An area is bounded by functions f1(x) from above and f2(x) from below. The numerical samples from functions f1(x)and f2(x) are given in the table below. Find the area bounded by the functions f1(x) and f2(x) by 3/8 numericalintegration rule.X134fl(x)1591312(x)1713a. Area=4.0O b. Area=4.5Oc. Area=5.25O d. Area=2.75e. Area=4.753.

Given: 38 numerical integration rule. To find: Area

Answered: An area is bounded by functions f1(x)…

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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The profit function (in dollars) for a product is given by P(x) = 8x° - 0.25x + 1000, 0
multivariate calculus Please note :For this question, please note that while you are finding dv/dx, y is a function of x, so is z. So you need to incorporate that information into the function v before you take the derivative. Like the lecture example, if you just take the derivative of v (without incorporating the other functions), you’re missing part of the process that includes other functions of x. It’s first important to plug in these other functions of x so that you’re taking the total derivative. Find the total derivative of V with respect to X. V=3X^3 + 5Y^2 +6Z Z=4+5X Y=3X+6Z+5XZ
2. Consider the function f(x)=x^3 a. Find df b. Find approximate values for (2.01)^3, ( 2.001)^3 and (2.0001)^3. Compare the values of ∆f and df for each case.
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