91. Consider the following statements in respect of Census analysis:
1. Hindi is a language and can also be treated as a mother tongue.
2. Bhojpuri is a language and can also be treated as a mother tongue.
2. Bhojpuri is a language and can also be treated as a mother tongue.
Which of the above statements is/are correct?
(a) 1 only
(b) 2 only
(c) Both 1 and 2
(d) Neither 1 nor 2
(a) 1 only
(b) 2 only
(c) Both 1 and 2
(d) Neither 1 nor 2
Answer: (a)
92.
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)
(a) 1 only
(b) 2 only
(c) Both 1 and 2
(d) Neither 1 nor 2
(b) 2 only
(c) Both 1 and 2
(d) Neither 1 nor 2
Answer: (b)
93. Consider the following data:
![](data:image/png;base64,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)
Assuming that proportion of female births is 45%, the value of Gross Reproduction Rate GRR) is approximately:
(a) 0.77
(b) 0.87
(c) 0.97
(d) 1.67
(a) 0.77
(b) 0.87
(c) 0.97
(d) 1.67
Answer: (c)
94. To explain a population distribution, one should refer to:
1. Measures of central tendency
2. Measures of dispersion
3. Measures of skewness and kurtosis
1. Measures of central tendency
2. Measures of dispersion
3. Measures of skewness and kurtosis
Which of the above are correct?
(a) 1 and 2 only
(b) 2 and 3 only
(c) 1 and 3 only
(d) 1, 2 and 3
(a) 1 and 2 only
(b) 2 and 3 only
(c) 1 and 3 only
(d) 1, 2 and 3
Answer: (d)
95. In how many languages are Population Census Schedule canvassed in India?
(a) 22 languages
(b) 16 languages
(c) 14 languages
(d) 12 languages
(a) 22 languages
(b) 16 languages
(c) 14 languages
(d) 12 languages
Answer: (b)
96. Ex‐officio Census Commissioner is:
(a) Secretary, Ministry of Home Affairs, Government of India
(b) Director of National Statistical Commission
(c) Registrar General of India
(d) Chairman of the Indian Economic Society
(a) Secretary, Ministry of Home Affairs, Government of India
(b) Director of National Statistical Commission
(c) Registrar General of India
(d) Chairman of the Indian Economic Society
Answer: (c)
97. Consider the following data:
![](data:image/png;base64,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)
The value of General Fertility Rate is approximately:
(a) 69 per thousand
(b) 71 per thousand
(c) 73 per thousand
(d) 75 per thousand
(a) 69 per thousand
(b) 71 per thousand
(c) 73 per thousand
(d) 75 per thousand
Answer: (b)
98. Consider the following data:
![](data:image/png;base64,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)
The value of Age Specific Fertility Rate for the age group 20‐34 is:
(a) 112
(b) 114
(c) 116
(d) 118
(a) 112
(b) 114
(c) 116
(d) 118
Answer: (b)
99. It is given in Life Table that the complete expectation of life at ages 30 and 31 for a group are 21.4 and 20.9 respectively. The number of persons living at the age of 30 is 40,000. Then the number of persons who attained the age 31 is approximately:
(a) 33000
(b) 35000
(c) 37000
(d) 39000
(a) 33000
(b) 35000
(c) 37000
(d) 39000
Answer: (d)
100. It is given in life table that the complete expectation of life at ages 30 and 31 for a group are 21.4 and 20.9 respectively. The number of persons living at the age of 30 is 40,000. Then the number of persons who will die without attaining the age 31 is approximately:
(a) 7000
(b) 1000
(c) 3000
(d) 5000
(a) 7000
(b) 1000
(c) 3000
(d) 5000
Answer: (b)
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