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From here to there and back again Counts steps Measures distance
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1. Additive inverse - the opposite of a number. Two numbers are additive inverses if their sum is zero 2.Absolute value of x : l x l = 3.Absolute value is non-negative because it is the distance from zero to x. Example for x = l-3l Vocabulary
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I am going to my friend’s house. Absolute Value: Counts the Steps
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One Absolute Value: Counts the Steps
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One, two Absolute Value: Counts the Steps
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One, two, three Absolute Value: Counts the Steps
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One, two, three, four Absolute Value: Counts the Steps
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One, two, three, four, five Absolute Value: Counts the Steps
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One, two, three, four, five, six Absolute Value: Counts the Steps
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One, two, three, four, five, six, seven Absolute Value: Counts the Steps
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One, two, three, four, five, six, seven, eight Absolute Value: Counts the Steps
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One, two, three, four, five, six, seven, eight, nine Absolute Value: Counts the Steps 9 steps to go from left to right
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It’s time to go home. How many steps to my house? Absolute Value: Counts the Steps
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One Absolute Value: Counts the Steps
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One, two Absolute Value: Counts the Steps
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One, two, three Absolute Value: Counts the Steps
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One, two, three, four Absolute Value: Counts the Steps
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One, two, three, four, five Absolute Value: Counts the Steps
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One, two, three, four, five, six Absolute Value: Counts the Steps
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One, two, three, four, five, six, seven Absolute Value: Counts the Steps
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One, two, three, four, five, six, seven, eight Absolute Value: Counts the Steps
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One, two, three, four, five, six, seven, eight, nine Absolute Value: Counts the Steps 9 steps to go from right to left Do the steps need to be equidistant? Yes
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Remember! Absolute value must be nonnegative because it represents _________.
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Remember! Absolute value must be nonnegative because it represents distance.
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The absolute-value of a number is that number’s distance from zero on a number line. For example, |–9| = ____.
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The absolute-value of a number is that numbers distance from zero on a number line. For example, |–9| = 9.
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Absolute Value
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Represents distance Count the steps
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The absolute value of a number is the distance from zero on a number line. Example: |5| read as “the absolute value of 5” Example: |-5| read as “the absolute value of 5” 5 units 2101 234 56 6543 -- - -- - |5| = 5|–5| = 5 Note: | 5 | = l -5 l= 5
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Absolute Value of x l x l the distance from zero to x on a number line
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|x| the distance from zero on a number line to x x units 0 x - |x| = x|–x| = x x
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Additive inverse The opposite of a number. Two numbers are additive inverses if their sum is zero. x + (-_____) = 0
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Additive inverse The opposite of a number. Two numbers are additive inverses if their sum is zero. x + (-x) = 0
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Absolute value Is always a positive number except for 0 as 0 is neither positive or negative.
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Graph y = l x l
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Absolute-value graphs are V-shaped. axis of symmetry - line that divides the graph into two congruent halves vertex is the “corner" point on the graph.
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From the graph of y = |x|, you can tell that: the axis of symmetry is the y-axis (x = 0). the vertex is (0, 0). the domain (x-values) is the set of all real numbers. the range (y-values) is described by y ≥ 0. y = |x| is a function because each domain value has exactly one range value. the x-intercept and the y-intercept are both 0.
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Label the axis of symmetry and the vertex. Identify the intercepts, and give the domain and range. Example 1A: Absolute-Value Functions y = |x| + 1 x –2 –1012 32123
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Example 1A Continued the axis of symmetry is the y-axis (x = 0). the vertex is (0, 1). there are no x-intercepts. the y-intercept is +1. the domain is all real numbers. the range is described by y ≥ 1. From the graph you can tell that Axis of symmetry Vertex
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Graph Label the axis of symmetry and the vertex. Identify the intercepts, and give the domain and range. Example 1B: Absolute-Value Functions y = |x – 4| x –2 0246 64 2 02
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the axis of symmetry is x = 4. the vertex is (4, 0). the x-intercept is +4. the y-intercept is +4. the domain is all real numbers. the range is described by y ≥ 0. From the graph you can tell that Example 1B Continued axis of symmetry vertex
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Graph Label the axis of symmetry and the vertex. Identify the intercepts, and give the domain and range. f(x) = 3|x| x –2 –1012 63 0 36 Example 1C x
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Example 1C Continued the axis of symmetry is x = 0. the vertex is (0, 0). the x-intercept is 0. the y-intercept is 0. the domain is all real numbers. the range is described by y ≥ 0. From the graph you can tell that Axis of symmetry Vertex x
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Absolute Value Solve equations in one variable that contain absolute-value expressions.
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Represents ________ Absolute Value
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Represents distance Absolute Value
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Represents distance Counts ____ Absolute Value
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Absolute value represents distance Absolute value counts steps Absolute Value
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The absolute-value of a number is that number’s distance from zero on a number line. Example |–6| = 6 55 44 33 22 012345 66 11 6 6 units Both 6 and –6 are a distance of 6 units from 0, so both 6 and –6 have an absolute value of 6. 6 units Given |x| = 6 Solve for x This equation asks, “What values of x have an absolute value of 6?” The solutions are 6 and –6. Notice this equation has two solutions.
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Example 1A: Solving Absolute-Value Equations Solve for x. |x| = 12 Case 1 x = 12 Case 2 x = –12 The solutions are 12 and –12. Think: Which numbers are 12 units from 0? Rewrite the equation as two cases. Check your work |x| = 12 |12| = 12 12 = 12 |x| = 12 | 12| = 12 12 = 12
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Example 1B: Solving Absolute-Value Equations 3|x + 7| = 24 |x + 7| = 8 The solutions are 1 and –15. Case 1 x + 7 = 8 Case 2 x + 7 = –8 – 7 = –7 x = 1 x = –15 Since |x + 7| is multiplied by 3, divide both sides by 3 to undo the multiplication. Think: What numbers are 8 units from 0? Rewrite the equations as two cases. Since 7 is added to x subtract 7 from both sides of each equation.
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Example 1B Continued 3|x + 7| = 24 The solutions are 1 and –15. Check 3|x + 7| = 24 3|8| = 24 24 = 24 3|1 + 7| = 24 3(8) = 24 3| 15 + 7| = 24 24 = 24 3| 8| = 24 3(8) = 24
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Solve each equation. Check your answer. Example 1c |x| – 3 = 4 + 3 = +3 |x| = 7 Case 1 x = 7 Case 2 –x = 7 –1(–x) = –1(7) x = –7x = 7 The solutions are 7 and –7. Since 3 is subtracted from |x|, add 3 to both sides. Think: what numbers are 7 units from 0? Rewrite the case 2 equation by multiplying by – 1 to change the minus x to a positive..
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Check |x| 3 = 4 7 3 = 4 |7| 3 = 4 4 = 4 | 7| 3 = 4 7 3 = 4 4 = 4 Solve the equation. Check your answer. Example 1c Continued |x| 3 = 4 The solutions are 7 and 7.
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Solve the equation. Check your answer. Example 1d |x 2| = 8 Think: what numbers are 8 units from 0? +2 = +2 Case 1 x 2 = 8 x = 10 +2 = +2 x = 6 Case 2 x 2 = 8 Rewrite the equations as two cases. Since 2 is subtracted from x add 2 to both sides of each equation. The solutions are 10 and 6.
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Solve the equation. Check your answer. Example 1d Continued |x 2| = 8 The solutions are 10 and 6. Check |x 2| = 8 10 2| = 8 |10 2| = 8 8 = 8 | 6 + ( 2)| = 8 6 + 2 = 8 8 = 8
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Absolute value equations most often have two solutions, but not all do: 1.If the absolute-value equals 0, there is one solution. 2.If the absolute-value is negative, there are no solutions. Solutions to Absolute Value Equations
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Example 2A Solve the equation. Check your answer. 8 = |x + 2| 8 +8 = + 8 0 = |x +2| 0 = x + 2 2 = 2 2 = x Since 8 is subtracted from |x + 2|, add 8 to both sides to undo the subtraction. There is only one case. Since 2 is added to x, subtract 2 from both sides to undo the addition.
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Example 2A Continued Solve the equation. Check your answer. 8 = |x +2| 8 8 = 8 8 = | 2 + 2| 8 8 = |0| 8 8 = 0 8 To check your solution, substitute 2 for x in your original equation. Solution is x = 2 Check 8 =|x + 2| 8
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Example 2B Solve the equation. Check your answer. 3 + |x + 4| = 0 3 = 3 |x + 4| = 3 Since 3 is added to |x + 4|, subtract 3 from both sides to undo the addition. Absolute values cannot be negative. This equation has no solution.
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Remember! Absolute value must be nonnegative because it represents distance.
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Example 2c Solve the equation. Check your answer. 2 |2x 5| = 7 2 = 2 |2x 5| = 5 Since 2 is added to |2x 5|, subtract 2 from both sides to undo the addition. Absolute values cannot be negative. |2x 5| = 5 This equation has no solution. Since |2x 5| is multiplied by a negative 1, divide both sides by negative 1.
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Example d Solve the equation. Check your answer. 6 + |x 4| = 6 +6 = +6 |x 4| = 0 x 4 = 0 + 4 = +4 x = 4 Since 6 is subtracted from |x 4|, add 6 to both sides to undo the subtraction. There is only one case. Since 4 is subtracted from x, add 4 to both sides to undo the addition.
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Solve the equation. Check your answer. Example 2d Continued 6 + |x 4| = 6 6 + |4 4| = 6 6 +|0| = 6 6 + 0 = 6 6 = 6 6 + |x 4| = 6 The solution is x = 4. To check your solution, substitute 4 for x in your original equation.
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