The graph below shows the derivative F' (t). If F (0) = 5, find the values of F (2), F (5), and F (6). Graph F (t). (Note: Make sure you graph the "anchor" points of F (t) fairly; i.e., don't draw your curve flat if the derivative is not zero and vice versa.) F'(t) Area = 5 Area = 10 5 Area = 16 2.

The graph below shows the derivative F' (t). If F (0) = 5, find the values of F (2), F (5), and F (6). Graph F (t). (Note: Make sure you graph the "anchor" points of F (t) fairly; i.e., don't draw your curve flat if the derivative is not zero and vice versa.) F'(t) Area = 5 Area = 10 5 Area = 16 2.

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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Equations and Inequations

Equations and inequalities describe the relationship between two mathematical expressions.

Linear Functions

A linear function can just be a constant, or it can be the constant multiplied with the variable like x or y. If the variables are of the form, x2, x1/2 or y2 it is not linear. The exponent over the variables should always be 1.

Question

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I don't understand. Please include graph when answering.

The graph below shows the derivative F' (t). If F (0) = 5, find the values of F (2), F (5), and
F (6). Graph F (t). (Note: Make sure you graph the "anchor" points of F (t) fairly; i.e., don't draw
your curve flat if the derivative is not zero and vice versa.)
F'(t)
Area = 5
Area = 10
%3D
%3D
1
2.
5.
Area = 16
3.

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