Chapter 4: Q. 3 (page 215)
Every polynomial function of odd degree with real
coefficients has at least _______ real zero(s).
Every polynomial function of odd degree with real
coefficients has at least One real zero(s).
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United Parcel Service has contracted you to design a closed box with a square base that has a volume of cubic inches. See the illustration.
Part (a): Express the surface areaS of the box as a function ofx.
Part (b): Using a graphing utility, graph the function found in part (a).
Part (c): What is the minimum amount of cardboard that can be used to construct the box?
Part (d): What are the dimensions of the box that minimize the surface are?
Part (e): Why might UPS be interested in designing a box that minimizes the surface area?
One solution of the equation is .
Find the sum of the remaining solutions.
True or False. If the degree of the numerator of a rational function equals the degree of the denominator, then the ratio of the leading coefficients give rise to the horizontal asymptote.
Find the real zeros of f. Use the real zeros to factor f.
Find if,
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