Evaluating Integrals: Additive Interval Property

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SUMMARY

The discussion focuses on evaluating integrals using the additive interval property. Given the equations ∫07 f(x) dx = 8 and ∫17 f(x) dx = -3, participants confirm that the area under the curve from x = 0 to x = 1 can be calculated as ∫01 f(x) dx = ∫07 f(x) dx - ∫17 f(x) dx, resulting in a value of 11. The correct application of the additive property leads to the conclusion that the area from x = 0 to x = 1 is indeed 11.

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  • Understanding of the additive interval property of integrals
  • Basic knowledge of definite integrals
  • Familiarity with the notation of integrals
  • Ability to manipulate algebraic expressions
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Homework Statement




Given
7 f(x) dx= 8
0

7 f(x) dx = −3
1

evaluate the following.

1 f(x) dx
0



Homework Equations


n/a


The Attempt at a Solution



I'm a little confused on how to approach this problem. Do i use the additive interval property of integrals?
 
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mathpat said:

Homework Statement




Given
7 f(x) dx= 8
0

7 f(x) dx = −3
1

evaluate the following.

1 f(x) dx
0



Homework Equations


n/a


The Attempt at a Solution



I'm a little confused on how to approach this problem. Do i use the additive interval property of integrals?
Yes.
 
I ended up with 5. Is that correct?
 
Last edited:
mathpat said:
I ended up with 5. Is that correct?
So 5 + (-3) = 8?
 
To expand on what Mark44 is saying, remember that these integrals represent areas under your curve, f(x). If you know how much area is under the curve between x = 0 and x = 7 and also know how much area is under the curve between x = 1 and x = 7, can you intuitively decide how to find the area between x = 0 and x = 1?
 
Yea I understand but when I use the formula i keep getting 5. I don't see where I'm going wrong.
 
\int_0^7 f(x) dx = \int_0^1 f(x) dx + \int_1^7 f(x) dx. What happens when you plug in what you know?
 
I calculated 11 using that formula.
 
Good, that's right.
 
  • #10
Thanks
 

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