QuestionGiven the graphs of and shown below and , determine the value of .
Studdy Solution
STEP 1
What is this asking?
We need to find given that and the graphs of and .
Watch out!
Don't forget that is the *derivative* of , and we'll need to use the **quotient rule**!
Also, we're dealing with graphs, so we'll need to find the values and slopes visually.
STEP 2
1. Define the function
2. Find the derivative
3. Evaluate at
STEP 3
We are given that .
This tells us how is related to and .
STEP 4
To find , we need to use the **quotient rule**.
Remember, the quotient rule says that if , then .
STEP 5
We want to find , so we **substitute** into our expression for :
STEP 6
Now, let's find the **individual values**.
From the graph of , we see that .
The slope of at is .
STEP 7
From the graph of , we see that .
The slope of at is .
STEP 8
**Substitute** these values into our expression for :
STEP 9
Therefore, .
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