QuestionThe Differential of a Function.
Find the differential of the given function. Then, evaluate the differential at the indicated values.
If then the differential of is
Note: Type for the differential of
Evaluate the differential of at
Note: Enter your answer accurate to 4 decimal places if it is not an Integrer.
Studdy Solution
STEP 1
What is this asking?
We need to find a formula for the *tiny change* in when there's a *tiny change* in , given that .
Then, we need to calculate this tiny change in when is **4.71239** and the tiny change in is **0.3**.
Watch out!
Remember the product rule for derivatives!
Also, make sure your calculator is in **radians** mode when evaluating the cosine function.
STEP 2
1. Find the Differential
2. Evaluate at Given Values
STEP 3
We are given the function .
STEP 4
To find the differential, we need to find the derivative of with respect to .
Since is a product of two functions, and , we'll use the **product rule**:
STEP 5
The derivative of with respect to is simply **1**.
The derivative of with respect to is .
So,
STEP 6
The differential is given by:
STEP 7
We are given and .
Let's plug these values into our differential:
STEP 8
Using a calculator in **radians** mode: , and .
STEP 9
Substituting these values back into the equation: Rounding to 4 decimal places, we get .
STEP 10
The differential of is . At and , the differential is approximately .
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