An Introduction to the Mathematics of Medicine and BiologyNorth-Holland, 1973 - 675 páginas |
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Página 9
... definition . In framing this definition we keep in mind the desirability of as many as possible of the three basic laws ( 1 ) — ( 3 ) remaining true . If we use the result ( 2 ) formally in the case in which m = n we see that it yields ...
... definition . In framing this definition we keep in mind the desirability of as many as possible of the three basic laws ( 1 ) — ( 3 ) remaining true . If we use the result ( 2 ) formally in the case in which m = n we see that it yields ...
Página 195
... definition of a numerical quantity , this definition is not particularly fruitful of results . In the next section we shall replace the geometrical definition by a purely numerical one ( which is however , suggested by the geometrical ...
... definition of a numerical quantity , this definition is not particularly fruitful of results . In the next section we shall replace the geometrical definition by a purely numerical one ( which is however , suggested by the geometrical ...
Página 224
... definition of the logarithm and the more elementary definition will emerge later . It is interesting to note , however , that the definition we have adopted is very close to that originally framed by Napier of Merchiston . We shall now ...
... definition of the logarithm and the more elementary definition will emerge later . It is interesting to note , however , that the definition we have adopted is very close to that originally framed by Napier of Merchiston . We shall now ...
Otras ediciones - Ver todas
An Introduction to the Mathematics of Medicine and Biology J. G. Defares,Ian Naismith Sneddon Vista de fragmentos - 1961 |
An Introduction to the Mathematics of Medicine and Biology J. G. Defares,Ian Naismith Sneddon,M. E. Wise Vista de fragmentos - 1973 |
An Introduction to the Mathematics of Medicine and Biology J. G. Defares,Ian Naismith Sneddon Vista de fragmentos - 1961 |
Términos y frases comunes
a₁ arbitrary constant c₁ C₂ calculate Chapter CO₂ coefficients consider continuous function cos² cosh curve deduce defined definition denote distribution dy dx equation dy evaluate exact differential EXAMPLE experimental exponential exponential function expression Find the indefinite follows formula function f(x given gradient graph h₂ Hence indefinite integral independent variables Laplace transform linear equation logarithms mathematical method obtain ordinary differential equation oxygen debt partial derivative partial differential equation particular integral percentage error Poisson distribution positive integer PROBLEMS quantity rational numbers relation respect result shown in Fig Similarly simple sin² sinh solve straight line t₁ Table tangent theorem u)du write y₁ zero θη ди ду дх მყ