THE BINOMIAL SERIES 63A
Problem 14. Simplify√ (^3) (1− 3 x)√(1+x)
(
1 +
x
2
) 3
given that powers ofxabove the first may be
neglected.
√ (^3) (1− 3 x)√(1+x)
(
1 +
x
2
) 3
=(1− 3 x)
1
(^3) (1+x)
1
2
(
1 +
x
2
)− 3
≈
[
1 +
(
1
3
)
(− 3 x)
][
1 +
(
1
2
)
(x)
][
1 +(−3)
(x
2
)]
when expanded by the binomial theorem as far as
thexterm only,
=(1−x)
(
1 +
x
2
)(
1 −
3 x
2
)
(
1 −x+
x
2
−
3 x
2
)
when powers ofxhigher
than unity are neglected
=( 1 − 2 x)
Problem 15. Express
√
(1+ 2 x)
√ (^3) (1− 3 x) as a power
series as far as the term inx^2. State the range of
values ofxfor which the series is convergent.
√
(1+ 2 x)
√ (^3) (1− 3 x)=(1+ 2 x)
1
(^2) (1− 3 x)−
1
3
(1+ 2 x)
1
(^2) = 1 +
(
1
2
)
(2x)
- (1/2)(− 1 /2)
2!
(2x)^2 +···
= 1 +x−
x^2
2
+···which is valid for
| 2 x|<1, i.e.|x|<
1
2
(1− 3 x)−
1
(^3) = 1 +(− 1 /3)(− 3 x)
(− 1 /3)(− 4 /3)
2!
(− 3 x)^2 +···
= 1 +x+ 2 x^2 +···which is valid for
| 3 x|<1, i.e.|x|<
1
3
Hence
√
(1+ 2 x)
√ (^3) (1− 3 x)=(1+^2 x)
1
(^2) (1− 3 x)−
1
3
(
1 +x−
x^2
2
+···
)
(1+x+ 2 x^2 +···)
= 1 +x+ 2 x^2 +x+x^2 −
x^2
2
,
neglecting terms of higher power than 2,
= 1 + 2 x+
5
2
x^2
The series is convergent if−
1
3
<x<
1
3
Now try the following exercise.
Exercise 34 Further problems on the bino-
mial series
In problems 1 to 5 expand in ascending powers
ofxas far as the term inx^3 , using the binomial
theorem. State in each case the limits ofxfor
which the series is valid.
- 1
(1−x)
[1+x+x^2 +x^3 +···,|x|<1]
1
(1+x)^2
[1− 2 x+ 3 x^2 − 4 x^3 +···,|x|<1]
1
(2+x)^3
⎡
⎣
1
8
(
1 −
3 x
2
- 3 x^2
2
−
5 x^3
4
+···
)
|x|< 2
⎤
⎦
- √
2 +x
⎡
⎣
√
2
(
1 +
x
4
−
x^2
32
- x^3
128
−···
)
|x|< 2
⎤
⎦