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Basic Applied Mathematics 1

The Definite Integral

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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:

abf(x)dx=F(b)F(a)\int_a^b f(x)\, dx = F(b) - F(a)

Where:

  • \int is the integral symbol.
  • f(x)f(x) is the function to integrate.
  • dxdx indicates the variable of integration.
  • aa is the lower limit of integration.
  • bb is the upper limit of integration.
  • F(x)F(x) is the antiderivative of f(x)f(x).

Properties of definite integrals

  1. Zero width interval:

    aaf(x)dx=0\int_a^a f(x)\, dx = 0

  2. Reversing limits:

    abf(x)dx=baf(x)dx\int_a^b f(x)\, dx = -\int_b^a f(x)\, dx

  3. Additivity over intervals:

    acf(x)dx+cbf(x)dx=abf(x)dx\int_a^c f(x)\, dx + \int_c^b f(x)\, dx = \int_a^b f(x)\, dx

  4. Constant multiple rule:

    abkf(x)dx=kabf(x)dx\int_a^b k \cdot f(x)\, dx = k \cdot \int_a^b f(x)\, dx

Step-by-step examples

Example 1: 132xdx\int_1^3 2x\, dx

  1. Find the antiderivative of 2x2x using the Power Rule:

    2xdx=x2+C\int 2x\, dx = x^2 + C

  2. Apply the limits:

    F(3)F(1)=(32)(12)=91F(3) - F(1) = (3^2) - (1^2) = 9 - 1

  3. Simplify:

    88

  4. Final Answer: 8

Example 2: 02x3dx\int_0^2 x^3\, dx

  1. Find the antiderivative:

    x3dx=x44+C\int x^3\, dx = \frac{x^4}{4} + C

  2. Apply the limits:

    F(2)F(0)=244044=1640F(2) - F(0) = \frac{2^4}{4} - \frac{0^4}{4} = \frac{16}{4} - 0

  3. Simplify:

    44

  4. Final Answer: 4

Example 3: 0πsin(x)dx\int_0^\pi \sin(x)\, dx

  1. Find the antiderivative:

    sin(x)dx=cos(x)+C\int \sin(x)\, dx = -\cos(x) + C

  2. Apply the limits:

    F(π)F(0)=[cos(π)][cos(0)]F(\pi) - F(0) = [-\cos(\pi)] - [-\cos(0)]

  3. Evaluate the cosine:

    (1)(1)=1+1-(-1) - (-1) = 1 + 1

  4. Simplify:

    22

  5. Final Answer: 2

Geometric interpretation of definite integrals

The definite integral measures the net area under the curve of a function between two points:

  1. Areas above the x-axis are positive.
  2. Areas below the x-axis are negative.
  3. If necessary, insert a graph showing the shaded region under the curve.

Fundamental theorem of calculus

This theorem connects differentiation and integration:

abf(x)dx=F(b)F(a)\int_a^b f(x)\, dx = F(b) - F(a)

Where F(x)F(x) is any antiderivative of f(x)f(x).

Example with absolute value function

Example 4: 11xdx\int_{-1}^1 |x|\, dx

  1. Split the integral due to the absolute value:

    10xdx+01xdx\int_{-1}^0 -x\, dx + \int_0^1 x\, dx

  2. Integrate each part:

    (x22) from 1 to 0+(x22) from 0 to 1\left(-\frac{x^2}{2}\right) \text{ from } -1 \text{ to } 0 + \left(\frac{x^2}{2}\right) \text{ from } 0 \text{ to } 1

  3. Apply limits:

    +[1/20]=1/2+1/2+ [1/2 - 0] = 1/2 + 1/2

  4. Simplify:

    11

  5. Final Answer: 1

Important notes on definite integrals

  1. The result of a definite integral is a number, not a function.
  2. The constant of integration CC is not included in definite integrals.
  3. Areas below the x-axis contribute negatively to the total area.

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