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Ch 3.5 – Polynomial and Rational Inequalities DAY 6
HW: Page 193 #7, 9, 11, 15, 17, 19, 25, 29, 31, 33, 35, 37, 45, 57, 59
Pre-Calculus Warm-Up (before 3.5)
Solve for x:
1. 2.
Add or subtract the following fractions: (HINT: you need a common denominator!)
3. 4.
Graph the following:
5. y =(x !3)2(x +2) 6. y = 2x !4
x +3
(HINT: remember end behavior & multiplicity of zeros!)
y y
x x
Intervals above the x-axis: ___________________ Intervals above the x-axis: ___________________
Intervals below the x-axis: ___________________ Intervals below the x-axis: ___________________
Remember Interval Notation –
can be written can be graphed ( )
a b
can be written can be graphed [ ]
a b
or can be written can be graphed ) [
a b
Review of Algebra I: Solve the inequality and graph the solution set. Write answers in both set and interval notation.
1. 2.
To solve a polynomial inequality with degree higher than one:
• Rearrange the inequality so that it is of the form: , , , or
(Polynomial on one side of the inequality; with zero on the other side)
• Find the “critical numbers” by finding where f (x) = 0 (basically, find the zeros of the polynomial…you’ve done this!)
• Use the critical numbers you found to divide the real number line into regions
• Test each region: evaluate the original inequality using a number within the region
• Write the solution set using interval notation (be careful when choosing hard or soft brackets!)
Let’s solve a polynomial inequality, using the polynomial from the warm up, but this time without graphing.
(x !3)2(x +2)>0
Critical Numbers: ______________________ Number line: ___________________________________
Solution set: ________________________
(Does this match the answer we got in the warm up?)
Examples. Solve the inequality and graph the solution set.
3. 4.
To solve a rational inequality:
• Rearrange the inequality so that it is of the form: , , , or
(Ratio on one side of the inequality; with zero on the other side)
• Rewrite the expression as ONE fraction
• Find the “critical numbers” – TWO PARTS THIS TIME: Find where f (x) = 0 and where f (x) is undefined
(zeros…and vertical asymptote! We’ve done this before, too!)
• Use the critical numbers to divide the real number line into regions
• Test each region: evaluate the original inequality using a number within the region
• Write the solution set using interval notation (be careful when choosing hard or soft brackets)
Let’s solve a rational inequality, using the rational function from the warm up, but this time without graphing.
2x !4
"0
x +3
Critical Numbers: ______________________ Number line: _____________________________________________
Solution set: ________________________
(Does this match the answer we got in the warm up?)
Solve the inequality.
1. 2.
3. 4.
5. 6.
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