10.1 DIFFERENTIATION OF VECTORS
a(u)a(u+∆u)∆a=a(u+∆u)−a(u)Figure 10.1 A small change in a vectora(u) resulting from a small change
inu.assuming that the limit exists, in which casea(u) is said to be differentiable at
that point. Note thatda/duis also a vector, which is not, in general, parallel to
a(u). In Cartesian coordinates, the derivative of the vectora(u)=axi+ayj+azk
is given by
da
du=dax
dui+day
duj+daz
duk.Perhaps the simplest application of the above is to finding the velocity andacceleration of a particle in classical mechanics. If the time-dependent position
vector of the particle with respect to the origin in Cartesian coordinates is given
byr(t)=x(t)i+y(t)j+z(t)kthen the velocity of the particle is given by the vector
v(t)=dr
dt=dx
dti+dy
dtj+dz
dtk.The direction of the velocity vector is along the tangent to the pathr(t)atthe
instantaneous position of the particle, and its magnitude|v(t)|is equal to the
speed of the particle. The acceleration of the particle is given in a similar manner
by
a(t)=dv
dt=d^2 x
dt^2i+d^2 y
dt^2j+d^2 z
dt^2k.The position vector of a particle at timetin Cartesian coordinates is given byr(t)=
2 t^2 i+(3t−2)j+(3t^2 −1)k. Find the speed of the particle att=1and the component of
its acceleration in the directions=i+2j+k.The velocity and acceleration of the particle are given by
v(t)=dr
dt=4ti+3j+6tk,a(t)=dv
dt=4i+6k.