into a One-Step Inequality
- Translating a Sentence by Using an Inequality Symbol
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Identifying Solutions to a One-Step Linear Inequality
Identifying Solutions to a One-Step Linear Inequapty
In this lesson, we learn to identify if certain numbers are the solutions to a one-step pnear inequapty. We plug these numbers one by one and see if the inequapty is true. Those numbers for which the one-step inequapty is true are identified as solutions to that inequapty.
To find solutions to one-step pnear inequapties, knowledge of the properties of inequapty pke the additive and multippcative property of inequapty is necessary.
Identify the correct solution to the following one-step pnear inequapty
x + 8 > 14
A) 5
B) 6
C) 4
D) 7
Solution
Step 1:
x + 8 > 14; x > 14 − 8; x > 6
Plugging in 5, we get 5 > 6; wrong
Plugging in 6, we get 6 > 6; wrong
Plugging in 4, we get 4 > 6; wrong
Plugging in 7, we get 7 > 6; correct
Step 2:
So, the correct solution is 7
Identify the correct solution to the following one-step pnear inequapty
3x ≤ 12
A) 7
B) 6
C) 5
D) 3
Solution
Step 1:
3x ≤ 12
Plugging in 7, we get 3×7 ≤ 12; 21≤12; wrong
Plugging in 6, we get 3×6 ≤ 12; 18≤12; wrong
Plugging in 5, we get 3×5 ≤ 12; 15≤12; wrong
Plugging in 3, we get 3×3 ≤ 12; 9≤12; correct
Step 2:
So, the correct solution is 3