6.3 – Simplifying Complex Fractions
description
Transcript of 6.3 – Simplifying Complex Fractions
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Defn: A rational expression whose numerator, denominator, or both contain one or more rational expressions.
7
5
yx
xyyx
873
4 3
1
1
xx
x
6.3 – Simplifying Complex FractionsComplex Fractions
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3 24 31 32 8
3 24 31 32 8
3 43 4
4
3 24 3
1 384 2
24 24
2
3 24 314 32 8
24
9 812 12
4 38 8
6 3 8 212 1 3 3
11278
18 1612 9
221
221
LCD: 12, 8 LCD: 24
6.3 – Simplifying Complex Fractions
24
24
87
121
78
121
2
3
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LCD: y1
2 1
xy
xy
1
2 1
y y
y
xy
xy
2 1y xx
yxyx
12
1y–y
6.3 – Simplifying Complex Fractions
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LCD: 6xy5
6
3
yy xy x
2
2 2
5 62 6x yxy x y
56
3
6 6
6 6
yy x
xy xy
y y xx xy
25 6x y2xy 3y x
xyxy
y
3
656xy
6xy
6.3 – Simplifying Complex Fractions
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LCD:
3759
3759
3 57 9
63 37
63 59
3 97 5
9 37 5
2735
2735
63
Outers over Inners6.3 – Simplifying Complex Fractions
3759
2735
)5)(7()9)(3(
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Outers over Inners
512
56
x
xx
512
56xxx
52
5xxx
6.3 – Simplifying Complex Fractions
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6.5 – Solving Equations w/ Rational Expressions
5 16 1x 4 14 5 20x
4 14 5
20 2020
20x
5x
LCD: 20
5 16 1x
5 15x
3x
44 11
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LCD:
2 3 3 3 2x x 2
2 3 23 3 9x x x
2 3 2
3 3 3 3x x x x
3 3x x
3 3 23x
x x
2 3 3 3 2x x
2 6 3 9 2x x
5 3 2x
5 5x 1x
3 33
3x
x x
3
3 33 2x x
x x
6.5 – Solving Equations w/ Rational Expressions
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LCD: 6x5 3 33 2 2x
6 53
x
2 5 3 3 3 3x x 10 9 9x x
9x
362x
x 2
6 3x
10 9 9x x
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LCD: x+36 2 23 3
xxx x
3x x
2 3x x
2 12 0x x 3x
3 0 4 0x x 3x
3 63x
x
233
x xx
3 2x
6 2x 2 6x 2 3x x 6 4 6x
0 4x 4x
6.5 – Solving Equations w/ Rational Expressions
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LCD:
2
5 11 1 122 7 10 5
xx x x x
5 11 1 12
2 2 5 5x
x x x x
2 5x x
2 5 52x
x x
5 5 11 1 12 2x x x
5 25 11 1 12 24x x x
5 25 23x x
6 48x 8x
12 5
2 1 15 xx
xx
x
2 5 12
5x
xx
6.5 – Solving Equations w/ Rational Expressions
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LCD: abx1 1 1a b x
1abxa
bx
bx ab ax
bx
bxb x
Solve for a
1b
abx 1x
abx
ax ab
a b x
a
6.5 – Solving Equations w/ Rational Expressions
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Problems about NumbersIf one more than three times a number is divided by the number, the result is four thirds. Find the number.
3x
3 3 1x xx
3 3 1 4x x
9 3 4x x
5 3x 35
x
LCD = 3x1
x 4
3
3
3 4x
9 4 3x x
6.6 – Rational Equations and Problem Solving
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Problems about Work
Mike and Ryan work at a recycling plant. Ryan can sort a batch of recyclables in 2 hours and Mike can short a batch in 3 hours. If they work together, how fast can they sort one batch?
Time to sort one batch (hours)
Fraction of the job completed in one hour
Ryan
Mike
Together
12131x
2
3
x
6.6 – Rational Equations and Problem Solving
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Problems about Work
Time to sort one batch (hours)
Fraction of the job completed in one hour
Ryan
Mike
Together
12131x
2
3
x
12 6 1
2x
3x 5 6x 65
x hrs.
LCD =13
1x
6x 3
6 1x 16x
x
2x 6115
6.6 – Rational Equations and Problem Solving
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Pippen and Merry assemble Ork action figures. It takes Merry 2 hours to assemble one figure while it takes Pippen 8 hours. How long will it take them to assemble one figure if they work together?
Time to Assemble one unit (hours)
Fraction of the job completed in one hour
Merry
Pippen
Together
2
8
x
12181x
6.6 – Rational Equations and Problem Solving
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Time to Assemble one unit (hours)
Fraction of the job completed in one hour
Merry
Pippen
Together
2
8
x
12181x
LCD:12
8 12
x
4x 5 8x 85
x
hrs.
18
1x
8x 8
8 1x 18x
x
x 8315
6.6 – Rational Equations and Problem Solving
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A sump pump can pump water out of a basement in twelve hours. If a second pump is added, the job would only take six and two-thirds hours. How long would it take the second pump to do the job alone?
112
1x
263
1203
Time to pump one basement (hours)
Fraction of the job completed in one hour
1st pump
2nd pump
Together
x
12
203
6.6 – Rational Equations and Problem Solving
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112
1x
263
1203
Time to pump one basement (hours)
Fraction of the job completed in one hour
1st pump
2nd pump
Together
x
12
112
1 112 x
203
1x
1203
320
6.6 – Rational Equations and Problem Solving
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LCD:
60 112
x
5x
60 4xhrs. 15x
1 1 312 20x
60x
160x
x 0
60 32
x
60 9x
5x60 9x
6.6 – Rational Equations and Problem Solving
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Distance, Rate and Time Problems
If you drive at a constant speed of 65 miles per hour and you travel for 2 hours, how far did you drive?
d r t
65mileshour
2 hours 130 miles
d tr
d rt
6.6 – Rational Equations and Problem Solving
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A car travels six hundred miles in the same time a motorcycle travels four hundred and fifty miles. If the car’s speed is fifteen miles per hour faster than the motorcycle’s, find the speed of both vehicles.
Rate Time Distance
Motor-cycle
Car
x
x + 15
450 mi
600 mi
t
t
rdt
x450
15600x
6.6 – Rational Equations and Problem Solving
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Rate Time Distance
Motor-cycle
Car
x
x + 15
450 mi
600 mi
t
t
rdt
x450
15600x
x450
15
600x
LCD: x(x + 15)
15600450
xx
x(x + 15) x(x + 15)
6.6 – Rational Equations and Problem Solving
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15600450
xx
x(x + 15) x(x + 15)
xx 60045015
xx 60015450450
x15015450
x
15015450
x45
45x mphMotorcycle
6015 x mphCar
6.6 – Rational Equations and Problem Solving
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A boat can travel twenty-two miles upstream in the same amount of time it can travel forty-two miles downstream. The speed of the current is five miles per hour. What is the speed of the boat in still water?
boat speedx Rate Time Distance
UpStream
DownStream
x - 5
x + 5
22 mi
42 mi
t
t
rdt
522x
542x
6.6 – Rational Equations and Problem Solving
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boat speedx
Rate Time Distance
UpStream
DownStream
x - 5
x + 5
22 mi
42 mi
t
t
rdt
522x
542x
522x
5
42x
LCD: (x – 5)(x + 5)
542
522
xx(x – 5)(x + 5) (x – 5)(x + 5)
6.6 – Rational Equations and Problem Solving
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542225 xx
2104211022 xx
xx 2242210110
x20
320
x1616 mph
Boat Speed
542
522
xx(x – 5)(x + 5) (x – 5)(x + 5)
x20320
6.6 – Rational Equations and Problem Solving
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Direct Variation: y varies directly as x (y is directly proportional to x), if there is a nonzero constant k such that
6.7 – Variation and Problem Solving
The number k is called the constant of variation or the constant of proportionality
.kxy
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Direct Variation
kxy 824 k
k824
6.7 – Variation and Problem Solving
Suppose y varies directly as x. If y is 24 when x is 8, find the constant of variation (k) and the direct variation equation.
3k
xy 3direct variation equation
constant of variation
xy
39
515
927
1339
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kwd 567 k
k567
6.7 – Variation and Problem SolvingHooke’s law states that the distance a spring stretches is directly proportional to the weight attached to the spring. If a 56-pound weight stretches a spring 7 inches, find the distance that an 85-pound weight stretches the spring. Round to tenths.
81
k
xy31
direct variation equation
constant of variation
8531
y
6.10y inches
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Inverse Variation: y varies inversely as x (y is inversely proportional to x), if there is a nonzero constant k such that
6.7 – Variation and Problem Solving
The number k is called the constant of variation or the constant of proportionality.
.xk
y
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Inverse Variation
xk
y
36
k
k18
6.7 – Variation and Problem Solving
Suppose y varies inversely as x. If y is 6 when x is 3, find the constant of variation (k) and the inverse variation equation.
xy
18
direct variation equation
constant of variation
xy
36
92
101.8
181
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tk
r
430
k
k120
6.7 – Variation and Problem SolvingThe speed r at which one needs to drive in order to travel a constant distance is inversely proportional to the time t. A fixed distance can be driven in 4 hours at a rate of 30 mph. Find the rate needed to drive the same distance in 5 hours.
xr
120
direct variation equation
constant of variation
5120
r
24r mph
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Additional Problems
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LCD: 15
5 2 3 1 1x x 2 1 13 5 15x x
15 152 1 13 5 15
15x x
5 2x
5 10 3 3 1x x
2 13 1x
2 12x
6x 13 x 11
6.5 – Solving Equations w/ Rational Expressions
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LCD: x
22 6 7x x x 62 7xx
62 7xx
x x x x
2x
20 5 6x x
1 0 6 0x x
1 6x x
0 1 6x x
6 2x 7x
6.5 – Solving Equations w/ Rational Expressions
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LCD:5 5 3
1 1x
x x
51
1x xx
5 5 3 3x x
2 2x 1x
1x
1 51x
x
1 3x
5 3 5 3x x
Not a solution as equations is undefined at x = 1.
6.5 – Solving Equations w/ Rational Expressions
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Problems about Numbers
The quotient of a number and 2 minus 1/3 is the quotient of a number and 6. Find the number.
2x
62x
3 2x x 3 2x x
1x
LCD = 613
6x
3
6 1 6
6x
2 2x
6.6 – Rational Equations and Problem Solving