Understanding Engineering Mathematics

(やまだぃちぅ) #1

Note also that these error problems can be taken over directly to problems of small
increases – e.g. the expansion of a rectangular box due to heating, etc. (using coefficients
oflinearexpansions).
In fact, we have already met the total differential disguised asimplicit differentiation
(238



).

Problem 16.6


Ifz=x^2 Y 5 x^2 yY 2 xy^2 −y^3 =4 find

dy
dx

.

We fi n d


dy
dx

by noting thatdz=0, using the total differential, and solving the resulting

equation to obtain a relation betweendxanddywhich we then solve for


dy
dx

. Thus


dz= 2 xdx+ 10 xydx+ 5 x^2 dy+ 2 y^2 dx+ 4 xydy− 3 y^2 dy= 0

Dividing bydxgives


2 x+ 10 xy+ 5 x^2

dy
dx

+ 2 y^2 + 4 xy

dy
dx

− 3 y^2

dy
dx

= 0

and solving for


dy
dx

gives

dy
dx

=

2 x+ 10 xy+ 2 y^2
3 y^2 − 5 x^2 − 4 xy

Exercises on 16.5



  1. Find the total differentialdzwhen


(i) z=ln(cos(xy)) (ii) z=exp

(
x
y

)


  1. Ifz=e^2 x+^3 yandx=lnt,y=t^2 , calculate


dz
dt

from the total derivative formula and
show that it agrees with the result obtained by substitution forxandybefore differ-
entiating.

Answers



  1. (i)−tan(xy)(ydx+xdy) (ii)


1
y^2

exp

(
x
y

)
(ydx−xdy)


  1. 2t( 3 t^2 + 1 )exp( 3 t^2 )


16.6 Reinforcement


1.Find the values of the following functions at the points given:

(i)f(x,y)= 2 xy^3 + 3 x^2 yat the point (2, 1)
(ii) g(x,y)=(x+y)exsinyat the point (0,π/2)
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