11. If the graph of the polynomial function is falling to the left and also falling to the right, which ofthe following is true?A. The degree of the polynomial is odd and the leading coefficient is positive.B. The degree of the polynomial is odd and the leading coefficient is negative.C. The degree of the polynomial is even and the leading coefficient is positive.D. The degree of the polynomial is even and the leading coefficient is negative.

We have the following 4 cases for a polynomial whose leading term is anxn: If n is odd then and…

Answered: 11. If the graph of the polynomial…

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 graph of a higher order polynomial function may not intersect the x axis. Describe the characteristics of a higher order (greater than degree 2) polynomial that will not intersect the x axis. 1. Write the polynomial function in a standard and factored form. 2. Sketch the graph of the polynomial function, labeling key points on the graph and describe it's characteristics. 3. Describe how you know that graph will never intersect the x axis. 4. Change the polynomial into a higher order polynomial that will intersect the x axis and describe it's characteristics.
4. The function D(t) shown below represents Sally's distance from home over a 30-minute time period. 20+ 18+ 16+ 14- 12+ 10+ 8- 6 + 20 25 30 Time (minutes) a. Identify the vertical intercept of D(t). Write it as an ordered pair and explain its meaning in this situation. b. Identify the horizontal intercepts of D(t). Write them as an ordered pairs and explain their meaning in this situation. c. Determine D(15) and interpret its meaning in a complete sentence. d. For what value of t is D(t) = 5? Write a sentence explaining the meaning of your answer. e. Determine the practical domain of D(t). f. Determine the practical range of D(1). Distance from home (miles) 10

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