Shortcut Tricks on Fraction
Type – 1
When
the numerators are same and the denominators are different, the fraction with
the largest denominator is the smallest.
Have
a look at the following example.
Example: Which of the
following fractions is the smallest?
(3/5)
, (3/7) , (3/13), (3/8)
Here,
13 is the largest denominator, so, (3/13) is the smallest fraction. 5 is the
smallest denominator, hence (3/5) is the largest fraction.
Here
logic is very simple,
Situation:
(i) Assume
that you are 5 Children in your family. Your Dad brought an Apple and mom cut
it into 5 pieces and distributed among all the children including you. (1/5)
Situation
(ii) :
Assume that you are 8 Children in your family. Your Dad brought an Apple and
mom cut it into 8 pieces and distributed among all the children including you.
(1/8)
Type - 2
When
the numerators are different and the denominators are same, the fraction with
the largest numerator is the largest. Have a look at the following
example.
Example: Which of the
following fractions is the smallest?
(7/5)
, (9/5), (4/5), (11/5)
As
4 is the smallest numerator, the fraction 4/5 is the smallest.
As
11 is the largest numerator, the fraction 11/5 is the largest.
Here
too logic is very simple,
Situation
1 :
Assume that you are 4 Children in your family. Your Dad brought 8 Apples and
mom distributed them among all the children including you. (8/4)
Situation
2 :
Assume that you are 4 Children in your family. Your Dad brought 12 Apples and
mom distributed them among all the children including you. (12/4)
Type - 3
The
fraction with the largest numerator and the smallest denominator is the
largest.
Example: Which of the
following fractions is the largest?
(19/16),
(24/11), (17/13), (21/14), (23/15)
Solution : As 24 is the
largest numerator and 11 is the smallest denominator, 24/11 is the largest
fraction.
Type - 4
When
the numerators of two fractions are unequal, we try and equate them by suitably
cancelling factors or by suitably multiplying the numerators. Thereafter we
compare the denominators as in TYPE 1. Have a look at
the following examples.
Example: Which of the
following fractions is the largest?
(64/328),
(28/152), (36/176), (49/196)
Solution : 64/328 =
32/164 = 16/82 = 8/41 this is approximately equal to 1/5
Note
: In
these type of problems, approximate values will be enough. No need to get EXACT
values.
25/152
= 14/76 = 7/38 this is approximately equal to 1/5.5
36/176
= 18/88 = 9/44 this is approximately equal to 1/5
49/196
= 7/28 = ¼
As
all the numerators are 1 and the least denominator is 4, the fraction 49/196 is
the largest
Example: Which of the
following fractions is the largest?
(71/181),
(214/519), (429/1141)
Solution : (71/181) =
(71 X 6) / (181 X 6) = 426/1086
(214/519)
= (214 X 2) / (519 X 2) = 428/1038
The
numerators are now all ALMOST equal (426, 428 and 429). The smallest
denominator is 1038.
So,
the largest fraction must be 428/1038 that is 214/519 :)
Type - 5
For
a fraction Less than 1 :
If
the difference between the numerator and the denominator is same then the
fraction with the larger values of numerator and denominator will be the
largest. Have a look at the following example.
Example: Which of the
following fractions is the largest?
(31/37),
(23/29), (17/23), (35/41), (13/19)
Solutions: difference
between the numerator and the denominator of each fraction is 6.... So the
fraction with the larger numerals i.e., 35/41 is the greatest and the fraction
with smaller numerals i.e., 13/19 is the smallest.
Type - 6
For
a fraction Greater than 1
If
the difference between the numerator and denominator is same, then the fraction
with the smaller values will be the largest.
Example: Which of the
following fraction is largest ?
(31/27),
(43/39), (57/53), (27/23), (29/25)
Solution : As the
difference between the numerator and the denominator is same, the fraction with
the smaller values i.e., 27/23 is the largest.
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