The limit of the function defined by (x,y) → (0,0) for the expression (x² + y²)/√(x² + y² + 1) - 1 is confirmed to be 2. Multiple approaches, including substituting y = 0 and y = x², yield consistent results. To further validate this limit, converting to polar coordinates is recommended, as it simplifies the evaluation by focusing on the distance to the origin (0,0) and assessing the limit as r approaches 0, ensuring independence from the angle θ.
PREREQUISITESStudents and educators in calculus, mathematicians focusing on multivariable analysis, and anyone seeking to deepen their understanding of limit evaluation techniques in mathematical expressions.
But is it in the denominator? Is this (x^2+ y^2)/(\sqrt{x^2+ y^2})+ 1 or (x^2+ y^2)/(\sqrt{x^2+ y^2}+ 1) ?th3plan said:Homework Statement
(x,y)---> (0,0)
x²+y²/√(x²+y²+1) - 1
the -1 isn't in the square root, so people know