Approximating Area Riemann Sums

17

53

15

44

To approximate the area under a curve

To find the exact value of an integral

To solve differential equations

To calculate the derivative of a function

They can approximate the area under a curve by summing the areas of rectangles.

They can only be used with continuous functions.

They provide an exact value for the area under a curve.

They are more accurate than the Trapezoidal Rule and Simpson's Rule for all functions.

Riemann sum

definite integral

summation notation

sum of a series

37/60 units²

47/60 units²

75/81 units²

3/5 units²

5(3) + 1(4) + 2(5) + 1(7)

5(4) + 1(5) + 2(7) + 1(6)

5(3) + 6(4) + 8(5) + 9(7)

0(3) + 5(4) + 6(5) + 8(7)

approximate the area under a curve. The more rectangles, the better the approximation.

approximate the area under a curve. The less rectangles, the better the approximation.

approximate the area under a curve. The more rectangles, the worse the approximation.

11/4 units²

11/3 units²

4 units²

3 units²

37/60 units²

47/60 units²

75/81 units²

3/5 units²

approximate the area under a curve. The more rectangles, the better the approximation.

approximate the area under a curve. The less rectangles, the better the approximation.

approximate the area under a curve. The more rectangles, the worse the approximation.