Question
Find the zero(s) at which "flattens out". Express the zero(s) as ordered pair(s)
Studdy Solution
STEP 1
What is this asking?
Find the points where this curvy function touches the x-axis and kinda hangs out there for a bit before crossing over or bouncing back.
Watch out!
Don't forget that "flattening out" means the function touches the x-axis *and* its slope is zero at that point!
This translates to a zero with a multiplicity greater than 1.
STEP 2
1. Find the zeros
2. Find their multiplicity
3. Express as ordered pairs
STEP 3
To find the zeros of , we need to figure out the values that make the whole function equal zero.
Let's **set** **equal to zero**:
STEP 4
Now, we have a product of factors equal to zero.
This means at least one of the factors *must* be zero.
So, we set each factor equal to zero and solve for :
So, our zeros are , , and .
Awesome!
STEP 5
The **multiplicity** of a zero tells us how many times that zero is a factor.
We can see the multiplicity by looking at the exponent of each factor.
STEP 6
For , the factor is , and the exponent is **2**.
So, the multiplicity of is **2**.
For , the factor is , and the exponent is **3**.
So, the multiplicity of is **3**.
For , the factor is , which can be thought of as , and the exponent is **1**.
So, the multiplicity of is **1**.
STEP 7
We're looking for the zeros where the function "flattens out." This happens when the multiplicity of the zero is greater than 1.
In our case, that's with multiplicity **2** and with multiplicity **3**.
STEP 8
Remember, an ordered pair is written as .
Since these are zeros, the value will be zero for both.
So, our ordered pairs are and .
Boom!
STEP 9
The zeros at which "flattens out" are and .
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