By inspection, for all j ~= i, the only term involving xj will be -cos(xj) (occurring during the summation), and the derivative of that is trivial to calculate. For j == i, you get only -cos(xi) - i * cos(xi) - sin(xi) which is also trivial to calculate the derivative of.
The Jacobian will therefore be 0 everywhere except the diagonal, and will be the derivative of -cos(xj) for all terms except diagonal entry i, where it will be the derivative of -(i+1)*cos(xi) - sin(xi)
