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30 Apr 2020, 01:11
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E
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68% (02:02) correct
32%
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based on 65
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If a, b, c and d are positive integers, how many of these are odd?
(1) a+b=c+d+2
(2) a+b < 6
(1) a+b=c+d+2
(2) a+b < 6
ArunSharma12
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Updated on: 30 Apr 2020, 02:52
Originally posted by ArunSharma12 on 30 Apr 2020, 01:32.
Last edited by ArunSharma12 on 30 Apr 2020, 02:52, edited 1 time in total.
Last edited by ArunSharma12 on 30 Apr 2020, 02:52, edited 1 time in total.
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chetan2u
a,b,c & d > 0
statement 1:
a+b=c+d+2
this tells us number of odd numbers should be even.
either 0,2 or 4 number of given numbers (a,b,c,d) can be odd.
not sufficient
statement 2:
a+b < 6
possible pairs of (a,b): (1,2),(1,3),(1,4),(2,2)(2,3)
but we do not know values of c & d.
not sufficient
combining both statements,
- (1,2): c+d =1; not possible because numbers are positive
(1,3): c+d=2; (c,d): (1,1)-> number of odd numbers: 4
(1,4): c+d=3; (c,d): (1,2)-> number of odd numbers: 2
(2,2): c+d=2; (c,d): (1,1)-> number of odd numbers: 2
(2,3): c+d=3; (c,d):(1,2)-> number of odd numbers: 2
30 Apr 2020, 01:35
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If a, b, c and d are distinct positive integers, how many of these are odd?
a,b,c and d > 0
(1) a+b=c+d+2
CASE I: o + o = o + o + 2 = e ---> n(odd) = 4
CASE II: o + o = e + e + 2 = e ---> n(odd) = 2(since we don't know what values each of them hold.)
INSUFFICIENT.
(2) a+b < 6
CASE I: a + b = 2 + 3 = 5 ----> n(odd) = 4 if c and d are also odd.
CASE II: a + b = 2 + 3 = 5 ----> n(odd) = 2 if c and d are even.
INSUFFICIENT.
Together 1 and 2
Since a + b < 6,
c + d < 4
Thus, 1 + 2 < 4 OR 2 + 1 < 4 in either case only one is odd
So,
a + b = 1 + 2 + 2 = 5
a and b can't take 1 and 2 as their values since the are distinct positive integers.
But either of a and b also can't take values greater than 4.
Hence Possible values are 3 and 4 only. However, this invalidates the condition as:
a + b = 3 + 4 > 4
Answer E.
a,b,c and d > 0
(1) a+b=c+d+2
CASE I: o + o = o + o + 2 = e ---> n(odd) = 4
CASE II: o + o = e + e + 2 = e ---> n(odd) = 2(since we don't know what values each of them hold.)
INSUFFICIENT.
(2) a+b < 6
CASE I: a + b = 2 + 3 = 5 ----> n(odd) = 4 if c and d are also odd.
CASE II: a + b = 2 + 3 = 5 ----> n(odd) = 2 if c and d are even.
INSUFFICIENT.
Together 1 and 2
Since a + b < 6,
c + d < 4
Thus, 1 + 2 < 4 OR 2 + 1 < 4 in either case only one is odd
So,
a + b = 1 + 2 + 2 = 5
a and b can't take 1 and 2 as their values since the are distinct positive integers.
But either of a and b also can't take values greater than 4.
Hence Possible values are 3 and 4 only. However, this invalidates the condition as:
a + b = 3 + 4 > 4
Answer E.
