![]() ![]() Up until then, New York was chasing Ottawa all over the ice. It was Richards’ third goal of the season and first in 16 games, dating to Jan. Following a defensive zone faceoff, Hagelin raced the puck up left wing and dropped it back to Richards, who heeded the chants of the home crowd and fired a one-timer from the top edge of the circle that beat Lehner to the glove side. Richards tied it with 2:21 left in the first off a feed from Carl Hagelin. ![]() Nash has six goals in five games, along with three assists, and he has a nine-game point streak that predates his injury. This advertisement has not loaded yet, but your article continues below. Manage Print Subscription / Tax Receipt.We also see the results of the additions here are in alternating sequence $ 21,36,43,58,65,82. We can also follow a similar rule $ a+b=a\times b+9 $ and $ a+b=a\times b+13 $ alternatively to find the same result. We note that the addition rule for two numbers can be defined as $ a+b=10b+a $ and $ a+b=\left( 10b+a \right)+b $ alternatively. So we multiply 10 with second operand 5 add the first operand 4 and then add 4 again with the result to get 58, which means So we follow the above rule and observe the fourth addition $ 4+5=? $ where we are given operands but not result. We see in the second addition that we have to follow the same rule as for the first and third addition but we have to add 4 in the result. We see in the first and third addition that the second operand is multiplied 10 and added to the first operand. We now observe alternating additions from top to bottom. We shall not find any rule that satisfies the first three lines. We try to guess a rule that should work for the first three additions using addition and multiplication. ![]() So multiplication operation is involved in the new rule for addition. We see that the operands in the first three addition $ 1,2 $ or $ 2,3 $ or $ 3,4 $ are very small numbers compared to the result of addition 21, 32, or 43 respectively. We see that the addition operation here is not our usual addition we know. We are asked to find the missing number in the following puzzle. We find another rule for the second and fourth lines, We find use the rule to find the missing number. We try to guess a rule using the results of newly defined addition here. Hint: We see that the plus sign in this puzzle does not follow the usual addition. ![]()
0 Comments
Leave a Reply. |
AuthorWrite something about yourself. No need to be fancy, just an overview. ArchivesCategories |