differentiel geometry The mapping f(x, y, z) = (e* – y + z)e, + (x + e*)e, + (e")ez satisfiesthe conditionsof the inverse function theorem and the determinant of the Jacobian J(f(x,y, z)) equalsJ(f(x,y, 2)) = e**+y+* + e*None of the given answers.O The above answerThe above answerJ(f(x,y,z)) = e*+y+z + e*J(f(x,y,z)) = e*+y+z + e"The above answerThe above answer

The given problem is to find the determinant of Jacobian matrix of the given mapping function of…

Answered: The mapping f(x, y, z) = (e* – y + z)e,…

Linear Algebra: A Modern Introduction

4th Edition

ISBN:9781285463247

Author:David Poole

Publisher:David Poole

Chapter6: Vector Spaces

Section6.2: Linear Independence, Basis, And Dimension

Problem 16EQ

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Find the determinant of the matrix. [4032013501511103]
Show that the three points (x1,y1)(x2,y2) and (x3,y3) in the a plane are collinear if and only if the matrix [x1y11x2y21x3y31] has rank less than 3.
Compute the determinants in Exercises 7-15 using cofactor expansion along any row or column that seems convenient. 10.
Find the kernel of the linear transformation T:R4R4, T(x1,x2,x3,x4)=(x1x2,x2x1,0,x3+x4).
By utilizing the Jacobian determinant, which of the following is true about functionally dependence and Jacobian determinant of the given functions: Y1 = 3x} + 2x} Y2 = 5x, +1 O a. J 20x2 functions are independent Ob. J=-30x2 functions are independent Oc. J=-20x2 functions are independent O d. J 30x2 functions are dependent
7. Use the Jacobian determinant to test the existence of functional dependence between the following functions: y1 = 3xf + x2 %3D Y2 = 9x + 6x?(x2 + 4) + x2(x2 + 8) + 12 %3D
Solve the following relations for x and y, and compute the Jacobian J(u,v). u=3x +y, v=2x-y 2u-3v 5 (Type expressions using u and y as the variables.) Choose the correct Jacobian determinant of T below. X = U+V 5 1 A. J(U,V)=- (u+v (2u-3v [T) () - (T) () du 5 5 au 5 +V à (2u-3v) à (2u-3v 5 au 5 B. J(u,v)=- OC. J(u,v). - (+) = ( + ) - 2 (² au (2u-3v - (²³³) (†) - ÷ (²³3³) = (H) à (2u-3v) a av au 5 5 5 au 5 O D. J(u,v) = à du (2u-3v) a (2u-3v) 5 5 u+y - 2 (U+r) 2 (0+r) 5 au 5 The Jacobian of the transformation is J(u,v) =
[x +y y+z z+x] If A = then compute the determinant of A.
Plz do all parts if u can..
Compute the Jacobian J(u,v) for the following transformation. T: x = 3u cos (tv), y = 3u sin (tv) Choose the correct Jacobian determinant of T below. O A. J(u,v) = O B. J(u,v) = D. J(u, v) = d a д -(3u cos (Tv)). -(3u cos (Tv)) - Əv ди OC. J(u,v) = - д d ди -(3u cos (πv))——(3u sin (ív)) - Əv Ə -(3u sin (äv). ди ди д -(3u cos (TV)) - Compute the Jacobian. J(u,v) = ἂν d д д (3u sin (лv)—(3u sin (tv) - Əv Əv Əv d Əv Əv (3u sin (лv)- d -(3u cos (лv))- (3u sin (Tv)- (3u cos (TV)) ди Ə д д ди -(3u sin (лv)) ди Ə ди -(3u cos (лv)) -(3u sin (Tv)) -(3u cos (TV))
2. 5x -4y a) Solve for x and y based on Cramer's Rule of Determinants: 3x + 2y 5, Answer: x 1, y = 1 b) Solve for x and y based on Matrix Inversion: x - 2 y = - 4, 4x y = 5 Answer: x 2, y = 3 c) Solve for x, y, and z: Answer: x = -1, y = 1, z = 2 3x-3y + 2z= - 2 x+2y - z-1, 3, 2x - y + 3z
Use 2 methods in evaluating the determinant

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