Uma was not able to understand the concept of odd and even numbers. In order to improve her understanding, the teacher took some 20 pebbles of different colours and asked her to pair them up and sort out the numbers from 1 to 20 for which pebbles get paired up or do not get paired up. Uma

In a simulataneous throw of a pair of dice, find the probability of getting: 8 as the sum (ii) a doublet a doublet of prime numbers a doublet of odd numbers a sum greater than 9 (vi) an even number on first an even number on one and a multiple of 3 on the other neither 9 or 11 as the sum of the numbers on the faces a sum less than 6 (x) a sum less than 7 a sum more than 7 (xii) at least once a number other than 5 on any dice even number on each die 5 as the sum (xvi) 2 will come up at least once 2 will not come either time

At the same time, Black widow goes to Vormir to get the soul stone. She is stopped by Red skull who says that she can obtain the stone only if she plays a logic game with him. He starts explaining the rules of the game as follows: There are two piles of pebbles, each pile less than equal to 15 pebbles. The two players take turns picking up pebbles. 1. You can pick up any or all the pebbles in one pile, or 2. You can pick up pebbles from both piles, but only if you take the same number from each pile. The player who takes the last pebble wins. Winning positions include (1, 0) (Meaning 1 pebble in the first pile, none in the second) and (n, n). You pick up, respectively, 1 pebble (rule 1) and 2w pebbles (rule 2). (1, 2) is a losing position: But though (1, 2) loses, not only (1, 0) and (1, 1) but any other (1, n) wins. A player simply picks up (n — 2) pebbles from the second pile, leaving (1,2). There are many other losing positions other than (1,2). Help her find all such losing positions. What is the total sum of the differences of the two numbers of all the distinct losing pairs?

In these type of questions, certain pairs of numbers are given out of which all except one are similar in some manner while one is different. The numbers in these similar pairs may have the same property or may be related to each other according to the same rule. The candidate is required to choose the odd pair. Choose the numeral pair which is different from others.