Values for f(x) = e¬® – 1 + x are given in table.0.811.21.4f(x) | 0.250.370.5 0.65a) Use forward-difference and backward-difference formulas to approximatef'(1)b) Use three-point formulas to approximate f'(1) and find error bounds forthe three-point midpoint formula.2. Let f(x) = x² ln x + 1. Use the second derivative formula to approximatef"(1) when h = 0.2.

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Values for f(x) = e-ª – 1+x are given in table. 1.2 1.4 f(x) | 0.25 | 0.37 | 0.5 | 0.65 0.8 1 a) Use forward-difference and backward-difference formulas to approximate f'(1)

Calculus For The Life Sciences

2nd Edition

ISBN:9780321964038

Author:GREENWELL, Raymond N., RITCHEY, Nathan P., Lial, Margaret L.

Publisher:GREENWELL, Raymond N., RITCHEY, Nathan P., Lial, Margaret L.

Chapter4: Calculating The Derivative

Section4.CR: Chapter 4 Review

Problem 4CR: Determine whether each of the following statements is true or false, and explain why. The derivative...

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Concept explainers

Rate of Change

The relation between two quantities which displays how much greater one quantity is than another is called ratio.

Slope

The change in the vertical distances is known as the rise and the change in the horizontal distances is known as the run. So, the rise divided by run is nothing but a slope value. It is calculated with simple algebraic equations as:

Question

Values for f(x) = e¬® – 1 + x are given in table.
0.8
1
1.2
1.4
f(x) | 0.25
0.37
0.5 0.65
a) Use forward-difference and backward-difference formulas to approximate
f'(1)
b) Use three-point formulas to approximate f'(1) and find error bounds for
the three-point midpoint formula.
2. Let f(x) = x² ln x + 1. Use the second derivative formula to approximate
f"(1) when h = 0.2.

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