Calculus: Analytic Geometry and Calculus, with Vectors

(lu) #1

580 Partial derivatives


ax/0a, ay/aa, az/aa in terms of partial derivatives of fi, f2, fa. Partial ans.:
The first equation can be put in the form

aft ax af,ay of l az_ - af,
ax as + ay as+ az as as

and the required condition is
af, afI afl
ar ay az
aft alt aft
ax ay az
afa afa af3
ax ay az





2 Supposing that x and y are differentiable functions of a and 0 for which

2x2 + 3y - 2a2 - 30 = 0
x2 + 2y3 - a - 2$2 = 0,

calculate ax,/aa and ay/aa. Ins.:


ax__8ay2 - 1
as 8xy2 - 2x'

ay 2 - 4a
as 12y2 - 3

3 Supposing that p > 0 and that p and 0 are functions of x and y for which

pcoscb=x, psin0=y,


differentiate with respect to x and then with respect to y to obtain

TX

cos 4) - p sin 4) a = 1,

axsin4)+pcos0 =0,

and solve for the derivatives to obtain

cos4)-psin4)-=0
ey 49Y

49Psin4)+pcos4)- =1

ap= h, ap=sin a4)_ _ in^4 a¢= cos
ax

cos 0'
ay ax p ay p

4 Copy the formulas at the conclusion of Problem 3 and use them in appro-
priate places in the process of deriving the following formulas that are used to
make transformations from rectangular to polar and cylindrical coordinates.
Supposing that is is a function of x and y and that x and y are functions of p and
¢ for which

(1) x=pcos0, y=psin0,


show that
(2)

(3)

au au ap au ao

ax apax+COax

au au ap au a4)
ay spay+a4ay
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