Warm-Up #10 Solve and graph 5x -3 < 7 and 3x < 6 Find a line that contain (1, 3) and perpendicular to x – 3y = 6 Solve 7x (3x – 7) = 8x – 4
Lesson 1.8 Solving Absolute Value Equations
What is Absolute Value? The absolute value of a number is the number of units it is from zero on the number line. 5 and -5 have the same absolute value. The symbol |x| represents the absolute value of the number x.
|-8| = 8 |4| = 4 You try: |15| = ? |-23| = ?
We can evaluate expressions that contain absolute value symbols. Think of the | | bars as grouping symbols. Evaluate |9x -3| + 5 if x = -2 |9(-2) -3| + 5 |-18 -3| + 5 |-21| + 5 21+ 5=26
Equations may also contain absolute value expressions When solving an equation, isolate the absolute value expression first. Rewrite the equation as two separate equations. Consider the equation | x | = 3. The equation has two solutions since x can equal 3 or -3. Solve each equation. Always check your solutions. Example: Solve |x + 8| = 3 x + 8 = 3 and x + 8 = -3 x = -5 x = -11 Check: |x + 8| = 3 |-5 + 8| = 3 |-11 + 8| = 3 |3| = 3 |-3| = 3 3 = 3 3 = 3
Solve |y + 4| - 3 = 0 Solve: 3|x - 5| = 12 Solve: |8 + 5a| = 14 - a You Try Solve |y + 4| - 3 = 0 Solve: 3|x - 5| = 12 Solve: |8 + 5a| = 14 - a
Now Try These Solve |y + 4| - 3 = 0 |y + 4| = 3 You must first isolate the variable by adding 3 to both sides. Write the two separate equations. y + 4 = 3 & y + 4 = -3 y = -1 y = -7 Check: |y + 4| - 3 = 0 |-1 + 4| -3 = 0 |-7 + 4| - 3 = 0 |-3| - 3 = 0 |-3| - 3 = 0 3 - 3 = 0 3 - 3 = 0 0 = 0 0 = 0
Solve: 3|x - 5| = 12 |x - 5| = 4 x - 5 = 4 and x - 5 = -4 x = 9 x = 1 Check: 3|x - 5| = 12 3|9 - 5| = 12 3|1 - 5| = 12 3|4| = 12 3|-4| = 12 3(4) = 12 3(4) = 12 12 = 12 12 = 12
Solve: |8 + 5a| = 14 - a 8 + 5a = 14 - a and 8 + 5a = -(14 – a) Set up your 2 equations, but make sure to negate the entire right side of the second equation. 8 + 5a = 14 - a and 8 + 5a = -14 + a 6a = 6 4a = -22 a = 1 a = -5.5 Check: |8 + 5a| = 14 - a |8 + 5(1)| = 14 - 1 |8 + 5(-5.5) = 14 - (-5.5) |13| = 13 |-19.5| = 19.5 13 = 13 19.5 = 19.5
Example 1
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Example 3
homework Lesson 1/8 pg 68 #25-38 even, 40, 42, 46, 48, 50