#dailyquizadda #CodedInequality #Reasoning #Bank
Q. (1) Statement: F < B ≥ A = C
> D
Conclusion: (1) B ≥ C (2) F > C
Conclusion: (1) B ≥ C (2) F > C
You have to
find whether the conclusions (1) and (2) are true or false.
How to solve
such questions quickly? The answer is "Magic Square"
When you get
the rough sheet in the examination hall, immediately draw this magic square.
Although after solving more and more questions, soon you would be able to
memorize it.
Rules of magic
square:
- Always prefer smaller value:
- Simple and (`) do not have any relation
- "3" is universal
Now let's move
to the question
Conclusion 1 (B
≥ C)
The first
conclusion is B ≥ C. We know from the magic square that ≥ evaluates to
"2". Now, note the positions of B and C in the statement and solve
all the signs between them.
Note: There is
a typo in the above image. It should be F < B
We know that
among two numbers, we choose the smaller one. Hence 2 and 3 evaluate to 2.
The statement
as well as the conclusion evaluates to "2". This means that this
conclusion is correct.
Conclusion 2 (F
> C)
Second
conclusion F > C. We know from the magic square that > evaluates to 1.
Now, note the positions of F and C in the statement and solve all the signs
between them.
You won't be
able to solve the statement because the first two symbols do not have a
relation between them. So no need to check the rest.
If at any point
in the statement you encounter "no relation" between symbols, you can
be sure that the conclusion is wrong.
Q. 2) Statement: F < A =
B ≥ C ≤ D
Conclusion: (1) B
> F (2) A ≥ C
Conclusion 1 (B > F)
Notice that in the statement, the direction is from F to B, but in the conclusion (B > F), the direction is from B to F. Hence to make the directions same, we will write the conclusion as F < B. So it evaluates to 1`.
Conclusion 1 (B > F)
Notice that in the statement, the direction is from F to B, but in the conclusion (B > F), the direction is from B to F. Hence to make the directions same, we will write the conclusion as F < B. So it evaluates to 1`.
The statement
evaluates to 1` and the conclusion too evaluates to 1`. Hence the
conclusion is right.
Conclusion 2 (A ≥ C)
Here the direction is same. So simply, the conclusion evaluates to 2. Now evaluate the statement.
Conclusion 2 (A ≥ C)
Here the direction is same. So simply, the conclusion evaluates to 2. Now evaluate the statement.
The statement
as well as the conclusion evaluates to 2. Hence the conclusion is right.
In the similar manner you can solve all the questions of Coded Inequality quickly. But make sure the question is in the desired format. Notice the below question for instance,
In the similar manner you can solve all the questions of Coded Inequality quickly. But make sure the question is in the desired format. Notice the below question for instance,
Q. Statements F % T, T @ J, J # W.
Conclusions 1)
J @ F. 2) J # F
Note that:
P is neither
smaller than nor equal to Q means P > Q
P is neither
greater than nor smaller than Q means P = Q
P is neither
greater than nor equal to Q means P < Q
P is not
greater than Q means P ≤ Q
First convert
the statement in the desired format.
Statement:
F ≤ T = J > W
Conclusion: (1)
J = F (2) J > F
Now solve the
question with magic square method.
#dailyquizadda #Bank #KeepLearning
Nice
ReplyDeleteA charming conversation is worth remark. I believe that you should distribute more on this topic, it probably won't be an untouchable issue yet for the most part indivliveiduals don't examine these issues. To the following! Kind respects!!
ReplyDelete