(x-5)%5E2(x-18)-0.jpeg "(x+9)(x-5)^2(x-18) 0")
Solving the Inequality: (x+9)(x-5)^2(x-18) > 0
This article will guide you through the process of solving the inequality (x+9)(x-5)^2(x-18) > 0. We'll use a combination of techniques to understand the solution set.
1. Finding the Critical Points
The critical points are the values of x where the expression equals zero. To find these points, set each factor equal to zero and solve:
- x + 9 = 0 => x = -9
- (x - 5)^2 = 0 => x = 5
- x - 18 = 0 => x = 18
Therefore, the critical points are x = -9, x = 5, and x = 18.
2. Creating a Sign Chart
A sign chart helps visualize the sign of the expression in different intervals defined by the critical points.
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Divide the Number Line: Draw a number line and mark the critical points (-9, 5, and 18). This divides the number line into four intervals:
- x < -9
- -9 < x < 5
- 5 < x < 18
- x > 18
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Choose Test Points: Select a test point within each interval. For example:
- x < -9: Choose x = -10
- -9 < x < 5: Choose x = 0
- 5 < x < 18: Choose x = 10
- x > 18: Choose x = 20
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Evaluate the Expression: Substitute each test point into the original expression (x+9)(x-5)^2(x-18) and determine the sign:
- x = -10: (-1)(-15)^2(-28) = Positive
- x = 0: (9)(-5)^2(-18) = Negative
- x = 10: (19)(5)^2(-8) = Negative
- x = 20: (29)(15)^2(2) = Positive
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Fill the Sign Chart: Mark the sign of the expression in each interval on the number line:
-----(-9)-----(5)-----(18)-----
+ - - +
3. Identifying the Solution
We want to find the intervals where (x+9)(x-5)^2(x-18) > 0. This means we're looking for the intervals where the expression is positive.
From the sign chart, we see that the expression is positive in the following intervals:
- x < -9
- x > 18
4. Accounting for Multiplicity
Notice that the factor (x-5)^2 has a multiplicity of 2. This means that the expression doesn't change sign at x = 5. It remains negative in the interval -9 < x < 5 and also in the interval 5 < x < 18.
5. The Final Solution
The solution to the inequality (x+9)(x-5)^2(x-18) > 0 is:
x < -9 or x > 18