Asked by pauto
Given
Given
f1(x,y)=x^4y^3
f2(x,y)=5x^7+sin(3y)
find the determinant
step plz full step
Given
f1(x,y)=x^4y^3
f2(x,y)=5x^7+sin(3y)
find the determinant
step plz full step
Answers
Answered by
Steve
Do you mean the Jacobian?
F1x = 4x^3y^3
F1y = 3x^4y^2
F2x = 35x^6
F2y = 3cos(3y)
So, the determinant of J(f1,f2,x,y) is
(4x^3y^3)(3cos(3y))-(35x^6)(3x^4y^2)
= 12x^3y^3 cos(3y) - 105x^10y^2
See
http://www.wolframalpha.com/input/?i=jacobian+of+(x%5E4y%5E3,+5x%5E7%2Bsin(3y))
F1x = 4x^3y^3
F1y = 3x^4y^2
F2x = 35x^6
F2y = 3cos(3y)
So, the determinant of J(f1,f2,x,y) is
(4x^3y^3)(3cos(3y))-(35x^6)(3x^4y^2)
= 12x^3y^3 cos(3y) - 105x^10y^2
See
http://www.wolframalpha.com/input/?i=jacobian+of+(x%5E4y%5E3,+5x%5E7%2Bsin(3y))
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