2
answers
0
watching
259
views
12 Nov 2019
Consider the lim as x,y approaches (0,0) (x^2+y^2)/xy
Consider the lim as x,y approaches (0,0) (x^2+y^2)/xy 6. Consider lim (x,y) right arrow (0,0) x^2+y^2/xy (see figure). (a) Determine (if possible) the limit along any line of the form y = ax. (Assume a not integral 0. If an answer does not exist, enter DNE.) (b) Determine (if possible) the limit along the parabola y = x^2. (If an answer does not exist, enter DNE.) (c) Does the limit exist? Explain. Yes, the limit exists. The limit Is the same regardless of which path is taken. No, the limit does not exist. Different paths result in different limits. Submit Answer Save Progress
Consider the lim as x,y approaches (0,0) (x^2+y^2)/xy
Consider the lim as x,y approaches (0,0) (x^2+y^2)/xy 6. Consider lim (x,y) right arrow (0,0) x^2+y^2/xy (see figure). (a) Determine (if possible) the limit along any line of the form y = ax. (Assume a not integral 0. If an answer does not exist, enter DNE.) (b) Determine (if possible) the limit along the parabola y = x^2. (If an answer does not exist, enter DNE.) (c) Does the limit exist? Explain. Yes, the limit exists. The limit Is the same regardless of which path is taken. No, the limit does not exist. Different paths result in different limits. Submit Answer Save Progress
7 Sep 2022
Nestor RutherfordLv2
29 Mar 2019
Already have an account? Log in