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Example Questions
Example Question #91 : How To Find Midpoint Riemann Sums
Using the method of midpoint Riemann sums, approximate the integral using three midpoints.
A Riemann sum integral approximation over an interval with subintervals follows the form:
It is essentially a sum of rectangles each with a base of length and variable heights , which depend on the function value at a given point .
We are approximating
So the interval is , the subintervals have length , and since we are using the midpoints of each interval, the x-values are
Example Question #92 : How To Find Midpoint Riemann Sums
Approximate the integral using the method of midpoint Riemann sums and four midpoints.
A Riemann sum integral approximation over an interval with subintervals follows the form:
It is essentially a sum of rectangles each with a base of length and variable heights , which depend on the function value at a given point .
We are approximating
So the interval is , the subintervals have length , and since we are using the midpoints of each interval, the x-values are
Example Question #93 : How To Find Midpoint Riemann Sums
Using the method of midpoint Riemann sums, approximate the integral using four midpoints.
A Riemann sum integral approximation over an interval with subintervals follows the form:
It is essentially a sum of rectangles each with a base of length and variable heights , which depend on the function value at a given point .
We're approximating
So the interval is , the subintervals have length , and since we are using the midpoints of each interval, the x-values are
Example Question #94 : Midpoint Riemann Sums
Using the method of midpoint of Reimann sums, approximate the integral using three midpoints.
A Reimann sum integral approximation over an interval with subintervals follows the form:
It is essentially a sum of rectangles each with a base of length and variable heights , which depend on the function value at a given point .
We're approximating
So the interval is , the subintervals have length , and since we are using the midpoints of each interval, the x-values are
Example Question #94 : How To Find Midpoint Riemann Sums
Using the method of midpoint Reimann sums, approximate the integral using four midpoints.
A Reimann sum integral approximation over an interval with subintervals follows the form:
It is essentially a sum of rectangles each with a base of length and variable heights , which depend on the function value at a given point .
We're approximating
So the interval is , the subintervals have length , and since we are using the midpoints of each interval, the x-values are
Example Question #91 : How To Find Midpoint Riemann Sums
Using the method of midpoint Reimann sums, approximate the integral using two midpoints.
A Reimann sum integral approximation over an interval with subintervals follows the form:
It is essentially a sum of rectangles each with a base of length and variable heights , which depend on the function value at a given point .
We're approximating
So the interval is , the subintervals have length , and since we are using the midpoints of each interval, the x-values are
Example Question #96 : How To Find Midpoint Riemann Sums
Using the method of midpoint Reimann sums, approximate the integral using three midpoints.
A Reimann sum integral approximation over an interval with subintervals follows the form:
It is essentially a sum of rectangles each with a base of length and variable heights , which depend on the function value at a given point .
We're approximating
So the interval is , the subintervals have length , and since we are using the midpoints of each interval, the x-values are
Example Question #97 : How To Find Midpoint Riemann Sums
Using the method of midpoint Reimann sums, approximate the integral using three midpoints.
A Reimann sum integral approximation over an interval with subintervals follows the form:
It is essentially a sum of rectangles each with a base of length and variable heights , which depend on the function value at a given point .
We're approximating
So the interval is , the subintervals have length , and since we are using the midpoints of each interval, the x-values are
Example Question #98 : How To Find Midpoint Riemann Sums
Using the method of midpoint Reimann sums, approximate the integral using four midpoints.
A Reimann sum integral approximation over an interval with subintervals follows the form:
It is essentially a sum of rectangles each with a base of length and variable heights , which depend on the function value at a given point .
We're approximating
So the interval is , the subintervals have length , and since we are using the midpoints of each interval, the x-values are
Example Question #99 : How To Find Midpoint Riemann Sums
Using the method of midpoint Reimann sums, approximate the integral using three midpoints.
A Reimann sum integral approximation over an interval with subintervals follows the form:
It is essentially a sum of rectangles each with a base of length and variable heights , which depend on the function value at a given point .
We're approximating
So the interval is , the subintervals have length , and since we are using the midpoints of each interval, the x-values are
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