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which is the odd number out in the series: 462,385, 198, 253, 781, 594?
A
683
B
198
C
781
D
594
Correct Answer:
781
Which is the odd number out in the series: 462, 385, 198, 253, 781, 594?
A
683
B
198
C
781
D
594
Let the statement be “If n is not an odd integer then sum of n with some not odd number will not be odd.”, then if P(n) is “n is an not an odd integer” and Q(n) is “sum of n with some not odd number will not be odd.” A proof by contraposition will be ________
A
∀nP ((n) → Q(n))
B
∃ nP ((n) → Q(n))
C
∀n~(P ((n)) → Q(n))
D
∀n(~Q ((n)) → ~(P(n)))
Select a figure from amongst the Answer Figures which will continue the same series as established by the five Problem Figures.
A
1
B
2
C
3
D
4
E
5
There are 5 consecutive odd numbers. If the difference between square of the average of first two odd number and the of the average last two odd numbers is 396, what is the smallest odd number?
A
29
B
27
C
31
D
33
The sum of three consecutive odd numbers and three consecutive even numbers together is 231. Also, the smallest odd number is 11 less than the smallest even number. What is the sum of the largest odd number and the largest even number ?
A
74
B
82
C
83
D
Cannot be determined
E
None of these
Find the missing number?
A
82
B
86
C
81
D
89
Your inside locals are not being translated to the inside global addresses. Which of the following commands will show you if your inside globals are allowed to use the NAT pool? ip nat pool Corp 198.18.41.129 198.18.41.134 netmask 255.255.255.248 ip nat inside source list 100 int pool Corp overload
A
debug ip nat
B
show access - list
C
show ip nat translation
D
show ip nat statistics
Pick an odd man in the given number series? 4 12 38 87 198
A
12
B
38
C
87
D
198
Sum of 4 consecutive even numbers is greater than three consecutive odd numbers by 81 . If the sum of the least odd and even numbers is 59 then find the sum of largest of odd and even numbers is 59 then find the sum of largest odd and even numbers.
A
69
B
53`
C
65
D
72
Let the statement be “If n is not an odd integer then square of n is not odd.”, then if P(n) is “n is an not an odd integer” and Q(n) is “(square of n) is not odd.” For direct proof we should prove _________
A
∀nP ((n) → Q(n))
B
∃ nP ((n) → Q(n))
C
∀n~(P ((n)) → Q(n))
D
∀nP ((n) → ~(Q(n)))