Thus, the total effort for each type of objective equals the sum of the previous and new efforts (Equation (3)). Equation (4) restates the objective function.(3)E=E0+T∗p;NE=NE0+T∗1-p(4)S=SE0+T∗p+SNE0+T∗1-p-E0+NE0+T The first-order derivative is calculated to ...
Within the UK health and social care system, there is therefore a strong case for facilitating access to welfare rights advice for people with cancer and their families in order to assist them to claim their entitlements. This paper reports on interim findings from an evaluation of a dedicated ...
(3), versus the usual second-order partial derivatives for the wave Eq. (1)–(2) of optics; even waves propagating inside a perfect plate display, marked differences compared to the electromagnetic waves as the former are not dispersionless, unlike the latter. Nonetheless, drawing parallels ...