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Example Questions
Example Question #141 : Integrals
Compute the following integral by using four equal left hand Riemann sums:
Riemann sums are simply estimating the area under the curve of our function using an approximation of a rectangle. The area of a rectangle is given by . Therefore, we need to figure both of these values for our four boxes and sum them all up. Since the boxes are equal, we can simply find the width by the following equation:
and are your integration limits, and refers to the number of boxes.
The length of all of our boxes is given by the function. Since, this is a left Riemann sums, we need to consider the left side of each integration interval.
For the lengths, we used -values of , since those are the starting points of our four intervals.
Example Question #91 : Riemann Sums
Approximate the following integral with four equal right Riemann sums:
Riemann sums are simply estimating the area under the curve of our function using an approximation of a rectangle. The area of a rectangle is given by . Therefore, we need to figure both of these values for our four boxes and sum them all up. Since the boxes are equal, we can simply find the width by the following equation:
and are your integration limits, and refers to the number of boxes.
The length of all of our boxes is given by the function. Since, this is a right Riemann sums, we need to consider the right side of each integration interval.
For the lengths, we used -values of , since those are the ending points of our four intervals.
Example Question #1 : Fundamental Theorem Of Calculus With Definite Integrals
Find the result:
Set . Then , and by the chain rule,
By the fundamental theorem of Calculus, the above can be rewritten as
Example Question #141 : Integrals
Find the result:
Set . Then by the chain rule,
By the Fundamental Theorem of Calculus, the above is equal to
Example Question #142 : Integrals
Find the result:
Set . Then and by the chain rule,
Example Question #1 : Fundamental Theorem Of Calculus
Evaluate :
By the Fundamental Theorem of Calculus, we have that . Thus, .
Example Question #142 : Integrals
Find the result:
Let . Then , and by the chain rule,
Example Question #144 : Integrals
Find the result:
Set . Then .
By the chain rule,
By the Fundamental Theorem of Calculus, the above is equal to
.
Example Question #145 : Integrals
Find the result:
Set . Then .
By the chain rule,
By the Fundamental Theorem of Calculus, the above is equal to
.
Example Question #2 : Fundamental Theorem Of Calculus
Evaluate when .
Via the Fundamental Theorem of Calculus, we know that, given a function, .
Therefore .
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