Saturday, November 23, 2019
Stewartââ¬â¢s Calculus 8th Edition, Section 1.1, Question 3
Stewartââ¬â¢s Calculus 8th Edition, Section 1.1, Question 3 SAT / ACT Prep Online Guides and Tips This posts contains aTeaching Explanation. You can buyCalculus by Stewarthere. Why You Should Trust Me:Iââ¬â¢m Dr. Fred Zhang, and I have a bachelorââ¬â¢s degree in math from Harvard. Iââ¬â¢ve racked up hundreds and hundreds of hours of experienceworking withstudents from 5thgradethroughgraduate school, and Iââ¬â¢m passionate about teaching. Iââ¬â¢ve read the whole chapter of the text beforehand and spent a good amount of time thinking about what the best explanation is and what sort of solutions I would have wanted to see in the problem sets I assigned myself when I taught. Question:The graph of a function f is given.Page in 8th Edition: 19 Short Answers: f(1) = 3 f(-1) ~ -.3 f(x)=1 for x = 0 or 3 f(x)=0 for approximately x=-0.6 The domain of x are real numbers between -2 and 4 (or [-2,4], and the range are real numbers between -1 and 3, or [-1,3]. f is increasing on the interval [-2,1) Homework Answer:Same as Short Answers. Motivated Answers: The question is giving you the graph of the function f. This means that to figure out what f(x) is, we need to look at the y-value of the graph at x. To figure out f(1), we can take put a ruler vertically (up down) on the graph when x=1 and see how high the graph is, which is the same thing as the y-value of the graph. We can count boxes on the graph paper to see the y-value is 3. Just like a), we put a ruler vertically at x=-1, and the graph seems to show a y-value of about -.3 (it could be -0.2 or -0.5, but thatââ¬â¢s our best guess by eyeballing it). This means f(-1)~-0.3 The question wants us to find all values of x where f(x)=1. Since 1 is the output of f, and the output means to y-values, we can take a ruler, put it horizontally at 1, and look at where the ruler hits the graph. We see the rule hits the graph two times, once when x is 0, and another time when x = 3. We do the same thing as c), but put the ruler horizontally at 0, which happens to be the x-axis. The graph hits the ruler at x=-.6 approximately. You have to find the domain and range of f. The domain of any function is all valid inputs, or stated the same way, all valid x-values. We can see from the graph that the graph spans the x-range of -2 though 4 (we can count boxes). To write this in interval notation, we write the range is [-2,4]. We use solid brackets here because the graph seems to include the endpoints.The range of f is all valid outputs of f. Stated the same way, these are all valid y-values of the graph. We can see the graph spans the y-range of -1 through 3, or [-1,3]. If you look at the graph you can see that f seems to be increasing throughout the first part of it, from x-values of -2 to 1. Writing this in interval notation, we get [-2,1). We use a parenthesis ) instead of bracket ] because at the point 1, the function is no longer increasing. Video Solution: Get full textbook solutions for just $5/month. PrepScholar Solutions has step-by-step solutions that teach you critical concepts and help you ace your tests. With 1000+ top texts for math, science, physics, engineering, economics, and more, we cover all popular courses in the country, including Stewart's Calculus. Try a 7-day free trial to check it out.
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