192, 021, 222, 324, 252, 627, and the last two are 282 and 921. Write all the figures from top to bottom and you will find a diagonal sequence of numbers (from right to left) as 1, 2,3 4 and so on and one diagonal line as 2,2,2 alternatively.
Asim Nazir, I did mean to put it as 282 and 920, reaching it by the same conclusion you did. But why did you choose 921 andnot 920, which would have fit the pattern according to line 2 (021)?
The second solution could be forementioned diagonal numbering:
192 021 222 324 252 627 282 920
Where from right to left numbers get +1 added and and a diagonal of 2's to separate them.
However both logics work and it is impossible to tell which one is correct here 930 or 920. This solution would need another set of numbers to be sure.
Although I'm assuming that the author meant the diagonal solution here., so 920 is correct.
7 comments:
192, 021, 222, 324, 252, 627, and the last two are 282 and 921. Write all the figures from top to bottom and you will find a diagonal sequence of numbers (from right to left) as 1, 2,3 4 and so on and one diagonal line as 2,2,2 alternatively.
128 and 920
192, 021, 222, 324, 252, 627, 282, 9230
That last one troubles me a bit.
Taking the odd terms.
1: 192 = 64 x 3
3: 222 = 74 x 3
5: 252 = 84 x 3
so 7: 94 x 3 = 282
Then the even terms:
2: 021 = 7 x 3
4: 324 = 108 x 3
6: 627 = 209 x 3
sp 8: 310 x 3 = 930
Big_Lar
Asim Nazir, I did mean to put it as 282 and 920, reaching it by the same conclusion you did. But why did you choose 921 andnot 920, which would have fit the pattern according to line 2 (021)?
The numbers form logic over one.
192, 222, 252, 2 _ _?
021, 324, 627, 9 _ _?
The first line gets 3 added to the middle number, so 30
The second like gets 3 added to the first and last number, so 303.
192 + 30 = 222 +30 =252 +30 = 282
021 + 303 = 324 + 303 = 627 + =303 = 930
The second solution could be forementioned diagonal numbering:
192
021
222
324
252
627
282
920
Where from right to left numbers get +1 added and and a diagonal of 2's to separate them.
However both logics work and it is impossible to tell which one is correct here 930 or 920. This solution would need another set of numbers to be sure.
Although I'm assuming that the author meant the diagonal solution here., so 920 is correct.
Post a Comment