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Additional exercises 3

Exercise

Consider the scalar field

f(x,y)=y4+3x24xy5y+81.

Calculate the Hessian matrix at the point (2,1).

Exercise

Consider the scalar field f(x,y)=8sinxsiny. Calculate the second order Taylor approximation of f at the point (π2,π2). Use that:

f(x)f(a)+f(a)(xa)+12(xa) Hf(a) (xa)T.

Exercise

Locate and classify the extrema points of the scalar field

f(x,y)=x4+3xy+2y2+1.

Exercise

Locate and classify the stationary points of the scalar field

f(x,y)=2x2xy3y23x+7y+11.

Exercise

Locate and classify the stationary points of the scalar field

f(x,y,z)=2e(x1)2(y44yz+2z2).

Exercise

Find the absolute minimum and absolute maximum of f(x,y)=(9x21)(1+4y) on the rectangle given by 2x3, 1y4.

Exercise

Apply the Lagrange multiplier method to find the points on the curve x2+xy+y2=21 which are closest / furthest to the origin. Out of curiosity, sketch the curve and identify the extrema points found.

Exercise

Apply the Lagrange multiplier method to find the points on the curve of intersection of the two surfaces

x2xy+y2z2=4,x2+y2=4

which are nearest the origin.

Exercise

Apply the Lagrange multiplier method to find the extrema of f(x,y,z)=yz+xy subject to the constraints xy=1 and y2+z2=1.