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Logical Reasoning
Number Series
364,361,19,16,4,1,?
Read Solution (Total 24)
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- 1
(364-3=361),(Sqrt361=19),(19-3=16),(Sqrt16=4),(4-3=1),(Sqrt1=1),(1-3=-2) - 11 years agoHelpfull: Yes(54) No(1)
- ans=1
364-3=361,sqrt(361)=19
19-3=16,sqrt(16)=4
4-3=1,sqrt(1)=1 - 11 years agoHelpfull: Yes(12) No(0)
- 364-361=3, sqrt(361)=19
19-16=3, sqrt(16)=4
4-1=3, sqrt(1)=1
so answer is 1 - 11 years agoHelpfull: Yes(7) No(0)
- 364-3=361, root of 361=19
19-3=16, root of 16=4
4-3=1, root of 1=1
1is the answer - 11 years agoHelpfull: Yes(2) No(0)
- in this series there are two terms are involved first is difference of 3 and second one is square of next number so,
364-3=361,
19^2,19,19-3=16,4^2,4,4-3=1=1^2=1,1
therefore next term will be 1 - 11 years agoHelpfull: Yes(2) No(0)
- ans is 1
alternate subtract by 3 and square root
364-3=361
root of 361=19
19-3=16
root of 16= 4
4-3=1
root of 1 =1 - 11 years agoHelpfull: Yes(1) No(0)
- 1
(364-3=361),(Sqrt361=19),(19-3=16),(Sqrt16=4),(4-3=1),(Sqrt1=1)
so,the next term is 1 - 11 years agoHelpfull: Yes(1) No(0)
- 364-361=3 and square root of 361 is 19
19-16=3 and square root of 16 is 4
4-1=3 and square root of 1 is 1 - 11 years agoHelpfull: Yes(1) No(0)
- By the series Ans is 1.
- 11 years agoHelpfull: Yes(0) No(0)
- the numbers in even place are obtained by subtracting 3 from the previous number.
the numbers in odd place are obtained by taking square root of the previous number.
So the answer is 1 - 11 years agoHelpfull: Yes(0) No(0)
- x-3,sqrt(x)
i.e, 364,364-3,sqrt(361),...
ANS:1 - 11 years agoHelpfull: Yes(0) No(0)
- 1 will be the answer because every third term out of three no.s are being included in next as well as previous sets
364,361,19 it can be seen from here that 364-3=361 and sqrt of 361 = 19
in next series 19,16,4 19-16=3 and sqrt of 16 = 4
and similarly 4,1,.. 4-1=3 and sqrt of 1 = 1 ans - 11 years agoHelpfull: Yes(0) No(0)
- 364-3=361
sqrt(361)=19
19-3=16
sqrt(16)=4
4-3=1
sqrt(1)=1
so ans is 1 - 11 years agoHelpfull: Yes(0) No(0)
- If we consider this series as composed of two series as
364,19,4,x and 361,16,1
Then considering the first series it's clear that it follows pattern like
19^2+3,4^2+3,1^2+3 hence x is 1.
so the next term in the series is 1. - 11 years agoHelpfull: Yes(0) No(0)
- 1^2 = 1 + 3 = 4^2 = 16 + 3 = 19^2 = 361+3 = 364
so 1ans
- 11 years agoHelpfull: Yes(0) No(0)
- do change left to right
?,1,4,16,19,361,364
(-2+3),(1*1),(1+3),(4*4),(16+3),(19*19),(361+3)
answer is -2
- 11 years agoHelpfull: Yes(0) No(2)
- 1
starting from left do two things first 364-3=361
then take sqrt of 361=19
then sub 3 we get next term 16
now take sqrt we get next term 4
now sub 3 we get next term 1
now take sqrt of 1 ie 1
so answer is one..
- 11 years agoHelpfull: Yes(0) No(0)
- 19^2=361
19-3=16
4^2=16
4-3=1
1^2=1
- 11 years agoHelpfull: Yes(0) No(0)
- 1
364-3=361
sqr root of 361=19
19-3=16
sqr root of 16=4
4-3=1
sqr root of 1=1 - 10 years agoHelpfull: Yes(0) No(0)
- 19^2+3,19^2,19,19-3,19-(3*5),19-(3*6),19-(3*7)
so the last digit is 2(ans) - 10 years agoHelpfull: Yes(0) No(0)
- 364=361+3
361=19*19
19=16+3
16=4*4
4=1+3
1=1*1
so answer is 1 - 10 years agoHelpfull: Yes(0) No(0)
- 364,364-3=19^2,19,19-3=4^2,4,4-3=1^2,1
364,361,19,16,4,1,1 - 9 years agoHelpfull: Yes(0) No(0)
- 364 - 3 = 361
361 's square root is 19
same as 19 - 3 = 16
16 's square root is 4
so, 4 - 3 = 1
same as above 1 's square root is 1
so the answer is 1 - 7 years agoHelpfull: Yes(0) No(0)
- 1
364-3 = 361
19^2 = 361
19-3 = 16
4^2 = 16
4-3 = 1
1^2 = 1 - 6 years agoHelpfull: Yes(0) No(0)
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