By considering different paths of approach, show that the function below has no limit as (x.y)-(0,0). f(x.y)= Examine the values of f along curves that end at (0,0). Along which set of curves isfa constant value? O A. y= kx, x0 O B. y= kx + ox?, x0 Oc. y=kx?, x+0 OD. y=kx, x0 If (x.y) approaches (0,0) along the curve when k=1 used in the set of curves found above, what is the limit? O (Simplify your answer.) If (x.y) approaches (0,0) along the curve when k=0 used in the set of curves found above, what is the limit? O(Simplify your answer.) What can you conclude? O A. Since f has two different limits along two different paths to (0,0), in cannot be determined whether or not f has a limit as (x.y) approaches (0,0). O B. Since f has the same limit along two different paths to (0,0), by the two-path test, f has no limit as (x,y) approaches (0,0). OC. Since f has two different limits along two different paths to (0,0), by the two-path test, f has no limit as (x.y) approaches (0,0). O D. Since f has the same limit along two different paths to (0,0), in cannot be determined whether or not f has a limit as (x.y) approaches (0,0).
By considering different paths of approach, show that the function below has no limit as (x.y)-(0,0). f(x.y)= Examine the values of f along curves that end at (0,0). Along which set of curves isfa constant value? O A. y= kx, x0 O B. y= kx + ox?, x0 Oc. y=kx?, x+0 OD. y=kx, x0 If (x.y) approaches (0,0) along the curve when k=1 used in the set of curves found above, what is the limit? O (Simplify your answer.) If (x.y) approaches (0,0) along the curve when k=0 used in the set of curves found above, what is the limit? O(Simplify your answer.) What can you conclude? O A. Since f has two different limits along two different paths to (0,0), in cannot be determined whether or not f has a limit as (x.y) approaches (0,0). O B. Since f has the same limit along two different paths to (0,0), by the two-path test, f has no limit as (x,y) approaches (0,0). OC. Since f has two different limits along two different paths to (0,0), by the two-path test, f has no limit as (x.y) approaches (0,0). O D. Since f has the same limit along two different paths to (0,0), in cannot be determined whether or not f has a limit as (x.y) approaches (0,0).
Calculus: Early Transcendentals
8th Edition
ISBN:9781285741550
Author:James Stewart
Publisher:James Stewart
Chapter1: Functions And Models
Section: Chapter Questions
Problem 1RCC: (a) What is a function? What are its domain and range? (b) What is the graph of a function? (c) How...
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