f(x)=x2 defined on [0,1]. Let S5 be a Riemann sum for the function with 5 sub-divisions of equal length. By how much is the largest possible value of S5 greater than the smallest possible value of S5?
f(x)=x2 defined on [0,1]. Let S5 be a Riemann sum for the function with 5 sub-divisions of equal length. By how much is the largest possible value of S5 greater than the smallest possible value of S5?
Chapter3: Functions
Section3.3: Rates Of Change And Behavior Of Graphs
Problem 2SE: If a functionfis increasing on (a,b) and decreasing on (b,c) , then what can be said about the local...
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Let f(x)=x2 defined on [0,1]. Let S5 be a Riemann sum for the function with 5 sub-divisions of equal length. By how much is the largest possible value of S5 greater than the smallest possible value of S5?
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