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College Algebra 3.6 Polynomial and Rational Inequalities 3.7 Variation
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3.6 Polynomial Inequalities Obj: solve polynomial and rational inequalities with the critical value method Critical Value Method – Zeros (solutions) of polynomials are called the critical points. – Critical Points of a polynomial divide positive values from negative values.
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Example Solve x 2 – 2x – 15 < 0 Factor and solve for x. These are the critical points. Choose a value in each interval. Let x = Plug each value into the factored form ( + or - ). Compare relations. Write solution in interval notation.
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Rational Inequalities Steps: 1.Set = to 0 and simplify. 2.Find the zeros of the numerator and denominator to find the critical points. 3.Test the intervals. 4.Compare the relations. 5.Write the solution.
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Example Solve
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3.7 Variation Obj: to set up and solve problems using variation Direct Variation Inverse Variation Joint Variation Combined Variation
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Direct Variation Varies directly or is directly proportional to Meaning as one unit increases, the other increases or as one decreases, the other decreases also y = kx k is the constant of proportionality Examples:
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Example The distance d that a ball rolls down an inclined plane is directly proportional to the square of time t. If the ball rolls 5 feet in 1 second, how far will it roll in 4 seconds? Set up the equation using initial info. Solve for k. Set up new equation with k value and new info. Solve.
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Inverse Variation Varies inversely or is inversely proportional to Meaning as one unit increases, the other decreases and vice versa. y = Examples:
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Example The speed v of a gear varies inversely as the number of teeth t. If a gear that has 48 teeth makes 20 revolutions per minute, how many revolutions per minute will a gear that has 30 teeth make?
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Joint Variation more than one variable z = kxy The cost of a concrete patio varies jointly as the area of the patio and the depth of the patio. It costs $500 for a patio with an area of 80 square feet and a depth of 4 inches. Find the cost of a patio with an area of 144 square feet and a depth of 6 inches.
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Combined Variation more than one type of variation The volume of a given mass of a gas varies directly as the temperature T and inversely as the pressure P. If the volume of the gas is 220 cm 3 when T = 40˚C and P = 20 kg/cm 2, what is the volume when T = 35˚C and P = 10 kg/cm 2 ?
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Assignment 3.6page 4201 – 13 eoo, 29 – 45 eoo 3.7 page 430 1 – 29 eoo
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