Q. 4

Question

Explain why it makes sense that every Riemann sum for a continuous function f on an interval $[a, b]$ approaches the same number as the number n of rectangles approaches infinity. Illustrate your argument with graphs.

Step-by-Step Solution

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Answer

When a result, as the number n of rectangles approaches infinity, any Reimann sum for a continuous function f on an interval $[a, b]$ approaches the same value.

1Step 1. Given information

They had given that all the Riemann sums for a function approachessame number as the n approaches to infinity.

2Step 2. Prove

A Reimann sum is a discrete sum of rectangle areas with each rectangle being infinitely thin.

The finite sum of things becomes the $(\int)$ integral as n approaches infinity, accumulating everything from $x = a$ to $x = b$ .

When a result, as the number n of rectangles approaches infinity, any Reimann sum for a continuous function f on an interval $[a, b]$ approaches the same value.

Q. 4

Q. 5

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