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Fractions and Fractional Equations
Prepared by: Richard Mitchell Humber College
9
CASE STUDY
9.1-SIMPLIFICATION OF FRACTIONS
9.1-DEFINITIONS-Pages 227 to 231
C o n s t a n t s a n d V a r i a b l e s
P ro p er an d Im p ro p er F rac tio n s
See WileyPLUS glossary for
terms and definitions Mixed FractionsAlgebraic Fractions
N u m e r a t o r s
D e n o m i n a t o r s
T e r m sL o w e s t
F r a c t i o n s a n d D e c i m a l s
Common Fractions
9.1-EXAMPLE 12(b)-Page 230Reduce to lowest terms. Give the answer with positive exponents.
2ANS:
3
x
yz
2
2 3
3
9
x yz
xy z
2 1 1
1 2 3
3
9
x y z
x y z
1
1 2
1
3
x
y z
9.1-EXAMPLE 13(a)-Page 230Reduce to lowest terms. Give the answer with positive exponents.
2 1ANS:
3
x
22
3
x x
x
(2 1)
3
xx
x
9.1-EXAMPLE 13(c)-Page 230Reduce to lowest terms. Give the answer with positive exponents.
3ANS:
2 1
x
x
2
2
2 5 3
4 1
x x
x
( ) ( 3)
( )
2 1
1 (2 1)2
x
x
x
x
9.1 EXAMPLE 13(d)-Page 230Reduce to lowest terms. Give the answer with positive exponents.
2ANS:
2 3
x b
x a
2
2 2
( ) (2 2 )
2 3
x ax bx ab
x ax a
)32()(
)(2)(
axax
axbaxx
( ) ( 2 )
( ) (2 3 )
x a
x a
x b
x a
9.1-EXAMPLE 14-Page 231Simplify the fraction.
A N S : 1
3 2
2 3
x
x
3 2
2 3
x
x
3 2
2 3
x
x
3 2
3 2
x
x
1
1
9.2-MULTIPLICATION AND DIVISION OF FRACTIONS
9.2-EXAMPLE 16(b)-Page 233Multiply and reduce to lowest terms.
2
2ANS:
x -
x
2
3
4
2
x x
x x
1 2
3
( ) ( 4)
( ) ( 2)
x x
x x
1
3
( ) ( ) ( 2)
( ) (
2
2)
x x
xx
x
1
3
( ) ( 2)
( )
xx
x
9.2-EXAMPLE 16(c)-Page 233Multiply and reduce to lowest terms.
A N S : 1
2 2
2 2
2 2 3 9
4 3 2 7 6
x x x x
x x x x
)3()1(
)2()1(
xx
xx
)32()2(
)32()3(
xx
xx
( ) ( )
( ) ( )
1
3
2
1
x
x
x
x
( ) ( )
( ) (
2
2
3 3
32 )x
x x
x
9.2-EXAMPLE 17(d)-Page 234Divide and reduce to lowest terms.
A N S : ( 1 )x x -
2
2
2 2x x x
x x
2 22
2
x x x
x x
2
1
( ) ( 1)
(
2
2)
xx x
xx
9.2-EXAMPLE 17(e)-Page 234Divide and reduce to lowest terms.
2
4ANS:
r
2
4
r xx
2
4
1
x
xr
9.3-ADDITION AND SUBTRACTION OF FRACTIONS
9.3-EXAMPLE 25-Page 238Combine and simplify.
2 10ANS:
2
x y
xy
xy
x 5
2 2
22
x
x
x
y xy
x
L.C.D. = 2xy
2
05 2 1
2
y
y xx y
y
2 1
2 2
0
xy xy
x y
2 10
2x
x
y
y
Rough Work
9.3-EXAMPLE 30-Page 240Combine and simplify.
32 5ANS:
2
x
x
32 2
2
2
1 2
x
x
x
x
x
L.C.D. = 2x5
2 2
51
1x x
32 5
2 2x x
x
3
2
2 5
x
x
Rough Work
2 5
2x
x
9.3-EXAMPLE 26-Page 238Combine and simplify.
2
2
5 7ANS:
3 11 6
x x
x x
23 2
3 2
( 2) ( )
( 3) ( )(3 3
4
)
3 2 6
2
x
x x
x xx
xx
x
2(2 1) ( )3
3(
2
3 2 3) ( )( )3 2
6 3x
x
x
x x
x
x
xx
2 2( ) ( )
( )( ) ( )
3 2
3 3 2 3 ( )2
4 2
3
6 6 3x x x x x
x x
x
x x
Rough Work
23
12
3
2
x
x
x
x
L.C.D. = (x – 3)(3x – 2)
2 2(3 2 6 4) (2 6 3)
( )(3 3 2)
x x x x x
x
x
x
9.3-EXAMPLE 22-Page 237 (optional)
Combine and simplify.
2
( )( 1)
( )(
5 ( ) ( )
( )( 1)
5 1
( )( )( )1 11)
x x
x x
x x
xx x x x
2
22
2
( ) ( )
( 1)( 1) ( )( )( 1)1
x
x x x xx
x
x
xx
Rough Work
2 2 3 2
5 9
1
x
x x x x x
22
9 ( )
( )( 1) ( )( )(
( 1)
( 1 ))
9
1 1
1x
x xx x x
x
x
L.C.D. = (x2)(x + 1)(x – 1)
(con’t)
9.3-EXAMPLE 22-Page 237 (optional)
Combine and simplify.
2
35 ( 1) ( ) 9( 1)
( ( 1) )1
x x x x
x x x
2 3
2
5 5 9 9
)( )1 1(x x
x x x x
x
3 2
2
5 4 9ANS:
( 1)( 1)
x x x
x x x
2 2
2
2
( ) ( ) ( ) ( ) ( )
( )( )( ) (
5 1 9
)( )( ) ( )( )(1 1 1 1 1)1
1
x x x x x
x x x x x
x x x x
9.4 – COMPLEX FRACTIONS
9.4-EXAMPLE 33-Page 243 (long way)
Simplify the complex fraction.
14
ANS: 39
1 2
2 31
34
1 2
2 33 11 4
3 4
12 16 6
4 4
7
6
4
13
37
6
1
4
1
7
6
4
3
1
7
3
2
3
14
39
L.C.D. = 6 and 4
9.4-EXAMPLE 33-Page 243 (short way)
Simplify the complex fraction.
14
ANS: 39
1 2
2 31
34
12 1 2
32
112
3
1 4
6 8
36 3
14
39
L.C.D. = 12
9.4-EXAMPLE 34-Page 243 (long way)
Simplify the complex fraction.
( )
ANS: ( )a a bb a b
1
1
abba
11
1
1
abba
b bb a
aab
a
b aba ba
ab
a
a
b
b
ab
b
a
b a
( )
( )
b a
b
a
a b
L.C.D. = a and b
9.4-EXAMPLE 34-Page 243 (short way)
Simplify the complex fraction.
( )
ANS: ( )a a bb a b
1
1
abba
11
11
abba
bab
a
2
2
( )
( )
ab a a a bor
b a bab b
L.C.D. = ab
9.4-EXAMPLE extra
Simplify the complex fraction.
(2 1)
ANS: 2
a
2 1
412
a
a
2 1
4
1 2
11
a
a
2
4 44 1
2 2
2 1
a
a
24 1
42 1
2
a
a
24 1
4
2 1
2
a a
2 24 1
4
2
2 1
a
a
( )2
2 1
2 1 2( )
)4(
1a a
a
(2 1)
2
a
L.C.D. = 2 and 4
2
9.5 – FRACTIONAL EQUATIONS
9.5-STRATEGY-Pages 245 to 247 Eliminate Fractions:
Multiply both sides of the equation by the lowest common denominator.
Remove Parenthesis:Brackets are multiplied away.
Collect x Terms:Move all x terms to one side and all other terms to other side.
Combine Like Terms:Always simplify.
Remove Coefficient of x:Divide both sides by coefficient.
Check Answer:Be sure to substitute the answer back into the original equation.
9.5-EXAMPLE 36-Page 246Solve the equation for x:
9x – 5x = 2
4x = 2
x = 1/2
CHECK:
5 3 15
3 2x x
3 25 15
5 153
1x x
3 25 3 1
15 155
15x x
1 12 2
32
5 3 15
3 1 2
10 6 15
checks2 2
( )15 15
1ANS:
2
LCD = 15
9.5-EXAMPLE 37-Page 246Solve the equation for x:
4 = 30 + 3x
3x = -26
x = -26/3
CHECK:
2 5
2
1
3x x
6 62 5 1
3 2x x
x x
2 5 16
36 6
2x x x
x x
2 5 1
2326 263 3
2 15 13
26 26 26
checks2 2
( )26 26
26ANS: -
3
LCD = 6x
9.5-EXAMPLE 38-Page 246Solve the equation for x:
8 7 2
5 4 1
2
5 1
x x
x x
8 7 2 2( )( ) ( )( ) ( )( )5 4 5 1 5 4 5 1 5 4 5 1
5 4 1 5 1x x x x x x
x x
x x
( 8 7 ) ( 5 1 ) 2 ( 5 4 ) ( 5 1 ) 2 ( 5 4 )x x x x x x
LCD =(5x+4)(5x+1)
2 2 24 0 3 5 8 7 2 ( 2 5 5 2 0 4 ) 1 0 8x x x x x x x x
2 2 24 0 4 3 7 5 0 5 0 8 1 0 8x x x x x x
4 3 7 4 2 8x x
1x (con’t)
9.5-EXAMPLE 38-Page 246Solve the equation for x:
CHECK:
8 7 22
5 4 5 1
x x
x x
8( ) 7 2( )2
5( ) 4 5( ) 1
1 1
1 1
A N S : 1
15 22
9 6
(c )hecks5 5
3 3
9.5-EXAMPLE 39-Page 247Solve the equation for x:
23 12
3
3
2 4
x xx x
3 1 3 1 33 2 4
( )( ) ( )( ) ( )( )3 ( 3)( 1) 1
1x x
x x xx x
x x x
3 ( 1 ) 2 4 ( 3 )x x
LCD =(x-3)(x+1)
3 3 4 1 0x x
1 3x (con’t)
3 2 4( )(3 )3 1 1x x x x
9.5-EXAMPLE 39-Page 247Solve the equation for x:
CHECK:
2
3 2 4
3 12 3x xx x
2
3 2 4
( ) 3 ( ) 1( ) 2( ) 313 1313 13
A N S : 1 3
3 2 4
10 140 14
che( )cks3 3
10 10
9.6-WORD PROBLEMS LEADING TO FRACTIONAL EQUATIONS
9.6-STRATEGY-Pages 249 to 250 Rate Problems (Uniform Motion, Work, Fluid or Energy)
9.6-EXAMPLE 41-Page 249 (Uniform
Motion)A train departs at noon travelling at a speed of . A car leavesthe same station later to overtake the train, travelling on a roadparallel to the track. If the car's speed is
1/264 km/h
96 km/ h
h, at what time and at what distance from the station will it overtake the train ?
ANS: 1:30 p.m. 96 km
RATE TIME DISTANCE
Train
Car
TOTALS
x =
(t)
(t + ½)
-
64
96 96 (t)
64 (t + ½)
1
26 )4 9 (6 t t
64 32 96t t
hour (time for car)1 t
Equation
- Distance=Distance
hour
1 1
2 2
(time for train)1 t
=
9.6-EXAMPLE 42-Page 250 (Work)
Crew A can assemble , and Crew B can assemble . If both crews together assemble with Crew B working
longer
2 cars in 5
than Crew A
days 3 cars in7 day
, how many days mu1
s0
d t 100
eac cars,
h creway s
s work ?
days (Crew A)
days (Crew B)
ANS: 116 126
RATE TIME Amount of Work
Crew A
Crew B
TOTALS
x =
(t + 10)
(t)
-
2/5
3/7 3/7 (t + 10)
2/5 (t)
2 3
5 7( ) ( ) 10010t t
14 15 150 3500t t
days (Crew A)116 t
Equation
- 100
days (Crew B)10 126 t
=
9.6-EXAMPLE 43-Page 251 (Fluid or
Energy Flow)
4.0 mA sma
onthsll hydroelectric generating station can produce
After of operation, another generator isadded which, by it
61 gagajoules (GJ) of energy per year.
39 se GJlf, in can prod 5.0 montuce
hs. How many additional are needed 9months 5 GJfor a total of to be pro duced ?
monthsANS: 5.8
RATE TIME Amount of Flow
Gen 1
Gen 2
TOTALS
x =
(t)
(t + 4)
-
61/12
39/5 39/5 (t)
61/12 (t + 4)
( )61 39
1) 9
254
5(t t
305 1220 468 5700t t
months (Generator 2)5.8 t
Equation
- 95
(5.8 additional months needed to reach 95 GJ).
=
9.7-LITERAL EQUATIONS AND FORMULAS
9.7-EXAMPLE 47-Page 254Solve the equation for x:
CHECK:
b b dxa
db
x
a b
x db
a b
b b da
da bb
db b b d
b
che( )cks d
b db
ANS: d
x a bb
Divide both sides by b
Subtract b from both sides
Multiply both sides by a
da bxb
9.7-EXAMPLE 48-Page 255
CHECK:
1 2( )kA tq
t
L
12qL
t tkA
2 2qL
tk
qA
kA t
L
2 2qL kAt kAtq
L
c h e c k( s ) q q
1 2ANS: qL
t tkA
Multiply both sides by L/kA
Add t2
to both sides
The formula for the amount of heat flowing by conduction througha wall of thickness , conductivity , and cross-sectional area is
qL k A
(where and are the temperatures of 1 2the warmer and cooler sides, respectively)
1
.
Solve this equation for .t t
t
1 2( )kA tq
t
L
1 2tqL
tkA
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