To solve for m, we need to isolate m on one side of the inequality.
Starting with the given inequality: -12 ≥ 4m
We can start by dividing both sides of the inequality by 4 to isolate m:
-12/4 ≥ 4m/4
Simplifying the expression on each side:
-3 ≥ m
So the solution for m is m ≤ -3.
Solve for m. – 12≥4m
11 answers
Solve for p. p–17.69≤2.31
To solve for p, we need to isolate p on one side of the inequality.
Starting with the given inequality: p - 17.69 ≤ 2.31
We can begin by adding 17.69 to both sides of the inequality to isolate p:
p - 17.69 + 17.69 ≤ 2.31 + 17.69
Simplifying the expression on each side:
p ≤ 20
So the solution for p is p ≤ 20.
Starting with the given inequality: p - 17.69 ≤ 2.31
We can begin by adding 17.69 to both sides of the inequality to isolate p:
p - 17.69 + 17.69 ≤ 2.31 + 17.69
Simplifying the expression on each side:
p ≤ 20
So the solution for p is p ≤ 20.
Solve for p. 1.25p≤1.65
To solve for p, we need to isolate p on one side of the inequality.
Starting with the given inequality: 1.25p ≤ 1.65
We can begin by dividing both sides of the inequality by 1.25 to isolate p:
(1.25p) / 1.25 ≤ (1.65) / 1.25
Simplifying the expression on each side:
p ≤ 1.32
So the solution for p is p ≤ 1.32.
Starting with the given inequality: 1.25p ≤ 1.65
We can begin by dividing both sides of the inequality by 1.25 to isolate p:
(1.25p) / 1.25 ≤ (1.65) / 1.25
Simplifying the expression on each side:
p ≤ 1.32
So the solution for p is p ≤ 1.32.
Solve the inequality and graph the solution. 2a+7>5
To solve the inequality 2a + 7 > 5, we will first isolate the variable a.
Subtracting 7 from both sides of the inequality, we have:
2a > 5 - 7
2a > -2
Next, divide both sides of the inequality by 2 to isolate a:
a > -2/2
a > -1
The solution to the inequality is a > -1.
Graphing this solution on a number line, we represent all values of a greater than -1. We use an open circle to indicate that -1 is not included in the solution, and we shade the line to the right to show that any value greater than -1 is included.
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-1
Subtracting 7 from both sides of the inequality, we have:
2a > 5 - 7
2a > -2
Next, divide both sides of the inequality by 2 to isolate a:
a > -2/2
a > -1
The solution to the inequality is a > -1.
Graphing this solution on a number line, we represent all values of a greater than -1. We use an open circle to indicate that -1 is not included in the solution, and we shade the line to the right to show that any value greater than -1 is included.
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-1
Solve the inequality and graph the solution. – 1+2t≤5
To solve the inequality -1 + 2t ≤ 5, we will isolate the variable t.
First, add 1 to both sides of the inequality:
-1 + 2t + 1 ≤ 5 + 1
Simplifying, we have:
2t ≤ 6
Next, divide both sides of the inequality by 2 to isolate t:
2t/2 ≤ 6/2
Simplifying further, we get:
t ≤ 3
The solution to the inequality is t ≤ 3.
Graphing this solution on a number line, we represent all values of t that are less than or equal to 3. We use a closed circle to indicate that 3 is included in the solution, and we shade the line to the left to show that any value less than or equal to 3 is included.
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3
First, add 1 to both sides of the inequality:
-1 + 2t + 1 ≤ 5 + 1
Simplifying, we have:
2t ≤ 6
Next, divide both sides of the inequality by 2 to isolate t:
2t/2 ≤ 6/2
Simplifying further, we get:
t ≤ 3
The solution to the inequality is t ≤ 3.
Graphing this solution on a number line, we represent all values of t that are less than or equal to 3. We use a closed circle to indicate that 3 is included in the solution, and we shade the line to the left to show that any value less than or equal to 3 is included.
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3
Solve the inequality and graph the solution. 6+4j>2
To solve the inequality 6 + 4j > 2, we will isolate the variable j.
First, subtract 6 from both sides of the inequality:
6 + 4j - 6 > 2 - 6
Simplifying, we have:
4j > -4
Next, divide both sides of the inequality by 4 to isolate j:
4j/4 > -4/4
Simplifying further, we get:
j > -1
The solution to the inequality is j > -1.
Graphing this solution on a number line, we represent all values of j greater than -1. We use an open circle to indicate that -1 is not included in the solution, and we shade the line to the right to show that any value greater than -1 is included.
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-1
First, subtract 6 from both sides of the inequality:
6 + 4j - 6 > 2 - 6
Simplifying, we have:
4j > -4
Next, divide both sides of the inequality by 4 to isolate j:
4j/4 > -4/4
Simplifying further, we get:
j > -1
The solution to the inequality is j > -1.
Graphing this solution on a number line, we represent all values of j greater than -1. We use an open circle to indicate that -1 is not included in the solution, and we shade the line to the right to show that any value greater than -1 is included.
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-1