(Solving Problems Involving Linear Inequalities in Two Variables)
1. (Solving Problems Involving Linear Inequalities in Two Variables)
Answer:
(Solving Problems Involving Linear Inequalities in Two Variables)
2. Solving Problems Involving Linear Inequalities in Two Variables
Answer:
thank you for the points
3. solving problems involving linear inequalities in two variables
The graph of an inequality in two variables is the set of points that represents all solutions to the inequality. A linear inequality divides the coordinate plane into two halves by a boundary line where one half represents the solutions of the inequality. The boundary line is dashed for > and < and solid for ≤ and ≥.
4. Solving problems involving system of linear inequalities in two variables
How do you solve linear inequalities with two variables?
To graph the solution set of an inequality with two variables, first graph the boundary with a dashed or solid line depending on the inequality. If given a strict inequality, use a dashed line for the boundary. If given an inclusive inequality, use a solid line. Next, choose a test point not on the boundary.
How do you solve systems of linear inequalities in two variables by graphing?Graphing Systems of Linear Inequalities
1. To graph a linear inequality in two variables (say, x and y ), first get y alone on one side.
2. If the inequality is strict ( < or > ), graph a dashed line.
3. Finally, pick one point that is not on either line ( (0,0) is usually the easiest) and decide whether these coordinates satisfy the inequality or not.
5. How do you solve word problems involving Linear Inequalities in Two Variables?
Answer:
Here you go
Step-by-step explanation:
You need to answer the problem first, because you won't solve it without the answer if you just write the words
6. Formulate and solve accurately real-life problems involving linear inequalities in two variables, systems of linear inequalities in two variables, and linear Functions,
Answer:
A system of linear inequalities is often used to determine the best solution to a problem.This solution could be as simple as determining how many product should be produced to Maximize a profit or as complicated as the determining the correct combination of drugs to give a patient.
Step-by-step explanation:
correct me if am wrong୧(^ 〰 ^)୨
7. solving problems involving systems of linear inequalities in two variables
Answer:
NASA PICTURE POH
Step-by-step explanation:
GÓOD MORNING
Answer:
nasa picture po yung 1
Solving Systems of Linear Inequalities
Solutions to a system of linear inequalities are the ordered pairs that solve all the inequalities in the system. Therefore, to solve these systems, graph the solution sets of the inequalities on the same set of axes and determine where they intersect. This intersection, or overlap, defines the region of common ordered pair solutions.
Example 1: Graph the solution set: .
Solution: To facilitate the graphing process, we first solve for y.
For the first inequality, we use a dashed boundary defined by and shade all points above the line. For the second inequality, we use a solid boundary defined by and shade all points below. The intersection is darkened.

Now we present the solution with only the intersection shaded.
Answer:

Example 2: Graph the solution set: .
Solution: Begin by solving both inequalities for y.

Use a dashed line for each boundary. For the first inequality, shade all points above the boundary. For the second inequality, shade all points below the boundary.
As you can see, there is no intersection of these two shaded regions. Therefore, there are no simultaneous solutions.
Answer: No solution,
Example 3: Graph the solution set: .
Solution: The intersection of all the shaded regions forms the triangular region as pictured darkened below:

After graphing all three inequalities on the same set of axes, we determine that the intersection lies in the triangular region pictured.
Answer:

The graphic suggests that (−1, 1) is a common point. As a check, substitute that point into the inequalities and verify that it solves all three conditions.
8. How did you solve problems that involve system of linear inequalities in two variable
Answer:
nasa picture na yung procedure nagtatype lang ako ng kung ano ano kasi di pwedeng mag answer ng walang nakatype na sagot
9. what are the steps in solving problems involving linear inequalities in two variables?plz pa help
Step 1 Eliminate fractions by multiplying all terms by the least common denominator of all fractions.
Step 2 Simplify by combining like terms on each side of the inequality.
Step 3 Add or subtract quantities to obtain the unknown on one side and the numbers on the other.
Step 4 Divide each term of the inequality by the coefficient of the unknown. If the coefficient is positive, the inequality will remain the same. If the coefficient is negative, the inequality will be reversed.
Step 5 Check your answer.
god b)ess!
10. solving word problems involving linear inequalities in two variables
Answer:
AYAN SANA MAKATULONG!!
MAKE ME AS BRAINELEST
11. solving problems involving linear inequality in two variablesplssssss po pasagot
Answer:
nakalimotan ko ang sagot jan pasinsyana
12. Arange the following steps to solve the word problems involving systems of linear inequalities in two variables chronologically
Answer:
1.E
2.C
3.D
4.B
ok bye! jsbshsa
13. 3. How did you solve problems that involve systems of linear inequalitiesin two variables?
Answer:
The solution of a linear inequality in two variables, like Ax + By > C, is an ordered pair (x, y) that produces a true statement when the values of x and y are substituted into the inequality. Solving linear inequalities is the same as solving linear equations; the difference it holds is of inequality symbol.
14. how did you solve problems that involves system of linear inequalities in two variables
Answer:
The solution of a linear inequality in two variables, like Ax + By > C, is an ordered pair (x, y) that produces a true statement when the values of x and y are substituted into the inequality. Solving linear inequalities is the same as solving linear equations; the difference it holds is of inequality symbol.
15. how to solve word problems involving linear inequalities in two variables
Answer:
Read the text carefully and analyze which are the given. Locate words that imply that it is an inequality (less than/greater than etc...). Illustrate the problem.
16. Solve problems involving linear inequalities in two variables (M8AL-lla-4).
Answer: 62.5 yan sagot ko
17. how to solve problems involving linear inequalities in two variables?
Answer:
To graph the solution set of an inequality with two variables, first graph the boundary with a dashed or solid line depending on the inequality. If given a strict inequality, use a dashed line for the boundary. If given an inclusive inequality, use a solid line. Next, choose a test point not on the boundary.
sana maka tulong this to u :)
18. solving word problems involving linear inequalities in two variables
Answer:
SANA MAKATULONG !!
#CARINGLEARNING
19. Solving Problems Involving Linear Inequalities in Two Variables
Step-by-step explanation:
x = hours as online tutor
y = hours as editor
150x + 200y = 2,400(Equation 1)
x + y = 15(Equation 2)
Solution 1: Substitution
150x + 200y = 2,400
x + y = 15
Turn equation 2 into x = 15 - y
Substitute it to the 1st equation.
150x + 200y = 2,400
150(15-y) + 200y = 2,400
2,250 - 150y + 200y = 2,400
50y = 150
y = 3
Substitute y to the 2nd equation.
x + y = 15
x + 3 = 15
x = 12
Solution 2: Elimination
150x + 200y = 2,400
x + y = 15
Multiply the 2nd equation by - 200
150x + 200y = 2,400
-150(x+y) = 15(-150)
50y = 150
y = 3
Substitute to any equation. In this case, I'll substitute it to the 2nd equation.
x + y = 15
x + 3 = 15
x = 12
Solution 3: Graphing
I can't give it, because I can't graph in Brainly. Sorry
Although to find it find the zeroes of both the connect the points. Using your graphing notebook, just plot this.
150x + 200y = 2,400
200y = 2,400
y = 12
150x = 2,400
x = 16
For the 1st line of the graph, connect these points. (0,12) and (16, 0)
x + y = 15
x = 15
y = 15
For the 2nd line of the graph, connect these points. (0,15) and (15,0) I find the points by finding their zeroes. After that, find the point of intersection, then viola!
Pa-brainliest din sana. Hehe
20. a. How can you solve problems involving linear inequalities in two variables?
Answer:
︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎
Step-by-step explanation:
︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎ ︎
21. what are the steps in solving word problem involving system of linear inequality in two variables by graphing
Answer:
Step 1: Solve the inequality for y. ...
Step 2: Graph the boundary line for the inequality. ...
Step 3: Shade the region that satisfies the inequality. ...
Step 4: Solve the second inequality for y. ...
Step 5: Graph the boundary line for the second inequality. ...
Step 6: Shade the region that satisfies the second inequality.
Answer:
sorry kaylangan Ng points
22. simple procedure on how you solve problem involving of system of linear inequalities in two variables
Step-by-step explanation:
Step 1: Solve the inequality for y. ...
Step 2: Graph the boundary line for the inequality. ...
Step 3: Shade the region that satisfies the inequality. ...
Step 4: Solve the second inequality for y. ...
Step 5: Graph the boundary line for the second inequality. ...
Step 6: Shade the region that satisfies the second inequality.
23. Solving problem involving system of linear inequalities in two variables
answer: A system of linear inequalities in two variables consists of at least two linear inequalities in the same variables. The solution of a linear inequality is the ordered pair that is a solution to all inequalities in the system and the graph of the linear inequality is the graph of all solutions of the system.
24. how to solved word problems involving linear inequalities in two variables?
Answer:
YAN SANA MAKATULONG !!
MAKE ME AS BRAINELEST
25. *Solving Problems Involving Linear Inequalities in Two Variables*TY
Answer:
thank you for the points
26. How to solve word problems involving linear inequalities in two variables?
Step-by-step explanation:
this is my answer, I forgot to copy the text, you have rhe same question with the lerson I answered to
27. saq-1:How do you illustrate and graph linear inequalities in two variables? saq-2:How do you solve problems involving linear inequalities in two variables?
When solving a system of linear inequalities graphically we will follow these steps:
1. Solve the inequality for y.
2. Treat the inequality as a linear equation and graph the line as either a solid line or a
dashed line depending on the inequality sign.
a. If the inequality sign does not contain an equals sign (< or >) then draw the line as
a dashed line.
b. If the inequality sign does have an equals sign (≤ or ≥) then draw the line as a
solid line.
3. Shade the region that satisfies the inequality
4. Repeat steps 1 – 3 for each inequality
5. The solution set will be the overlapped region of all the inequalities .
28. Solving Problems Involving System of Linear Inequalities in Two Variables Thank you po :)
Answer:
sayang tamad ako magsolve ngayun
let x=number of hours work as tutor.
let y=number of hours work as editor.
2400>150x+200y
Answer:
Step-by-step explanation:
29. how to solve word problem involving linear inequalities bin two variables.
draw a straight line with the equal sign, and then determined the specific range according to the unequal sign.#Carry on learning
30. How to solve word problems involving linear inequalities in two variables?
Answer:
1. Read the problem and highlight important information.
2. Identify the variables.
3. Find one piece of information in the problem that you can use to write an inequality.
4. Find a different piece of information that you can use to write a second inequality.
5. Graph both inequalities on a grid. Make sure you use appropriate boundary lines and shade the correct half plane for each inequality.
6. Identify the intersection of the two inequalities and answer the questions that pertain to the problem.
Step-by-step explanation:
thankyou