QuestionEvaluate the integral below by interpreting it in terms of areas. In other words, draw a picture of the region the integral represents, and find the area using geometry.
Studdy Solution
STEP 1
1. The integral represents the area under the curve from to .
2. The function describes a semicircle with radius 5 centered at the origin.
STEP 2
1. Identify the geometric shape represented by the integral.
2. Calculate the area of the geometric shape.
STEP 3
Recognize that the function is the equation of the upper half of a circle centered at the origin with radius 5. This is because the equation describes a circle with radius 5, and is the positive square root, representing the upper semicircle.
STEP 4
The integral represents the area under the upper semicircle from to . The area of a full circle with radius 5 is given by the formula . Therefore, the area of the semicircle is half of that:
The area represented by the integral is:
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