How do I find lim_((x,y) to (5,4)) e^sqrt (3x^2+2y^2), if it exists? Calculus Limits Determining Limits Graphically 1 Answer Massimiliano Mar 22, 2015 The answer is: e^sqrt107. In fact: lim_((x,y) to (5,4)) e^sqrt (3x^2+2y^2)=e^(sqrt(3*25+2*16))=e^sqrt107. Answer link Related questions How do you find lim_(x->5)(x^2+2) using a graph? How do i graph limits? How do you find limits on a graphing calculator? How do you use a graph to determine limits? What is the limit as x approaches infinity of a constant? What is the limit as x approaches infinity of 6cos(x)? What is the limit as x approaches infinity of 1.001^x? What is the limit as x approaches 0 of x/arctan(4x)? What is the limit as x approaches 0 of cotx/lnx? What is the limit as x approaches 0 of (1+2x)^cscx? See all questions in Determining Limits Graphically Impact of this question 4155 views around the world You can reuse this answer Creative Commons License