- #1
pantin
- 20
- 0
Homework Statement
Consider the function f:R^2->R defined by f(x,y)=[e^(x+y)]-y+x. Is there an absolute maximum value of f on the set s={(x,y):/x/+/y/<=2}? Justify.
note, /x/ is the absolute value of x.
Homework Equations
a. If f is con't, it takes compact sets to compact sets.
b.Extreme value thm: Suppose s belongs to R^n is compact and f: s->R is continuous. then f has an absolute min value and an absolute max value on S
The Attempt at a Solution
My idea is
=>show s is bounded and closed => therefore compact => f con't maps compact sets to compact sets => EVT
but I encounted problem when finding boundary of s
/x/+/y/<=2 that means /x/<=2 when y=0 and /y/<=2 when x=0. then can I find the boundary here by constructing a circle with x and y? because I saw other example did it on this way.
Help..