162k views
0 votes
How many solutions can be found for the inequality -4x -2

a.No Solution
b.One Solution
c.Infinitely Many Solutions

User DerWOK
by
8.4k points

1 Answer

4 votes

Final answer:

The inequality -4x - 2 requires additional information to determine the number of solutions. Assuming a standard inequality, such as -4x - 2 < 0, there would be infinitely many solutions, consistent with the nature of linear equations.

Step-by-step explanation:

To determine how many solutions can be found for the inequality -4x - 2, we should recognize that this is an incomplete expression. Inequalities usually compare two expressions, for example, -4x - 2 > 0 or -4x - 2 < 5. Without a comparison, we cannot find a solution set for the inequality. However, assuming you meant -4x - 2 < 0 (or a similar inequality with a comparison), the inequality would represent a linear equation once it is set to equality (-4x - 2 = 0), which would have infinitely many solutions when graphed on a number line as an inequality.

In relation to the provided Practice Test 4 Solutions for 12.1 Linear Equations, Option e states that A, B, and C are linear equations, represented as y = mx + b, which is a general form for linear equations. Examples A, B, and C would all be straight lines when graphed, with distinct slopes and y-intercepts. This relates to the nature of linear equations and inequalities which when graphed, consist of a continuous range of values forming a line, typically leading to infinitely many solutions within the constraints of the inequality.

User ZMacarozzi
by
8.5k points

No related questions found

Welcome to QAmmunity.org, where you can ask questions and receive answers from other members of our community.