The Chemistry Maths Book, Second Edition

(Grace) #1

54 Chapter 2Algebraic functions


EXAMPLE 2.30A repeated linear factor in the denominator


and it follows thatA 1 = 13 andB 1 = 1 − 8.


0 Exercise 65


In the general case, the decomposition of a proper rational functionP(x) 2 Q(x)in


partial fractions depends on the nature of the roots of the denominatorQ(x)(see


Section 2.5 on the roots of the general polynomial).


(i) All the roots are real.


In this caseQ(x)can be factorized as the product of real linear factors; if Qhas degree


nthen


Q(x) 1 = 1 a(x 1 − 1 x


1

)(x 1 − 1 x


2

)1-1(x 1 − 1 x


n

) (2.31)


wherex


1

,x


2

, =,x


n

are the roots. If all the roots are different thenP(x) 2 Q(x)can be


decomposed into the sum of nsimple fractions, as in Examples 2.28 and 2.29:


(2.32)


If some of the roots are equal then there are additional terms, as in Example 2.30,


with powers of the linear factor in the denominator. For example, ifx


1

1 = 1 x


2

1 = 1 x


3

in


Q(x)then


(2.33)


(ii) Some of the roots are complex.


If complex numbers are allowed then the discussion of (i) above is applicable. If


complex numbers are disallowedthen the denominatorQ(x)can be factorized as the


product of linear factors, one for each real root, and one or more real quadratic factors,


one for each pair of complex conjugate roots (Section 8.2). The decomposition of the


rational function in partial fractions then contains, in addition to the terms discussed


in (i) above, one fraction for each quadratic factor, of the form


(2.34)


ax b


xpxq






++


2

=


++








++



ax bx c


xx


c


xx


c


xx


n

n

2

1

3

4

4

()





Px


Qx


c


xx


c


xx


c


xx


c


xx


()


()


()()


=






















1

1

2

1

2

3

1

3

4

4

+



c


xx


n

n

Px


Qx


c


xx


c


xx


c


xx


n

n

()


()


=








++



1

1

2

2




31


3


3
3

3


3


222

x


x


A


x


B


x


Ax B


x




  • Ax






=














=


++






=






() ()


()


()


( 33


3


2

AB


x










)


()

Free download pdf