564 Partial derivatives
Looking forward to derivation of a formula (the chain formula) for w'(t)
we write
Thuswherew(t + At) = u(x(t + At), y(t + At), z(t + At)).
w(t + At) = u(x(t) + Ax, Y(t) + AY, Z(t) + Oz),Ax = x(t + At) - x(t), AY = Y(t + At) - y(t), As = z(t + At) - z(t).
Applying (11.222) then givesw(t + At) - w(t) = [t{=(x(t), y(t), z(t)) + Ei][x(t + At) - x(t)]
+ [uv(x(t), y(t), z(t)) + e21[y(t + At) - Y(t)]
+ [tts(x(t), Y(t), z(t)) + e3][z(t -}- At) - z(t)],where el, e2, e3 are quantities which approach zero as At approaches zero.
Dividing by At and taking limits as At approaches zero gives the chain
formula (11.232). The following theorem sets forth conditions under
which the chain formula is correct.
Theorem 11.23 (chain rule) If u is continuous and has continuous
partial derivatives us, u,,, u, over a region R in E3, and if(11.231) w(t) = u(x(t), y(t), z(t)),where x, y, z are differentiable functions oft over some interval T, and if the
point P(t) having coordinates x(t), y(t), z(t) traverses a curve C in R as t
increases over T, then w is differentiable over T and(11.232) w'(t) = u,,(x(t), y(t), z(t))x'(t)
+ u,(x(t), y(t), z(t))y'(t)
+ u2(x(t), y(t), z(t))z'(t)
when t is in T.In case [x'(t)]2 + [y'(t)]2 + [z'(t)]2 = 1 so thatP(t) moves along C with
unit speed, the number w'(t) is called the directional derivative of u in the
direction of the forward tangent to C at P. For this and other reasons,
some of which will appear later, the chain formula (11.232) is extremely
important. We temporarily suspend production of mathematics to
ponder consequences of the rude fact that it takes a long time to write
the formulas (11.231) and (11.232). We can wonder how much we can
abbreviate these formulas without abbreviating the life out of them and
without creating confusion that wastes more of our time than the abbre-
viations save. We can write (11.231) in the form(11.233) u = u(x,y,z)and carry in our minds the idea that the left side stands for the value of
a function of t and so also does the right side but, on the right side, u is