How do you solve #(x-4)^5(x-5)(x+3)<0# using a sign chart?
2 Answers
Explanation:
Steps for solving using a sign chart:
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Factor the inequality
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Start with a relatively large value (greater than the largest zero) to determine where to start (positive or negative)
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On a number line, draw the zeros of the factored inequality.
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For each factor multiplied odd times, the curve should cross the number line at the zero. Otherwise, it touches the zero and bounces back.
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Figure out the proper ranges that satisfy the inequality base on the abstract sketch of the inequality
We can directly start with the 2nd step here:
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Evaluate the left-hand side with
#x=10# , and you get an apparently positive number. Therefore we should start from above the axis in the next step. -
Draw a number line with all the zeros:
#x=-3", "x=4", "x=5# (all of which should make the left-hand side#0# )
graph{(x+3)(x-4)(x-5) [-5,10, -10, 100]} -
As you can see, all of the factors multiples odd times. Thus the line goes "penetrates" the line at all points.
(here's a graph for your reference) -
The question requires negative values, so we take all segments under the number line (or
#x# -axis, if you want,) that is,#x in (-oo,-3) uu (4,5)#
The solution is
Explanation:
Let
Let's build the sign chart
Therefore,
graph{(x-4)^5(x-5)(x+3) [-18.02, 18.02, -9.01, 9.02]}
