Direction: In the following questions, the symbols @. ©,  , % and * are used with the following meaning as illustrated below. |
| \[P\text{ }\text{ }Q'\]means 'P is not greater than Q'. |
| \[P\text{ }%\text{ }Q'\]means 'P is not smaller than Q'. |
| \[P\text{ }*\text{ }Q'\]means 'P is neither smaller than nor equal to Q'. |
| \[P\text{ }\text{ }Q'\]means 'P is neither greater than nor equal to Q'. |
| \[P\text{ }\\text{}Q'\]means 'P is neither greater than nor smaller than Q'. |
| Now, in each of the following questions assuming the given statements to be true, find which of the two Conclusions I and II given below them is/ are definitely true? |
| Statements |
| \[D\text{ }%\text{ }B\], \[B\text{ }*\text{ }T\], \[T\text{ }\\text{}M\] |
| Conclusions |
| I. \[T\text{ }\text{ }D\] |
| II.\[M\text{ }\text{ }D\] |
| Give answer |
A) if only Conclusion I is true
B) if only Conclusion II is true
C) if either Conclusion I or II is true
D) if neither Conclusion I nor II is true
E) if both Conclusions I and II are true
Correct Answer: D
Solution :
|
|||||
| Therefore, \[H\le W=M<B\] | |||||
| Conclusions | |||||
| I.\[B*H\Rightarrow B>H\](True) | |||||
| II.\[M%H\Rightarrow M\ge H\](True) | |||||
| So, both Conclusions I and II are true. |
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