Directions : Study the following information carefully and answer the following questions :
A word and number arrangement machine when given an input line of words and numbers rearranges them following a particular rule in each step. The following is an illustration of input and rearrangement :
Input : Now 41 28 Credit Join 37 Go 61
Step 1 : 61 Now 41 28 Credit Join 37 Go
Step 2 : 61 Credit Now 41 28 Join 37 Go
Step 3 : 31 Credit 41 Now 28 Join 37 Go
Step 4 : 61 Credit 41 Go 37 Now 28 Join
Step 5 : 61 Credit 41 Go 37 Now 28 Join
Step 6 : 61 Credit 41 Go 37 Now 28 Join
Step 7 : 61 Credit 41 Go 37 Join 28 Now
Step 7 is the last step for this input.
Input : Now 41 28 Credit Join 37 Go 61
Step 1 : 61 Now 41 28 Credit Join 37 Go
Step 2 : 61 Credit Now 41 28 Join 37 Go
Step 3 : 31 Credit 41 Now 28 Join 37 Go
Step 4 : 61 Credit 41 Go 37 Now 28 Join
Step 5 : 61 Credit 41 Go 37 Now 28 Join
Step 6 : 61 Credit 41 Go 37 Now 28 Join
Step 7 : 61 Credit 41 Go 37 Join 28 Now
Step 7 is the last step for this input.
As per the rules followed in the above steps, find out in each of the following Questions the appropriate step for the given input. (followed by some questions).
Now first lets have a look at the given problem. The logic in the arrangement is : The input is the combination of words and numbers. Firstly, the numbers got arranged in descending order. Whereas the words get arranged in alphabetical order. Numbers occupy the odd places and words occupy even places in the final step. When any element gets arranged, the previous element occupying that place shifts one place towards right. And one more basic rule here we have to remember is, we can make only one change in one step.
In step One, 61 occupies the first place from the left end and the other elements are pushed one place rightward.
Similarly, in the step 2 now occupies the second place from the left end and the other elements are pushed one place rightward.
So, alternate arranging of numbers and words finally gives the last step in which the odd places from the left are occupied by numbers and the even places are occupied by the words.
Shortcuts :
- When ever you see this type of problems just see the last step first. So that you can understand the logic without wasting your valuable time (generally these arrangements will be of assenting and descending orders). Then just check from bottom to top for the arrangement of words. And then only check the questions.
- If you cant get answers mentally, you should write them on paper, but its waste of time. In those type of situations just write the first letters of the words. So, for the above example you can write
- N 41 28 C J 37 G 61 and work with this example. Suppose you encounter two words with the same starting letter then you should write two letters instead of one.
- Ex : If you encounter Gun and Goat as two words you will be confused if you write two Gs. so just write Go and Gu to avoid confusion.
- Without giving you the raw data if they give you some third or fourth step and ask you to find out the Sixth step there is no need to solve the problem completely. If the given step is the third one atleast three words will be already arranged in order. So just check the given arrangement and check how many words are arranged in order and just strike those words with pencil. And just work with the remaining words (as there is no need to change the already arranged words again). It will save your time and effort.
- In some cases the required word or number which is to be arranged will be the first letter in the first letter of the resulting arrangement, in this case we will cut tha word or number but we will not increase the step counter as we do not have to shift it anywhere, it was already at its place
- Keep in mind that If they give you an arrangement and asks you to guess the prior steps (I mean giving you the 5th or 6th step and asking you the prior steps 2nd or 4th), then the answer would be Cant be Determined. Because there wont be any rule for guessing backwards as the word may come from anywhere. Now lets have a look at some examples based on the above problem Here.
0 comments
Readers Comments