Calculus Integration Study Guide: Indefinite & Definite Integrals with Examples, Exams of Nursing

Master integration techniques: trig integrals, integration by parts, partial fractions, definite integrals, area & volume. 40+ worked examples. calculus integration, indefinite integral, definite integral, integration by parts, partial fractions, trig integrals, volume of revolution, area under curve, calculus study guide, engineering math, integral calculus, math examples, integration techniques

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1
UNIT-1
INTEGRATION
Define an integral
A function is called an anti derivative or integral of a function
on an interval if
for every value of in
(i.e) If the derivative of a function w.r.to ,then we say
that the integral of w.r.to is .
(i.e)
Evaluate
.
Solution:
.
/
(
*
Evaluate:
.
Solution:
pf3
pf4
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pf8
pf9
pfa
pfd
pfe
pff
pf12
pf13
pf14
pf15
pf16
pf17
pf18
pf19
pf1a
pf1b
pf1c
pf1d
pf1e
pf1f
pf20
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UNIT- 1

INTEGRATION

Define an integral A function is called an anti derivative or integral of a function on an interval if for every value of in (i.e) If the derivative of a function w.r.to ,then we say that the integral of w.r.to is. (i.e) (^) ∫

 Evaluate (^) ∫.

Solution:

 Evaluate: (^) ∫ √

Solution:

 Evaluate: (^) ∫

Solution: We know that,

[ ]

∫ ∫ [^ ]

∫[ ]

[∫ ∫ ]

[ ]

 Evaluate: (^) ∫ √.

Solution:

∫ √ ∫ √^ [ ]

 Evaluate: (^) ∫ √.

Solution: We know that,

 Integrate: (^) ∫.

Solution:

We know that,

 Integrate: (^) ∫.

Solution:

We know that,

 Evaluate (^) ∫

Solution:

 Evaluate ∫

Solution: We know that,

[ ]

[ ]

[ ]

∫ ∫[ ]

[ ]

[ ]

Integration by Method of substitution

 Integrate: (^) ∫.

Solution:

 Integrate: (^) ∫.

Solution:

 Integrate: (^) ∫.

Solution:

 Integrate: (^) ∫.

Solution:

 Evaluate: (^) ∫.

Solution:

 Evaluate (^) ∫.

Solution:

∫ ∫

Put

 Evaluate (^) ∫

Solution:

 Evaluate (^) ∫ d

Solution:

 Evaluate ∫

Solution:

 Evaluate (^) ∫.

Solution:

 Evaluate (^) ∫

Solution:

 Evaluate (^) ∫.

Solution: and

Solution:

∫ √^ ∫ √

Let

∫ √^ ∫ (√^ ) ( *

[ , √^ ( )-]

[ √^ ( *]

Integration by parts Let u & v be two functions of x then ∫ ∫

 Evaluate (^) ∫ 3.

Solution:

∫ [^ ∫ ]

[ ] [ ]

 Evaluate ∫. Solution: Applying integration by parts, Let

Again applying integration by parts

Let

q ⇒

 Evaluate∫. Solution:

Use Integration by parts method

∫ ∫. / √ ∫ √ ∫ √ ∫ √

∫ [

√ ]

6 √ 7 [√ ]

q

∫ [ √^ ]

[ ( *]

[( ) ( ( ) )]

[( ) ]

( ) [ ]

 Evaluate: (^) ∫.

Solution: We know that,

∫ [ ]

 Evaluate: (^) ∫.

Solution:

∫ ∫ [ ]

[ ]

 Evaluate

2

1

 lo g^ x d x.

Solution:

∫ ∫

∫ [^ ]^ ∫

[ ] [ ] [ ]

 Evaluate

4

0

ta n x d x

Solution: We know that,

∫ [ ]

[ (

* ]

[ √ ]

 Evaluate:

a x a

e d x

Solution: We know that,

∫ [^ ]

[ ]

 Evaluate (^) ∫.

Solution:

[ ]

[ ( * ] [ ]

[ ] ( *

 Evaluate (^) ∫.

Solution: We know that,

[ ]

∫ ∫ [ ]

∫[ ]

[ ]

[ ( ) ]

[ ] [ ( ) ]

 Evaluate (^) ∫ √.

Solution:

∫ √ ∫ 6 7 6 7 [ ]

Evaluate (^) ∫.

Solution:

 Evaluate∫ √

Solution:

∫ √^ ∫

√ ∫

[

√ ∫

√ ]

*√ √^ [^ ]

[√ √^ * √^ +]

 Evaluate∫.

Solution:

L

∫ [ ]

[ ]

 Evaluate (^) ∫.

Solution:

 Evaluate∫.

Solution: Use Integration by parts method Let

∫ [^ ]^ ∫

Again Using Integration by parts method, Let

∫ [ ∫ ]

 Evaluate∫.

Solution: Use Integration by parts method ,

∫ [ ] ∫