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5. Let f : R2 + R be defined by f(x,y) = xyle=(x2+zº). Evaluate Sr2 f,...
Let f: R2 + R be defined by f(x, y) = xyle=(22+y?). Evaluate Sr2 f, if it exists
Let f : R2 + R be defined by f(x,y) = |xy|e-(z?+y?). Evaluate SR2 f, if it exists
Let f:R2→R be defined by f(x,y) =|xy|e−(x2+y2). Evaluate ∫R2f, if it exists Let f : R2 + R be defined by f(L,y) = [tyle=(3++y?). Evaluate Sir2 f, if it exists
Let f: R2 + R be defined by f(x, y) = xyle=(22+v?). Evaluate Sg2 f, if it exists
Let f : R2 + R be defined by f(L,y) = |kyle=(2²+y?). Evaluate /ik2 f, if it exists
1. Consider the unit circle: (x,y) : x2 y2 = 1. T. Let f R2 ->R be defined by f(x,y) = x2-y, and let F : R2 -> R be defined by F(x, y) Compute the integral of f and F around the unit circle. For the integral of F, proceed in the standard (anticlockwise) direction
1(a) Let f : R2 → R b constant M > 0 such that livf(x,y)|| (0.0)-0. Assume that there exists a e continuously differentiable, with Mv/r2 + уг, for all (z. y) E R2 If(x,y)| 〈 M(x2 + y2)· for all (a·y) E R2 Prove that: 1(a) Let f : R2 → R b constant M > 0 such that livf(x,y)|| (0.0)-0. Assume that there exists a e continuously differentiable, with Mv/r2 + уг, for all (z. y) E R2...
Let f(x, 2) Va r], (x1, X2) E R2. Determine all directions E R2 along (0,0) exists. which Let f(x, 2) Va r], (x1, X2) E R2. Determine all directions E R2 along (0,0) exists. which
(b) Let F: R2 + Rº be a vector field on R2 defined as F(x, y) = (3y, 22 – y). Suppose further that ^ C R2 is a curve in R2 consisting of the parabola y = 22 - 1 for 1 € (-1,0) and the straight line y = 1 – 1 for 1 € [0,1]. (i) Sketch the curvey in R2 [2] (ii) By considering the curve y piecewise, compute the vector field integral: [5] F(x). F(x)...
5. Let f: R2 + R2 be defined by [a2 + 2xy] f(x,y) = | 14,9) | xy2 ] (a) Explain why f we are guaranteed to have an inverse defined on an open neigh- borhood of [31]? = f(1, 1), but not at [1 0]? = f(1,0). (b) Give the derivative of the inverse function at (3,1): DF-1(3,1). e a la IV