1. Passage Reading
2. Verbal Logic
3. Non Verbal Logic
4. Numerical Logic
5. Data Interpretation
6. Reasoning
7. Analytical Ability
8. Quantitative Aptitude

228. The best answer is D.

Start checking from the smaller or bigger numbers on the dice. We will check
from bigger numbers working downwards: start with 6, it has the following
options: (6,5,1), (6,4,2), (6,3,3).

Now pass on to 5: (5,5,2), (5,4,3). Now 4: (4,4,4). And that’s it, these are all
number combinations that are possible, if you go on to 3, you will notice that you
need to use 4, 5 or 6, that you have already considered (the same goes for 2 and
1). Now analyze every option: 6,5,1
has 6 options (6,5,1), (6,1,5), (5,1,6), (5,6,1), (1,6,5), (1,5,6). So do (6,4,2) and
(5,4,3).

Options
(6,3,3) and (5,5,2) have 3 options each: (5,5,2), (5,2,5) and (2,5,5). The same
goes for (6,3,3).

The last option (4,4,4) has only one option. The total is 3*6+2*3+1=18+6+1 = 25
out of 216 i.e, (6x6x6) options.

229. The best answer is B.

We have 20 vertices linking to 17 others each: that is 17*20=340. We divide that
by 2 since every diagonal connects two vertices. 340/2=170. The vertex that
does not connect to any diagonal is just not counted.

230. The best answer is A.

We have 15 Vertices that send diagonals to 12 each (not to itself and not to the
two adjacent vertices). 15*12=180. Divide it by 2 since any diagonal links 2
vertices = 90.

The three vertices that do not send a diagonal also do not receive any since the
same diagonal is sent and received. Thus they are not counted.

231. The best answer is A.

The options for a sum of 14: (6,4,4) has 3 options, (6,5,3) has 6 options, (6,6,2)
has 3 options, (5,5,4) has 3 options. We have 15 options to get 14.

The options for a sum of 8: (6,1,1) has 3 options, (5,2,1) has 6 options, (4,3,1)
has 6 options, (4,2,2) has 3 options, (3,3,2) has 3 options. We have 21 options to
get 8.

Total: 21+15= 36/216 = 1/6.

232.

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