Mada za sehemu hiiIntergrationMada 4
- The Anti Derivative
- Indefinite Intergral
- The Definite Integral
- Application Of Integrations
The definite integral
Introduction to definite integrals
The definite integral of a function represents the signed area under the curve of the function between two specified limits. It calculates the accumulated value (such as area) from a starting point to an endpoint.
The general form of a definite integral is:
Where:
- is the integral symbol.
- is the function to integrate.
- indicates the variable of integration.
- is the lower limit of integration.
- is the upper limit of integration.
- is the antiderivative of .
Properties of definite integrals
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Zero width interval:
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Reversing limits:
-
Additivity over intervals:
-
Constant multiple rule:
Step-by-step examples
Example 1:
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Find the antiderivative of using the Power Rule:
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Apply the limits:
-
Simplify:
-
Final Answer: 8
Example 2:
-
Find the antiderivative:
-
Apply the limits:
-
Simplify:
-
Final Answer: 4
Example 3:
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Find the antiderivative:
-
Apply the limits:
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Evaluate the cosine:
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Simplify:
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Final Answer: 2
Geometric interpretation of definite integrals
The definite integral measures the net area under the curve of a function between two points:
- Areas above the x-axis are positive.
- Areas below the x-axis are negative.
- If necessary, insert a graph showing the shaded region under the curve.
Fundamental theorem of calculus
This theorem connects differentiation and integration:
Where is any antiderivative of .
Example with absolute value function
Example 4:
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Split the integral due to the absolute value:
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Integrate each part:
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Apply limits:
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Simplify:
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Final Answer: 1
Important notes on definite integrals
- The result of a definite integral is a number, not a function.
- The constant of integration is not included in definite integrals.
- Areas below the x-axis contribute negatively to the total area.
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