Find all local extreme values of the given function and identify each as a local maximum, local minimum, or saddle point. f(x.y) = (x2 - 4)² + (² - 100)? O A. f(0,0) = 10,016, local maximum; f(0,10) = 16, saddle point; f(2,0) = 10,000, saddle point; f(2,10) = 0, local minimum; f(-2, - 10) = 0, local minimum O B. f(0,0) = 10,016, local maximum; f(0,10) = 16, saddle point; f(0, - 10) = 16, saddle point; f(2,0) = 10,016, saddle point; f(2,10) = 0, local minimur f(2, - 10) = 0, local minimum; f(- 2,0) = 10,000, saddle point; f(- 2,10) = 0, local minimum; f(- 2, - 10) = 0, local minimum O c. f(0,0) = 10,016, local maximum; f( - 2, - 10) 0, local minimum O D. f(0,0)= 10,016, local maximum; f(2,10) = 0, local minimum; f(2, - 10) = 0, local minimum; f(- 2,10) = 0, local minimum; f(-2, - 10)= 0, local minimum

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Find all local extreme values of the given function and identify each as a local maximum, local minimum, or saddle point. f(x.y) = (x² – 4)² + (y² – 100) ² O A. f(0,0)= 10,016, local maximum; f(0,10) = 16, saddle point; f(2,0) = 10,000, saddle point; f(2,10) = 0, local minimum; f(- 2,- 10) = 0, local minimum O B. f(0,0)=10,016, local maximum, f(0,10) = 16, saddle point; f(0, - 10) = 16, saddle point; f(2,0) = 10,016, saddle point; f(2,10) = 0, local minimum, f(2,-10)3D0, local minimum; f(- 2,0) = 10,000, saddle point; f(- 2,10)= 0, local minimum; f(-2,- 10)= 0, local minimum O C. f(0,0)=10,016, local maximum, f(-2, - 10) = 0, local minimum O D. f(0,0)= 10,016, local maximum, f(2,10) = 0, local minimum; f(2, - 10) = 0, local minimum; f(- 2,10) = 0, local minimum; f(- 2,– 10) = 0, local minimum a 99+ hp