How to find the area of two simple figures to evaluate the integral from -3 to 0

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    Area Integral
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Homework Help Overview

The discussion revolves around evaluating an integral from -3 to 0 by interpreting it in terms of areas related to two simple geometric figures. The integral involves the function 1 + sqrt(9 - x^2), which suggests a connection to circular geometry due to the square root term.

Discussion Character

  • Exploratory, Assumption checking, Problem interpretation

Approaches and Questions Raised

  • Participants discuss the need to graph the function to better understand the geometric interpretation of the integral. There is a suggestion to separate the integral into two parts to simplify the area calculation.

Discussion Status

Some participants have provided guidance on the importance of graphing the function and recognizing the geometric shapes involved. There is an ongoing exploration of how to correctly interpret the integral in terms of area rather than focusing on finding an antiderivative.

Contextual Notes

Participants note that the original approach of finding an antiderivative may not be appropriate for this problem, emphasizing the need to focus on area calculations instead. There is a suggestion to use basic area formulas for the geometric figures represented by the integrals.

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Homework Statement


Evaluate the integral by intrepreting it in terms of areas

from -3 to 0

(1+ sqrt(9-x2)dx

Homework Equations



integral = F(0)-F(-3)

The Attempt at a Solution



first find F

F = x - [(9-x2)3/2]/3

I solved using integral = F(0)-F(-3)

and I got the incorrect answer I think it is because I am finding the definite integral and not the area. If this was my problem how would I find the area? Graphing?
 
Last edited:
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Yes - graph it. The function defines a fairly simple geometric object.

BTW, your work finding an antiderivative, besides not being the direction you're supposed to go, is incorrect. If you take the derivative of the function you found, you don't get 1 + sqrt(9 -x^2)
 
ok i changed it i think its right now and i will try to graph it
 
If you want to get credit for your work, the first thing you should do is graph your function. This problem has nothing to do with finding antiderivatives.
 
It would help to think of this as two separate integrals:
\int_{-3}^0 1+ \sqrt{9- x^2} dx= \int_{-3}^0 1 dx+ \int_{-3}^0 \sqrt{9- x^2} dx
Graph each, if necessary, to recognise that those are simple figures and use basic area formulas.
 

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