S1: Politeness is not a quality possessed by only one nation or race.P: One may observe that a man of one nation will remove his hat or fold his hands by way of greetings when he meets someone he knows.Q: A man of another country will not do so.R: It is a quality to be found among all peoples and nations in every corner of the earth.S: Obviously, each person follows the custom of his particular country.S6: In any case, we should not mock at other's habits. The Proper sequence should be:

S1: Politeness is not a quality possessed by only one nation or race. P: One may observe that a man of one nation will remove his hat or fold his hands by way of greetings when he meets someone he knows. Q: A man of another country will not do so. R: It is a quality to be found among all peoples and nations in every corner of the earth. S: Obviously, each person follows the custom of his particular country. S6: In any case, we should not mock at other's habits. The Proper sequence should be:

S₁:Politeness is not a quality possessed by only one nation or race.
P :One may observe that a man of one nation will remove his hat or fold his hands by way of greetings when he meets someone he knows.
Q :A man of another country will not to do so.
R :It is a quality to be found among all peoples and nations in every corner of the earth.
S :Obviously, each person follows the custom of his particular country.
S₆:In any case, we should not mock at others habits.

The Proper sequence should be:

A

RPQS

B

RPSQ

C

PRQS

D

QPRS

The primitive translation vectors of the body centred cubic lattice are $$\overrightarrow {\bf{a}} = \frac{a}{2}\left( {{\bf{\hat x}} + {\bf{\hat y}} - {\bf{\hat z}}} \right),\,\overrightarrow {\bf{b}} = \frac{a}{2}\left( { - {\bf{\hat x}} + {\bf{\hat y}} + {\bf{\hat z}}} \right)$$ and $$\overrightarrow {\bf{c}} = \frac{a}{2}\left( {{\bf{\hat x}} - {\bf{\hat y}} + {\bf{\hat z}}} \right)$$ . The primitive translation vectors $$\overrightarrow {\bf{A}} ,\,\overrightarrow {\bf{B}} $$ and $$\overrightarrow {\bf{C}} $$ of the reciprocal lattice are

A

$$\overrightarrow {\bf{A}} = \frac{{2\pi }}{a}\left( {{\bf{\hat x}} - {\bf{\hat y}}} \right);\,\overrightarrow {\bf{B}} = \frac{{2\pi }}{a}\left( {{\bf{\hat y}} + {\bf{\hat z}}} \right);\,\overrightarrow {\bf{C}} = \frac{{2\pi }}{a}\left( {{\bf{\hat x}} + {\bf{\hat z}}} \right)$$

B

$$\overrightarrow {\bf{A}} = \frac{{2\pi }}{a}\left( {{\bf{\hat x}} - {\bf{\hat y}}} \right);\,\overrightarrow {\bf{B}} = \frac{{2\pi }}{a}\left( {{\bf{\hat y}} - {\bf{\hat z}}} \right);\,\overrightarrow {\bf{C}} = \frac{{2\pi }}{a}\left( {{\bf{\hat x}} + {\bf{\hat z}}} \right)$$

C

$$\overrightarrow {\bf{A}} = \frac{{2\pi }}{a}\left( {{\bf{\hat x}} + {\bf{\hat y}}} \right);\,\overrightarrow {\bf{B}} = \frac{{2\pi }}{a}\left( {{\bf{\hat y}} + {\bf{\hat z}}} \right);\,\overrightarrow {\bf{C}} = \frac{{2\pi }}{a}\left( {{\bf{\hat x}} - {\bf{\hat z}}} \right)$$

D

$$\overrightarrow {\bf{A}} = \frac{{2\pi }}{a}\left( {{\bf{\hat x}} + {\bf{\hat y}}} \right);\,\overrightarrow {\bf{B}} = \frac{{2\pi }}{a}\left( {{\bf{\hat y}} + {\bf{\hat z}}} \right);\,\overrightarrow {\bf{C}} = \frac{{2\pi }}{a}\left( {{\bf{\hat x}} + {\bf{\hat z}}} \right)$$

There are five hobby clubs in a college viz., photography, yachting, chess, electronics and gardening. The gardening group meets every second day, the electronics group meets every third day, the chess group meets every fourth day, the yachting group meets every fifth day and the photography group meets every sixth day. How many times do all the five groups meet on the same day within 180 days?

A

3

B

5

C

10

D

18

There are five hobby clubs in a college - photography, yachting, chess, electronics and gardening. The gardening group meets every second day, the electronics group meets every third day, the chess group meets every fourth day, the yachting group meets every fifth day and the photography group meets every sixth day. How many times do all the five groups meet on the same day within 180 days?

A

5

B

18

C

10

D

3

If the resultant of $\vec{A}=6\hat{A}$ and $\vec{B}=8\hat{B}$ is $\vec{R}=10\hat{R}$ where $\hat{A},\hat{B}$ and $\hat{R}$ are the unit vectors along $\vec{A},\vec{B}$ and $\vec{R}$, then the value of $\vec{A}\cdot \vec{B}$ will be

A

50 units

B

100 units

C

0

D

None

There are four hobby clubs in a college viz., painting, photography, chess and dancing. The painting group meets every second day, the photography group meets every third day, the chess group meets every fourth day and the dancing group meets every fifth day. How many times do all the five group meet on the same day with in 240 days?

A

120

B

12

C

5

D

4

In the following question the 1st and the last part of the sentence/passage are numbered 1 and 6. The rest of the sentence/ passage is split into four parts and named P, Q, R and S. These four parts are not given in their proper order. Read the sentence/passage and find out which of the five combinations is correct. 1 - The mayor walked up and down the vestibule of the hotel with his hands under his coat tails, as if he were merely seeking a cooler atmosphere than that of the room he had quitted. P - At length he went back to the door of the dining-room, paused, and found that the songs, toasts, and conversation were proceeding quite satisfactorily without his presence. Q - But there could be no doubt that he was in reality still possessed to the full by the new idea, whatever that might be. R - The Corporation, private residents, and major and minor tradesmen had, in fact, gone in for comforting beverages to such an extent that they had quite forgotten, not only the Mayor, but all those vast, political, religious, and social differences which they felt necessary to maintain in the daytime, and which separated them like iron grills. S - Seeing this the Mayor took his hat, and when the waiter had helped him on with a thin holland overcoat, went out and stood under the portico. 6 - Very few persons were now in the street; and his eyes, by a sort of attraction, turned and dwelt upon a spot about a hundred yards further down.

A

QPRS

B

RSQP

C

SPQR

D

SRQP

At the beginning of a party, each person present shook hands with all other people present and there were in all 45 handshakes. In the midst of the party, 2 persons left due to an emergency. Now, the number of males and females present in the party was equal. At the end, each female shook hands only with every female present and each male shook hands only with every male present. What is the total number of handshakes that took place at the party?

A

55

B

57

C

53

D

59

Rima is traveling in her car at the speed of 60 km/hr. She drops her hat and didn’t recognize it for 10 minutes, during this time the hat travels due to air drag. As soon as she recognizes this she turns her car around and drive 50% faster to get her favourite hat, so that she could get her hat after 15 minutes after the fall. Find the average speed of the hat with which it travelled till it was caught.

A

20 km/hr

B

10 km/hr

C

30 km/hr

D

40 km/hr

$${\bf{\hat A}}$$ and $${\bf{\hat B}}$$ represent two physical characteristics of a quantum system. If $${\bf{\hat A}}$$ is Hermitian, then for the product $${\bf{\hat A\hat B}}$$ to be Hermitian, it is sufficient that

A

$${\bf{\hat B}}$$ is Hermitian

B

$${\bf{\hat B}}$$ is anti-Hermitian

C

$${\bf{\hat B}}$$ is Hermitian and $${\bf{\hat A}}$$ and $${\bf{\hat B}}$$ commute

D

$${\bf{\hat B}}$$ is Hermitian and $${\bf{\hat A}}$$ and $${\bf{\hat B}}$$ anti-commute

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