X2 t04 04 reduction formula (2013)

Reduction Formula
Reduction (or recurrence) formulae expresses a given integral as
the sum of a function and a known integral.
Integration by parts often used to find the formula.

Reduction Formula
Reduction (or recurrence) formulae expresses a given integral as
the sum of a function and a known integral.
Integration by parts often used to find the formula.

e.g. (i) (1987) 

n  1
Given that I n   cos n xdx, prove that I n  
2

  I n2
0  n 

2
where n is an integer and n  2, hence evaluate  cos 5 xdx
0


2
I n   cos n xdx
0


2
0

2
  cos n 1 x cos xdx
0


2
0

2 u  cos n 1 x v  sin x
  cos n 1 x cos xdx du  n  1 cos n  2 x sin xdx dv  cos xdx
0


2
0


0

 cos n 1 x sin x 0  n  1 cos n  2 x sin 2 xdx
2
2

0


2
0


0

2
2

0 

cos n 1  sin  cos n 1 0 sin 0  n  1 cos n  2 x1  cos 2 x dx
2

 2 2
 
 
0


2
0


0

2
2

0 

2

 2 2
 
 
0
 
2 2
 n  1 cos n2
xdx  n  1 cos n xdx
0 0


2
0


0

2
2

0 

2

 2 2
 
 
0
 
2 2
 n  1 cos n2
0 0

 n  1I n  2  n  1I n


2
0


0

2
2

0 

2

 2 2
 
 
0
 
2 2
 n  1 cos n2
0 0

 n  1I n  2  n  1I n
 nI n  n  1I n  2


2
0


0

2
2

0 

2

 2 2
 
 
0
 
2 2
 n  1 cos n2
0 0

 n  1I n  2  n  1I n
 nI n  n  1I n  2

In   n  1I
 n2
 n 


2


0
cos 5 xdx  I 5


2


0
cos 5 xdx  I 5
4
 I3
5


2


0
cos 5 xdx  I 5
4
 I3
5
4 2
  I1
5 3


2


0
cos 5 xdx  I 5
4
 I3
5
4 2
  I1
5 3


8 2
  cos xdx
15 0


2


0
cos 5 xdx  I 5
4
 I3
5
4 2
  I1
5 3


8 2
  cos xdx
15 0

8
 sin x 0
2
15


2


0
cos 5 xdx  I 5
4
 I3
5
4 2
  I1
5 3


8 2
  cos xdx
15 0

8
 sin x 0
2
15
8 
  sin  sin 0 

15  2 
8

15

ii  Given that I n   cot n xdx, find I 6

I n   cot n xdx

  cot n  2 x cot 2 xdx

  cot n  2 xcosec 2 x  1dx
  cot n  2 xcosec 2 xdx   cot n  2 xdx

  cot n  2 xcosec 2 xdx   cot n  2 xdx u  cot x
du  cosec 2 xdx


  u n2
du  I n  2 du  cosec 2 xdx


  u n2
du  I n  2 du  cosec 2 xdx

1 n 1
 u  I n2
n 1
1
 cot n 1 x  I n  2
n 1

 cot 6 xdx  I 6
1 5
  cot x  I 4
5

1 5
  cot x  I 4
5
1 1
  cot 5 x  cot 3 x  I 2
5 3

1 5
  cot x  I 4
5
1 1
  cot 5 x  cot 3 x  I 2
5 3
1 5 1 3
  cot x  cot x  cot x  I 0
5 3

1 5
  cot x  I 4
5
1 1
  cot 5 x  cot 3 x  I 2
5 3
1 5 1 3
5 3
1 5 1 3
  cot x  cot x  cot x   dx
5 3

1 5
  cot x  I 4
5
1 1
  cot 5 x  cot 3 x  I 2
5 3
1 5 1 3
5 3
1 5 1 3
  cot x  cot x  cot x   dx
5 3
1 5 1 3
  cot x  cot x  cot x  x  c
5 3

(iii) (2004 Question 8b)

Let I n   4 tan n xdx and let J n   1 I 2 n for n  0,1, 2,
n
0
1
a ) Show that I n  I n2 
n 1


n
0
1
n 1
 
I n  I n2   4 tan n dx   4 tan n2 dx
0 0


n
0
1
n 1
 
0 0

  4 tan n x 1  tan 2 x  dx
0

  4 tan n x sec 2 xdx
0


n
0
1
n 1
 
0 0

  4 tan n x 1  tan 2 x  dx
0

u  tan x
  4 tan n x sec 2 xdx du  sec 2 xdx
0


n
0
1
n 1
 
0 0

  4 tan n x 1  tan 2 x  dx
0

u  tan x
0

when x  0, u  0

x ,u  1
4


n
0
1
n 1
 
0 0

  4 tan n x 1  tan 2 x  dx
0

u  tan x
0
1
  u n du when x  0, u  0
0

x ,u  1
4


n
0
1
n 1
 
0 0

  4 tan n x 1  tan 2 x  dx
0

u  tan x
0
1
  u n du when x  0, u  0
0

u  n 1 1
x ,u  1
 4
 n  1 0



n
0
1
n 1
 
0 0

  4 tan n x 1  tan 2 x  dx
0

u  tan x
0
1
  u n du when x  0, u  0
0

u  n 1 1
x ,u  1
 4
 n  1 0

1 1
 0 
n 1 n 1

 1
n

b) Deduce that J n  J n1  for n  1
2n  1

 1
n

2n  1
J n  J n1   1 I 2 n   1 I 2 n2
n n 1

 1
n

2n  1
J n  J n1   1 I 2 n   1 I 2 n2
n n 1

  1 I 2 n   1 I 2 n2
n n

 1
n

2n  1
J n  J n1   1 I 2 n   1 I 2 n2
n n 1

  1 I 2 n   1 I 2 n2
n n

  1  I 2 n  I 2 n2 
n

 1
n

2n  1
J n  J n1   1 I 2 n   1 I 2 n2
n n 1

  1 I 2 n   1 I 2 n2
n n

  1  I 2 n  I 2 n2 
n

 1
n


2n  1

 1
n
 m
c) Show that J m  
4 n 1 2n  1

 1
n
 m
4 n 1 2n  1
 1
m

Jm   J m1
2m  1

 1
n
 m
4 n 1 2n  1
 1
m

Jm   J m1
2m  1
 1  1
m m 1

   J m2
2m  1 2m  3

 1
n
 m
4 n 1 2n  1
 1
m

Jm   J m1
2m  1
 1  1
m m 1

   J m2
2m  1 2m  3
 1  1  1
m m 1 1

     J0
2m  1 2m  3 1

 1
n
 m
4 n 1 2n  1
 1
m

Jm   J m1
2m  1
 1  1
m m 1

   J m2
2m  1 2m  3
 1  1  1
m m 1 1

     J0
2m  1 2m  3 1
 1 
n
m
   4 dx
n 1 2n  1 0

 1
n
 m
4 n 1 2n  1
 1
m

Jm   J m1
2m  1
 1  1
m m 1

   J m2
2m  1 2m  3
 1  1  1
m m 1 1

     J0
2m  1 2m  3 1
 1 
n
m
   4 dx
n 1 2n  1 0

 1
n
m 
   x 04
n 1 2n  1
 1
n
m

 
n 1 2n  1 4

1 un
d ) Use the substitution u  tan x to show that I n   du
0 1 u2

1 un
0 1 u2

I n   4 tan n xdx
0

1 un
0 1 u2

0 u  tan x  x  tan 1 u
du
dx 
1 u2

1 un
0 1 u2

0 u  tan x  x  tan 1 u
du
dx 
1 u2
when x  0, u  0

x ,u  1
4

1 un
0 1 u2

0 u  tan x  x  tan 1 u
1 du du
In   un  dx 
0 1 u2 1 u2
1 u n du when x  0, u  0
In  
0 1 u2

x ,u  1
4

1 un
0 1 u2

0 u  tan x  x  tan 1 u
1 du du
In   un  dx 
0 1 u2 1 u2
1 u n du when x  0, u  0
In  
0 1 u2

x ,u  1
4
1
e) Deduce that 0  I n  and conclude that J n  0 as n  
n 1

1 un
0 1 u2

0 u  tan x  x  tan 1 u
1 du du
In   un  dx 
0 1 u2 1 u2
1 u n du when x  0, u  0
In  
0 1 u2

x ,u  1
4
1
n 1
un
 0, for all u  0
1 u 2

1 un
0 1 u2

0 u  tan x  x  tan 1 u
1 du du
In   un  dx 
0 1 u2 1 u2
1 u n du when x  0, u  0
In  
0 1 u2

x ,u  1
4
1
n 1
un
 0, for all u  0
1 u 2

n
1 u
 In   du  0, for all u  0
0 1 u2

1
I n  I n 2 
n 1

1
I n  I n 2 
n 1
1
In   I n 2
n 1

1
I n  I n 2 
n 1
1
In   I n 2
n 1
1
 In  , as I n2  0
n 1

1
I n  I n 2 
n 1
1
In   I n 2
n 1
1
 In  , as I n2  0
n 1
1
 0  In 
n 1

1
I n  I n 2 
n 1
1
In   I n 2
n 1
1
 In  , as I n2  0
n 1
1
 0  In 
n 1
1
as n  , 0
n 1

1
I n  I n 2 
n 1
1
In   I n 2
n 1
1
 In  , as I n2  0
n 1
1
 0  In 
n 1
1
as n  , 0
n 1
 In  0

1
I n  I n 2 
n 1
1
In   I n 2
n 1
1
 In  , as I n2  0
n 1
1
 0  In 
n 1
1
as n  , 0
n 1
 In  0

 J n   1 I 2 n  0
n

1
I n  I n 2 
n 1
1
In   I n 2
n 1
1
 In  , as I n2  0
n 1
1
 0  In  Exercise 2D; 1, 2, 3, 6, 8,
n 1 9, 10, 12, 14
1
as n  , 0
n 1
 In  0

 J n   1 I 2 n  0
n

X2 t04 04 reduction formula (2013)

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