The function z = (x^2 + y^2) / (x + y) is being analyzed to determine its degree. The degree of a rational function is the difference between the highest exponent of the variables in the numerator and the highest exponent in the denominator. Since the highest exponent in the numerator is 2 and the highest exponent in the denominator is 1, the degree of this function is 2.
The function z = (x^2 + y^2) / (x + y) is being analyzed to determine its degree. The degree of a rational function is the difference between the highest exponent of the variables in the numerator and the highest exponent in the denominator. Since the highest exponent in the numerator is 2 and the highest exponent in the denominator is 1, the degree of this function is 2.
The function z = (x^2 + y^2) / (x + y) is being analyzed to determine its degree. The degree of a rational function is the difference between the highest exponent of the variables in the numerator and the highest exponent in the denominator. Since the highest exponent in the numerator is 2 and the highest exponent in the denominator is 1, the degree of this function is 2.
The function z = (x^2 + y^2) / (x + y) is being analyzed to determine its degree. The degree of a rational function is the difference between the highest exponent of the variables in the numerator and the highest exponent in the denominator. Since the highest exponent in the numerator is 2 and the highest exponent in the denominator is 1, the degree of this function is 2.