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Study sets matching "term:absolute value equations = *lxl=4 lxl= 4 x=4 x=no answer x= 4 *lx 3l=7 x 3=7 or x 3= 7 x=10 x= 4"

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Study sets matching "term:absolute value equations = *lxl=4 lxl= 4 x=4 x=no answer x= 4 *lx 3l=7 x 3=7 or x 3= 7 x=10 x= 4"

12 terms
Absolute Value Equations - checking for solutions
x = 2/3 and x = -2
x = -7 and x = -11
x = -1 and x=-8 (extraneous solution)
x = 7 and x = -7
| 3x + 2 | = 4
2 | x + 9 | + 3 = 7
| 5x - 2 | = 7x + 14
| x | = 7
x = 2/3 and x = -2
| 3x + 2 | = 4
x = -7 and x = -11
2 | x + 9 | + 3 = 7
31 terms
Solving Absolute Value Equations and Inequalities
x = -3 or x = 3
-3 < x < 3
x< - 3 or x > 3
No Solution
|x| = 3
|x| < 3
|x| > 3
|x| = -5
x = -3 or x = 3
|x| = 3
-3 < x < 3
|x| < 3
15 terms
Time Table 2-12 no 0 or 1
2 x 2
2 x 3
2 x 4
2 x 5
4
6
8
10
2 x 2
4
2 x 3
6
12 terms
Solving Equations Practice
x = 2
x = 8
x = -10
x = 3
Problem 1
Problem 2
Problem 3
Problem 4
x = 2
Problem 1
x = 8
Problem 2
12 terms
Absolute Value Equations & Inequalities
x = 4 or x = -4
x = 24 or x = -40
x = 6 or x = -6 4/5
x = 15 or x = -9
| 8t | = 32
| x + 8 | = 32
| 5x + 2 | = 32
2 | x - 3 | = 24
x = 4 or x = -4
| 8t | = 32
x = 24 or x = -40
| x + 8 | = 32
21 terms
Absolute Value Equations AND Solving Absolute Value Inequalities
4 or -4
10 or -10
7 or -7
7 or 13
|x| = 4
|x| = 10
|6m|=42
|k-10|=3
4 or -4
|x| = 4
10 or -10
|x| = 10
39 terms
Solving Equations, Solving Equations 2 no parenthesis
x = 35
x = 4
x = 11
x = 2
x / 7 = 5
11 = x + 7
8 + x = 19
4 = x + 2
x = 35
x / 7 = 5
x = 4
11 = x + 7
20 terms
Absolute Value Inequalities 2
|2x - 1| > 5
3 + |x - 2| < 19
-4 |x - 1| < -16
2|x| + 7 > 10
x < -2 or x > 3
-14 < x < 18
x < -3 or x > 5
x < -1.5 or x > 1.5
|2x - 1| > 5
x < -2 or x > 3
3 + |x - 2| < 19
-14 < x < 18
13 terms
Lesson 3: Solving Absolute Value Equations and Inequalities
Absolute Value
⌋3x⌊ = 18
⌋x + 4⌊ + 3 = 17
⌋2x - 3⌊ = -1
The distance a number is from zero on a number line
x = 6 x = -6
x = -18 and x = 10
no solution
Absolute Value
The distance a number is from zero on a number line
⌋3x⌊ = 18
x = 6 x = -6
12 terms
Absolute Value Equations Day 3
x = 8 or x = -8
x = 11 or x = -5
no solution
x = 18 or x = -18
| x| =8
| x-3| =8
| x-1| =-4
| x/3 | =6
x = 8 or x = -8
| x| =8
x = 11 or x = -5
| x-3| =8
13 terms
Solving Absolute Value Equations and Inequalities
Absolute Value
|3x| = 18
|x + 4| + 3 = 17
|2x - 3| = -1
The distance a number is from zero on a number line
x = 6 x = -6
x = -18 and x = 10
no solution
Absolute Value
The distance a number is from zero on a number line
|3x| = 18
x = 6 x = -6
30 terms
Solving Equations Nov 8 or 9
x = 35
x = 4
x = 11
2 = x
x / 7 = 5
11 = x + 7
8 + x = 19
4 = x + 2
x = 35
x / 7 = 5
x = 4
11 = x + 7
20 terms
Absolute Value Inequalities
9 < | x + 7|
4 - 3| x + 2 | > - 14
|x| / 3 > -4.2
4 | x - 1 | > 16
x < -16 or x > 2
-8 < x < 4
-12.6 < x < 12.6
x < - 5 or x > 3
9 < | x + 7|
x < -16 or x > 2
4 - 3| x + 2 | > - 14
-8 < x < 4
25 terms
Absolute Value Equations and Regular Equations
x = {-15, 5}
x = {-5, 15}
x = {0, 4}
x = {-1, 2}
| x + 5 | = 10
| x - 5 | = 10
3 | 2x - 4 | = 12
2 | 2 - 4x | = 12
x = {-15, 5}
| x + 5 | = 10
x = {-5, 15}
| x - 5 | = 10
12 terms
Review for Equation Solving Skills Quiz
x = -18
x = 5
x = 34
x = 80
x + 5 = -13
-7 = x - 12
10 = (x - 4)/3
4 = -6 + x/8
x = -18
x + 5 = -13
x = 5
-7 = x - 12
12 terms
Solving Absolute Value Equations and Inequalities
Absolute Value
|3x| = 18
|x + 4| + 3 = 17
|x - 5| - 2 = 10
The distance a number is from zero on a number line
x = 6 x = -6
x = -18 and x = 10
x = -7 x = 17
Absolute Value
The distance a number is from zero on a number line
|3x| = 18
x = 6 x = -6
12 terms
Solving Absolute Value Equations and Inequalities
Absolute Value
|3x| = 18
|x + 4| + 3 = 17
|x - 5| - 2 = 10
The distance a number is from zero on a number line
x = 6 x = -6
x = -18 and x = 10
x = -7 x = 17
Absolute Value
The distance a number is from zero on a number line
|3x| = 18
x = 6 x = -6
12 terms
Solving Absolute Value Equations and Inequalities
Absolute Value
|3x| = 18
|x + 4| + 3 = 17
|x - 5| - 2 = 10
The distance a number is from zero on a number line
x = 6 x = -6
x = -18 and x = 10
x = -7 x = 17
Absolute Value
The distance a number is from zero on a number line
|3x| = 18
x = 6 x = -6
30 terms
Absolute Value Equations and Inequalities
What type of compound inequality is us…
What type of compound inequality is us…
Solve | x | = -25
Solve | x + 3 | ≥ 7
"and" compound inequality
"or" compound inequality
No Solution for x
x ≥ 4 or x ≤ -10
What type of compound inequality is us…
"and" compound inequality
What type of compound inequality is us…
"or" compound inequality
30 terms
Absolute Value Equations and Inequalities
What type of compound inequality is us…
What type of compound inequality is us…
Solve | x | = -25
Solve | x + 3 | ≥ 7
"and" compound inequality
"or" compound inequality
No Solution for x
x ≥ 4 or x ≤ -10
What type of compound inequality is us…
"and" compound inequality
What type of compound inequality is us…
"or" compound inequality
30 terms
Absolute Value Equations and Inequalities
"and" compound inequality
"or" compound inequality
No Solution for x
x ≥ 4 or x ≤ -10
What type of compound inequality is use for | x - 2 | ≤ 4 ?
What type of compound inequality is use for | x + 7 | > 9 ?
Solve | x | = -25
Solve | x + 3 | ≥ 7
"and" compound inequality
What type of compound inequality is use for | x - 2 | ≤ 4 ?
"or" compound inequality
What type of compound inequality is use for | x + 7 | > 9 ?
7 terms
Chapter 2 Test Review
How do you read the following:... x + 2…
Solve the following inequality:... [ 4 +…
Solve the following inequality:... 2[x-3…
Explain why the solution is ALL REAL N…
x plus 2 is greater than 3 minus x
x < 7... x > -9 2/3
x > -3... x < 2
any value will work for x
How do you read the following:... x + 2…
x plus 2 is greater than 3 minus x
Solve the following inequality:... [ 4 +…
x < 7... x > -9 2/3
36 terms
Solving Multi-Step Equations
x = -11
x = -7
x = 3
x = 5/3
4 + x = -7
6 - x = 13
4x - 2 = 10
5x + 2 = 8x - 3
x = -11
4 + x = -7
x = -7
6 - x = 13
36 terms
Solving Multi-Step Equations
x = -11
x = -7
x = 3
x = 5/3
4 + x = -7
6 - x = 13
4x - 2 = 10
5x + 2 = 8x - 3
x = -11
4 + x = -7
x = -7
6 - x = 13
25 terms
Simple Equations - Master Set
3x = 21
5x = 100
6x = 72
5x = 35
x = 7
x = 20
x = 12
x = 7
3x = 21
x = 7
5x = 100
x = 20
15 terms
Solve Quadratic Equations by factoring, graphing or using the Quadratic Formula.
x² - 4x - 12 = 0
x² + 3x = 10
2x² + x = -50
x² + 8x + 16 = 0
x = -2, x = 6
x = -5, x = 2
x = -4
x² - 4x - 12 = 0
x = -2, x = 6
x² + 3x = 10
x = -5, x = 2
38 terms
Inequality
younger than 7
minimum of 7
more than 7
no more than 7
x < 7
x ≥ 7
x > 7
x ≤ 7
younger than 7
x < 7
minimum of 7
x ≥ 7
51 terms
Solving Equations with terminology
x ÷ 7 = 5
11 = x + 7
8 + x = 19
4 = x + 2
x = 35
x = 4
x = 11
x = 2
x ÷ 7 = 5
x = 35
11 = x + 7
x = 4
20 terms
Words to Equations
2(x + 5)
2(x - 3)
3 - x
x/2 + 5
Twice the sum of a number x and 5
Twice the differences of x and 3
The difference of 3 and x
Five plus the ratio of x and 2
2(x + 5)
Twice the sum of a number x and 5
2(x - 3)
Twice the differences of x and 3
41 terms
Multiplying Whole Numbers
The value of 10^4
3 x 3 x 3 x 3 x 3 in exponential form
The value of 9^2
A number with the prime factorization…
10,000
3^5
81
18
The value of 10^4
10,000
3 x 3 x 3 x 3 x 3 in exponential form
3^5
Multistep Equations
x = -7
x = 2
x = 18
x = -96
42 = -6x
10 + x = 12
15 = x - 3
x/4 = -24
x = -7
42 = -6x
x = 2
10 + x = 12
12 terms
Multistep Equations
x = -7
x = 2
x = 18
x = -6
42 = -6x
10 + x = 12
15 = x - 3
x/4 = -24
x = -7
42 = -6x
x = 2
10 + x = 12
37 terms
Solve linear equations
On both sides add opposite of constant…
x = 3
x = 17
x = 7
Solve one-step linear equations
5x = 15
x - 5 = 12
x + 5 = 12
On both sides add opposite of constant…
Solve one-step linear equations
x = 3
5x = 15
33 terms
1.4, 1.5, 1.6 Quiz Review
x+2≤10
-2+x<1
2x≥6
-8x<16
x≤8
x<3
x≥3
x>-2
x+2≤10
x≤8
-2+x<1
x<3
12 terms
Watkins Unit 1: Solving Equations and Inequalities
3x - 7 = 5
|x| = 3
|x - 2| = 4... Hint: Solve two equations…
2x - 1 > 5
x = 4
x = 3, x = -3
x = -2, x = 6
x > 3
3x - 7 = 5
x = 4
|x| = 3
x = 3, x = -3
10 terms
9/20/16 Types of solutions for equations
x + 7 = 7 + x
variables same on both sides, constant…
variable same on both side; constants…
x + 3 = x + 4
infinitely many solutions
infinitely many solutions
no solution
no solution
x + 7 = 7 + x
infinitely many solutions
variables same on both sides, constant…
infinitely many solutions
32 terms
One step Inequalities1
a number less than -3
a number greater than 10
a number at least 14
a number no more than 10
n < -3
n >10
n ≥ 14.
n ≤ 10
a number less than -3
n < -3
a number greater than 10
n >10
37 terms
Solving Single Variable Equations Review
On both sides add opposite of constant…
x = 3
x = 17
x = 7
Solve one-step linear equations
5x = 15
x - 5 = 12
x + 5 = 12
On both sides add opposite of constant…
Solve one-step linear equations
x = 3
5x = 15
38 terms
Writing Inequalities
younger than 6
minimum of 8
more than -4
no more than 3
x < 6
x ≥ 8
x > -4
x ≤ 3
younger than 6
x < 6
minimum of 8
x ≥ 8
37 terms
Solving Single Variable Equations Review
On both sides add opposite of constant…
x = 3
x = 17
x = 7
Solve one-step linear equations
5x = 15
x - 5 = 12
x + 5 = 12
On both sides add opposite of constant…
Solve one-step linear equations
x = 3
5x = 15
14 terms
Absolute Value Equations
x = 4 or -4
x = 10 or -10
x=7 or -7
x= 7 or 13
|x| = 4
|x| = 10
|6x|=42
|x-10|=3
x = 4 or -4
|x| = 4
x = 10 or -10
|x| = 10
37 terms
Solve linear equations
On both sides add opposite of constant…
x = 3
x = 17
x = 7
Solve one-step linear equations
5x = 15
x - 5 = 12
x + 5 = 12
On both sides add opposite of constant…
Solve one-step linear equations
x = 3
5x = 15
37 terms
Solve linear equations
On both sides add opposite of constant…
x = 3
x = 17
x = 7
Solve one-step linear equations
5x = 15
x - 5 = 12
x + 5 = 12
On both sides add opposite of constant…
Solve one-step linear equations
x = 3
5x = 15
37 terms
Solving Single Variable Equations Review
On both sides add opposite of constant…
x = 3
x = 17
x = 7
Solve one-step linear equations
5x = 15
x - 5 = 12
x + 5 = 12
On both sides add opposite of constant…
Solve one-step linear equations
x = 3
5x = 15
16 terms
I can solve absolute value equations
1) x = -30 or 30
1) x = -10 or 10
1) x = -3 or 3
1) x = -1 or 1
1) |x| + 3 = 33
1) 10 = |x|
1) |x| + 2 = 5
1) 4 = |x| + 3
1) x = -30 or 30
1) |x| + 3 = 33
1) x = -10 or 10
1) 10 = |x|
16 terms
3A: 2+ Step Equations
2x +8 = 32
3x - 5 = 22
-2x - 8 = 18
5x + 5 + 5x = 45
x = 12
x = 9
x = -13
x = 4
2x +8 = 32
x = 12
3x - 5 = 22
x = 9
20 terms
Unit 4: How many solutions for x? Zero, One, or Infinitely Many? (Difficulty: 1)
Infinitely many solutions for x
No solution for x
No solution for x
One solution for x: x = -3
2x - x + 7 = x + 3 + 4
-2(x + 1) = -2x + 5
x + 2x + 7 = 3x - 7
4x + 2x + 2 = 3x - 7
Infinitely many solutions for x
2x - x + 7 = x + 3 + 4
No solution for x
-2(x + 1) = -2x + 5
167 terms
Multiplication Facts
2 x 2
2 x 3
2 x 4
2 x 5
4
6
8
10
2 x 2
4
2 x 3
6
37 terms
Solve linear equations
On both sides add opposite of constant…
x = 3
x = 17
x = 7
Solve one-step linear equations
5x = 15
x - 5 = 12
x + 5 = 12
On both sides add opposite of constant…
Solve one-step linear equations
x = 3
5x = 15
Solve linear equations
On both sides add opposite of constant…
x = 3
x = 17
x = 7
Solve one-step linear equations
5x = 15
x - 5 = 12
x + 5 = 12
On both sides add opposite of constant…
Solve one-step linear equations
x = 3
5x = 15
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