a) Determine whether or not the given vector field is conservative. b) Determine the interpretation of the result c) Verify that the solution of the problem satisfies all the conditions of Theorem 1. F(x, y, z) = xy²z³i+2x²yz³j + 3x²y²z²k Theorem 1 If F(x,y,z) is a field defined on all R3 whose component functions have continuous partial derivatives and rot F=0 then F(x,y,z) is a conservative vector field rot F = VXF= rot F(x, y, z)= - (07-02) ₁ + (02_0R) 1 + (08-07)* -ola 50 €15

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a) Determine whether or not the given vector field is conservative. b) Determine the interpretation of the result c) Verify that the solution of the problem satisfies all the conditions of Theorem 1. F(x, y, z) = xy²z³i+2x²yz³j+3x²y²z²k Theorem 1 If F(x,y,z) is a field defined on all R3 whose component functions have continuous partial derivatives and rot F=0 then F(x,y,z) is a conservative vector field i rot F = VXF= Р rot F(x, y, z) = (332) + (32-33) + (-35), k 【JP d kaR