Find:

1. f(x)= (6x^2-2)
_______
x^3

2. f(x)= (x^2-4)^1/3

A. Domain
B. Intercepts
C. Asymptotes, behaviour and check for crossing where applicable
D. Critical Number(s)
E. Interval of Increase/Decrease
F. Local Extrema
G. Concavity and Points of Inflection

Thank you!!

1 answer

A. #1 -- all reals except where the denominator is zero

#2. all reals, since it's an odd root

B. #1 - where the numerator is zero
#2. so easy

C. #1 where the denominator is zero
#2 none

D. #1 f' = 6(1-x^2)/x^4
#2. f' = 2x/(3((x^2-4)^2/3) where is the numerator = 0?

E. See D, and check sign of f'
F. See D and check where f'=0

G #1. f" = 12(x^2-2)/x^5
#2. f" = -2(x^2+12)/(9((x^2-4)^5/3)
inflection where f"=0
concave up where f" > 0

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Did you know?

Did you know that when analyzing a function, there are various key elements to consider? These include the domain, intercepts, asymptotes, critical numbers, intervals of increase/decrease, local extrema, concavity, and points of inflection. By understanding these components, we can gain valuable insights into the behavior and characteristics of a function. For example, we can determine the possible values for x, identify where the function crosses the x or y axis, explore the presence of asymptotes and their behavior, pinpoint critical points where the function's derivative is zero or undefined, analyze intervals where the function is increasing or decreasing, locate local extrema such as maximum or minimum points, and examine changes in concavity and points of inflection. By considering all these aspects, we can better comprehend and interpret the behavior of functions like f(x) = (6x^2-2)/(x^3) and f(x) = (x^2-4)^(1/3), enhancing our mathematical knowledge and problem-solving skills.