Comparing Rational Numbers Absent copy 11/14,15. A Rational number is any number (neg. or pos.) that...
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Comparing Rational Numbers Absent copy 11/14,15
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Transcript of Comparing Rational Numbers Absent copy 11/14,15. A Rational number is any number (neg. or pos.) that...
Comparing Rational Numbers
Absent copy
11/14,15
A Rational number is any number (neg. or pos.)
that can be written as a fraction. But a fraction can also be written as a decimal.
Ex: 12 -3 7.2 -5.81 15
Make fraction 12 -3 7 2/10 -5 81/100 15 1
Example #1Which Rational number(fraction)is greater or are they equal.
5 78 12
12 • 5 7 • 8 12 • 8 12 • 8 60 56 96 96
60Solution
• In order to compare these fractions what do they both have to have?
• You have to get a common denominator.
• How do we get a common denominator?
• You cross multiply each denominator to the whole fraction.
• After cross multiplying what do we do?
• You re-write each fraction.
• What do we compare to see what fraction is greater?
• You compare the numerators on each fraction and see what one is greater or maybe they are equal.
58
Example #2Which Rational
number(fraction)is greater or are they equal.
6 215 5
5 • 6 2 • 15
5 • 15 5 • 15
30 30
75 75
30 = 30
Solution
• In order to compare these fractions what do they both have to have?
• You have to get a common denominator.
• How do we get a common denominator?
• You cross multiply each denominator to the whole fraction.
• After cross multiplying what do we do?
• You re-write each fraction.• What do we compare to
see what fraction is greater?
• You compare the numerators on each fraction and see what one is greater or maybe they are equal.
They are equal
Example #3Which Rational
number(fraction)is greater or are they equal.
-2 -5 3 7
7 • -2 -5 • 3 7 • 3 7 • 3 -14 -15 21 21
-14
Solution
• In order to compare these fractions what do they both have to have?
• You have to get a common denominator.
• How do we get a common denominator?
• You cross multiply each denominator to the whole fraction.
• After cross multiplying what do we do?
• You re-write each fraction.
• What do we compare to see what fraction is greater?
• You compare the numerators on each fraction and see what one is greater or maybe they are equal.
• What is the difference when looking at numerators that are Neg.?
• When both numerators are neg. the smaller number is really greater.
-23
Example #4Which Rational number(fraction)is greater or are they equal.
2¼ 2½
9 54 2
2 • 9 5 • 4 2 • 4 2 • 4
18 20 8 8
20
Solution
• In order to compare these fractions what do we have to do first? (2 steps)
• You have to change the mixed number into a fraction.
• You have to get a common denominator for both fractions.
• How do we get a common denominator?
• You cross multiply each denominator to the whole fraction.
• After cross multiplying what do we do?
• You re-write each fraction.• What do we compare to see
what fraction is greater?• You compare the numerators on
each fraction and see what one is greater or maybe they are equal.
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