MTH55_Lec-17_sec_4-3a_Absolute_Value.ppt 1 Bruce Mayer, PE Chabot College Mathematics Bruce Mayer, PE Licensed Electrical & Mechanical Engineer Chabot Mathematics §4.3b AbsVal InEqualities
MTH55_Lec-17_sec_4-3a_Absolute_Value.ppt 2 Bruce Mayer, PE Chabot College Mathematics Review § Any QUESTIONS About §4.3a → Absolute Value Any QUESTIONS About HomeWork §4.3a → HW MTH 55
MTH55_Lec-17_sec_4-3a_Absolute_Value.ppt 3 Bruce Mayer, PE Chabot College Mathematics Solving AbsVal InEqual with < Solving Inequalities in the Form |x| 0 1.Rewrite as a compound inequality involving “and”: x > −a AND x < a. Can also write as: −a < x < a 2.Solve the compound inequality. Similarly, to solve |x| a, we would write x −a and x a (or −a x a)
MTH55_Lec-17_sec_4-3a_Absolute_Value.ppt 4 Bruce Mayer, PE Chabot College Mathematics Example AbsVal & < Given InEquality: |x − 3| < 6 solve, graph the solution set, and write the solution set in both set-builder and interval notation SOLUTION |x – 3| −6 and x − 3 < 6 thus −6 < x − 3 < 6 –ReWritten as Compound InEquality So −3 < x < 9 (add +3 to all sides)
MTH55_Lec-17_sec_4-3a_Absolute_Value.ppt 5 Bruce Mayer, PE Chabot College Mathematics Example AbsVal & < SOLUTION: |x − 3| < 6 Thus the Solution → −3 < x < 9 Solution in Graphical Form ( ) Set-builder notation: {x| −3 < x < 9} Interval notation: (−3, 9)
MTH55_Lec-17_sec_4-3a_Absolute_Value.ppt 6 Bruce Mayer, PE Chabot College Mathematics Example |2x − 3| + 8 < 5 Given InEquality: |2x − 3| + 8 < 5 solve, graph the solution set, and write the solution set in both set-builder and interval notation SOLUTION Isolate the absolute value |2x − 3| + 8 < 5 |2x − 3| < −3 ???
MTH55_Lec-17_sec_4-3a_Absolute_Value.ppt 7 Bruce Mayer, PE Chabot College Mathematics Example |2x − 3| + 8 < 5 The InEquality Simplified to: |2x − 3| < −3 Since the absolute value cannot be less than a negative number, this inequality has NO solution: Ø No Graph Set-Builder Notation → {Ø} Interval notation: We do not write interval notation because there are no values in the solution set.
MTH55_Lec-17_sec_4-3a_Absolute_Value.ppt 8 Bruce Mayer, PE Chabot College Mathematics Solving AbsVal InEqual with > Solving Inequalities in the Form |x| > a, where a > 0 1.Rewrite as a compound inequality involving “or”: x a. 2.Solve the compound inequality Similarly, to solve |x| a, we would write x −a or x a
MTH55_Lec-17_sec_4-3a_Absolute_Value.ppt 9 Bruce Mayer, PE Chabot College Mathematics Example AbsVal & > Given InEquality: |x + 7| > 5 solve, graph the solution set, and write the solution set in both set-builder and interval notation SOLUTION: convert to a compound inequality and solve each |x + 7| > 5 → x + 7 5
MTH55_Lec-17_sec_4-3a_Absolute_Value.ppt 10 Bruce Mayer, PE Chabot College Mathematics Example AbsVal & > SOLUTION : |x + 7| > 5 x –The Addition Principle Produces Solutions x −2 The Graph ) ( Set-builder notation: {x| x −2} Interval notation: (− , −12) U (−2, ).
MTH55_Lec-17_sec_4-3a_Absolute_Value.ppt 11 Bruce Mayer, PE Chabot College Mathematics Example |4x + 7| – 9 > –12 Given InEquality: |4x + 7| − 9 > −12 solve, graph the solution set, and write the solution set in both set-builder and interval notation SOLUTION Isolate the absolute value |4x + 7| – 9 > –12 |4x + 7| > –3 ???
MTH55_Lec-17_sec_4-3a_Absolute_Value.ppt 12 Bruce Mayer, PE Chabot College Mathematics Example |4x + 7| − 9 > – 12 The InEquality Simplified to: |4x + 7| > −3 This inequality indicates that the absolute value is greater than a negative number. Since the absolute value of every real number is either positive or 0, the solution set is All Real Numbers, The Graph is then the entire Number Line Set-builder notation: {x|x is a real number} Interval notation: (− , )
MTH55_Lec-17_sec_4-3a_Absolute_Value.ppt 13 Bruce Mayer, PE Chabot College Mathematics Summary: Solve |ax + b| > k Let k be a positive real number, and p and q be real numbers. To solve |ax + b| > k, solve the following compound inequality ax + b > k OR ax + b < −k. The solution set is of the form (− , p)U(q, ), which consists of two Separate intervals. pq
MTH55_Lec-17_sec_4-3a_Absolute_Value.ppt 14 Bruce Mayer, PE Chabot College Mathematics Example |2x + 3| > 5 By the Previous Slide this absolute value inequality is rewritten as 2x + 3 > 5 or 2x + 3 < −5 The expression 2x + 3 must represent a number that is more than 5 units from 0 on either side of the number line. Use this analysis to solve the compound inequality Above
MTH55_Lec-17_sec_4-3a_Absolute_Value.ppt 15 Bruce Mayer, PE Chabot College Mathematics Example |2x + 3| > 5 Solve the Compound InEquality 2x + 3 > 5 or2x + 3 < −5 2x > 2 or 2x < −8 x > 1 or x < −4 The solution set is (– , –4)U(1, ). Notice that the graph consists of two intervals. –5–4–3–2–
MTH55_Lec-17_sec_4-3a_Absolute_Value.ppt 16 Bruce Mayer, PE Chabot College Mathematics Summary: Solve |ax + b| < k Let k be a positive real number, and p and q be real numbers. To solve |ax + b| < k, solve the three- part “and” inequality –k < ax + b < k The solution set is of the form (p, q), a single interval. pq
MTH55_Lec-17_sec_4-3a_Absolute_Value.ppt 17 Bruce Mayer, PE Chabot College Mathematics Example |2x + 3| < 5 By the Previous Slide this absolute value inequality is rewritten as −5 < 2x + 3and 2x + 3 < 5 In 3-Part form −5 < 2x + 3 < 5 Solving for x −5 < 2x + 3 < 5 −8 < 2x < 2 −4 < x < 1
MTH55_Lec-17_sec_4-3a_Absolute_Value.ppt 18 Bruce Mayer, PE Chabot College Mathematics Example |2x + 3| < 5 Thus the Solution: −4 < x < 1 We can Check that the solution set is (−4, 1), so the graph consists of the single Interval: –5–4–3–2–
MTH55_Lec-17_sec_4-3a_Absolute_Value.ppt 19 Bruce Mayer, PE Chabot College Mathematics Caution for AbsVal vs <> When solving absolute value inequalities of the types > & < remember the following: 1.The methods described apply when the constant is alone on one side of the equation or inequality and is positive. 2.Absolute value equations and absolute value inequalities of the form |ax + b| > k translate into “or” compound statements.
MTH55_Lec-17_sec_4-3a_Absolute_Value.ppt 20 Bruce Mayer, PE Chabot College Mathematics Caution for AbsVal vs <> When solving absolute value inequalities of the types > & < remember the following: 3.Absolute value inequalities of the form |ax + b| < k translate into “and” compound statements, which may be written as three-part inequalities. 4.An “or” statement cannot be written in three parts. It would be incorrect to use −5 > 2x + 3 > 5 in the > Example, because this would imply that − 5 > 5, which is false
MTH55_Lec-17_sec_4-3a_Absolute_Value.ppt 21 Bruce Mayer, PE Chabot College Mathematics Absolute Value Special Cases 1.The absolute value of an expression can never be negative: |a| ≥ 0 for ALL real numbers a. 2.The absolute value of an expression equals 0 ONLY when the expression is equal to 0.
MTH55_Lec-17_sec_4-3a_Absolute_Value.ppt 22 Bruce Mayer, PE Chabot College Mathematics Example Special Cases Solve: |2n + 3| = −7 Solution: See Case 1 in the preceding slide. Since the absolute value of an expression can never be negative, there are NO solutions for this equation The solution set is Ø.
MTH55_Lec-17_sec_4-3a_Absolute_Value.ppt 23 Bruce Mayer, PE Chabot College Mathematics Example Special Cases Solve: |6w − 1| = 0 Solution: See Case 2 in the preceding slide. The absolute value of the expression 6w − 1 will equal 0 only if 6w − 1 = 0 The solution of this equation is 1/6. Thus, the solution set of the original equation is {1/6}, with just one element. –Check by substitution.
MTH55_Lec-17_sec_4-3a_Absolute_Value.ppt 24 Bruce Mayer, PE Chabot College Mathematics Example Special Cases Solve: |x| ≥ −2 Solution: The absolute value of a number is always greater than or equal to 0. Thus, |x| ≥ −2 is true for all real numbers. The solution set is then entire number line: (− , ).
MTH55_Lec-17_sec_4-3a_Absolute_Value.ppt 25 Bruce Mayer, PE Chabot College Mathematics Example Special Cases Solve: |x + 5| − 1 < −8 Solution: Add 1 to each side to get the absolute value expression alone on one side. |x + 5| < −7 There is no number whose absolute value is less than −7, so this inequality has no solution. The solution set is Ø
MTH55_Lec-17_sec_4-3a_Absolute_Value.ppt 26 Bruce Mayer, PE Chabot College Mathematics Example Special Cases Solve: |x − 9| + 2 ≤ 2 Solution: Subtracting 2 from each side gives |x − 9| ≤ 0 The value of |x − 9| will never be less than 0. However, |x − 9| will equal 0 when x = 9. Therefore, the solution set is {9}.
MTH55_Lec-17_sec_4-3a_Absolute_Value.ppt 27 Bruce Mayer, PE Chabot College Mathematics WhiteBoard Work Problems From §4.3 Exercise Set 88 (ppt), 94 (ppt), 98 (ppt), 56, 62, 78 Albany, NY Yearly Temperature Data
MTH55_Lec-17_sec_4-3a_Absolute_Value.ppt 28 Bruce Mayer, PE Chabot College Mathematics P |4 − x| < 5 Solve |4 − x| < 5 by x-y Graph GRAPH SOLUTION: On graph find the region where the y = f(x)= |4 − x| function lies BELOW (i.e., is Less Than) the y = f(x) = 5 Horizontal Line
MTH55_Lec-17_sec_4-3a_Absolute_Value.ppt 29 Bruce Mayer, PE Chabot College Mathematics P |4 − x| < 5 () Ans in SET & INTERVAL Form {x| −1 < x < 9} (−1, 9)
MTH55_Lec-17_sec_4-3a_Absolute_Value.ppt 30 Bruce Mayer, PE Chabot College Mathematics P |4 − x| < 5 Solve |4 − x| < 5 4 −x −5 −x −9 – Multiply Both expressions by −1, REMBERING to REVERSE the direction of the InEqual signs x > − 1 and x < 9 OR −1 < x and x < 9 So the Compound Soln: (−1 < x < 9) In Set notation: {x| −1 < x < 9} Interval notation: (−1, 9)
MTH55_Lec-17_sec_4-3a_Absolute_Value.ppt 31 Bruce Mayer, PE Chabot College Mathematics P Albany, NY Temps InEquality for Albany, NY Monthly Avg Temperature, T, in °F |T − 50 °F| ≤ 22 °F Solve and Interpret SOLUTION |T−50| ≤ 22 → −22 ≤ T−50 and T−50 ≤ 22 Or in 3-part form −22 ≤ T−50 ≤ 22 Add 50 to each Part (addition principle)
MTH55_Lec-17_sec_4-3a_Absolute_Value.ppt 32 Bruce Mayer, PE Chabot College Mathematics P Albany, NY Temps Albany, NY Temps → |T − 50 °F| ≤ 22 °F SOLUTION (50−22) ≤ (T−50+50) ≤ (22+50) Or ANS →28 ≤ T ≤ 72 INTERPRETATION: The monthly avg temperature in Albany, NY ranges from 28 °F in Winter to 72 °F in Summer
MTH55_Lec-17_sec_4-3a_Absolute_Value.ppt 33 Bruce Mayer, PE Chabot College Mathematics P Machining Tolerance Length, x, of a Machine Part in cm |x − 9.4cm| ≤ 0.01cm Solve and Interpret SOLUTION |x−9.4| ≤ 0.01 → −0.01 ≤ x−9.4 and x−9.4 ≤ 0.01 Or in 3-part form −0.01 ≤ x−9.4 ≤ 0.01 Add 9.4 to each Part (addition principle)
MTH55_Lec-17_sec_4-3a_Absolute_Value.ppt 34 Bruce Mayer, PE Chabot College Mathematics P Machining Tolerance Machine Part Tolerance → |x − 9.4cm| ≤ 0.01cm SOLUTION (− ) ≤ (x− ) ≤ ( ) Or ANS →9.39 ≤ x ≤ 9.41 INTERPRETATION: The expected dimensions of the finished machine part are between 93.9mm and 94.1mm (i.e. the dim is 94mm ±0.1mm)
MTH55_Lec-17_sec_4-3a_Absolute_Value.ppt 35 Bruce Mayer, PE Chabot College Mathematics All Done for Today JR Ewing From “Dallas”
MTH55_Lec-17_sec_4-3a_Absolute_Value.ppt 36 Bruce Mayer, PE Chabot College Mathematics Bruce Mayer, PE Licensed Electrical & Mechanical Engineer Chabot Mathematics Appendix –
MTH55_Lec-17_sec_4-3a_Absolute_Value.ppt 37 Bruce Mayer, PE Chabot College Mathematics Graph y = |x| Make T-table
MTH55_Lec-17_sec_4-3a_Absolute_Value.ppt 38 Bruce Mayer, PE Chabot College Mathematics Weather UnderGnd – Albany, NY