Ask a New Question

Find the linearization L(x,y)of the function f(x,y) at P_0. Then find an upper bound for the magnitude |E| of the error in the approximation f(x,y)=L(x,y) over the rectangle R.

f(x,y) = (1/2)x^2 + xy + (1/4)y^2 + 3x - 3y + 4 at P_0(2,2),R:|x-2|<=0.1, |y-2|<= 0.1

Ask a New Question or answer this question.

Similar Questions

Use the Upper Bound theorem to find an integral upper bound and the Lower Bound Theorem to find an integral lower bound of the
1. 0 answers
Hi, I am in need of some help.How would I find the derivative of the function: f(x) = int e^sin(t) dt if the upper bound is x^2
1. 1 answer
Determine whether the function f(x)[x+1] is odd, even, or neither.Answer: neither odd nor even 2)Find the least integral upper
1. 0 answers
Determine whether the function f(x)[x+1] is odd, even, or neither.Answer: neither odd nor even 2)Find the least integral upper
1. 0 answers

more similar questions