The critical Points of f(x,y)=x^{3}-3x+3y^{2}-6y are

aflacatn

aflacatn

Answered question

2021-09-28

The critical Points of f(x,y)=x33x+3y26y are:

Answer & Explanation

crocolylec

crocolylec

Skilled2021-09-29Added 100 answers

Step 1
The critical points of a function f(x, y) can be obtained by solving the partial derivatives fx=0 and fy=0.
The given function is f(x,y)=x33x+3y26y.
Evaluate fx=0 as follows.
fx=0
x(x33x+3y26y)=0
3x23+00=0
3x2=3
x2=1
x=-1 and x=1
Thus, the values of x are -1 and 1.
Step 2
Evaluate fy=0 as follows.
fy=0
y(x33x+3y26y)=0
0+0+6y-6=0
6y=6
y=1
Thus, the value of y is 1.
Therefore, the critical points of the given function are (-1, 1) and (1,1).

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