QuestionUse the Trapezoidal Rule to find using the indicated value of . Round to three decimal places. A. B. C. D.
Studdy Solution
STEP 1
What is this asking? We need to approximate the area under the curve from to using the Trapezoidal Rule with four trapezoids. Watch out! Don't forget to divide the interval into equal parts and be careful with the function values at each point!
STEP 2
1. Calculate Delta x
2. Calculate Function Values
3. Apply the Trapezoidal Rule
STEP 3
Alright, let's **start** by finding the width of each trapezoid, which we call .
This is like slicing our interval from to into **four** equal pieces.
STEP 4
The formula for is , where **'a'** is the **start** of our interval (), **'b'** is the **end** (), and **'n'** is the number of trapezoids ().
STEP 5
So, .
Each trapezoid will have a width of **0.25**.
STEP 6
Now, we need the height of each trapezoid.
We get these heights by plugging the values at the edges of each trapezoid into our function, .
STEP 7
Our values are , , , , and .
Let's plug them in!
STEP 8
* * * * *
STEP 9
The Trapezoidal Rule is:
STEP 10
Let's plug in our values:
STEP 11
Rounding to three decimal places, we get .
STEP 12
The answer is A, .
Was this helpful?