Question: Prove that as where (x, y) approaches L 1 and g(x, y) approaches L 2 as(x, y) (a, b). lim [f(x, y) + g(x,
Prove that
![lim [f(x, y) + g(x, y)] = L + L (x, y)(a,](https://dsd5zvtm8ll6.cloudfront.net/si.question.images/images/question_images/1679/8/8/3/8096420fe21bbcaa1679883809497.jpg){kind=small}
as where ƒ(x, y) approaches L1 and g(x, y) approaches L2 as(x, y) → (a, b).
lim [f(x, y) + g(x, y)] = L + L (x, y)(a, b)
Step by Step Solution
★★★★★
3.47 Rating (150 Votes )
There are 3 Steps involved in it
1 Expert Approved Answer
Step: 1 Unlock
Because lim fx y L then for 82 0 there corresponds 8 0 such that fx ... View full answer
Question Has Been Solved by an Expert!
Get step-by-step solutions from verified subject matter experts
Step: 2 Unlock
Step: 3 Unlock