Construct Quantity index number from the given data: Commodity A B C D E Base year quantities 170 150 100 195 205 Current year quantities 90 70 75 150 95

प्रश्न

Construct Quantity index number from the given data:

Commodity	A	B	C	D	E
Base year quantities	170	150	100	195	205
Current year quantities	90	70	75	150	95

संख्यात्मक

उत्तर

Quantity Index Number: Q₀₁ = `(sum"q"_1)/(sum"q"_0)` × 100

Commodity	A	B	C	D	E	Total
Base year quantities	170	150	100	195	205	Σq₀ = 820
Current year quantities	90	70	75	150	95	Σq₁ = 480

Q₀₁ = `"480"/"820"` × 100 = 58.54

Quantity Index number = 58.54

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Index Numbers

क्या इस प्रश्न या उत्तर में कोई त्रुटि है?

Q 2 Q 1 Q 1

अध्याय 6: Index Numbers - Answer the following

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एससीईआरटी महाराष्ट्र Economics [English] 12 Standard HSC

अध्याय 6 Index Numbers
Answer the following | Q 2

2021-2022 (March) Model set 1 shaalaa.com (with solutions)

Q 3.C | 4 marks

संबंधित प्रश्न

Statements that are incorrect in relation to index numbers:

An index number is a geographical tool.
Index numbers measure changes in air pressure.
Index numbers measure relative changes in an economic variable.
Index numbers are specialized averages.

______ : Base year prices :: P₁ : Current year prices.

State with reason whether you agree or disagree with the following statement:

Index numbers measure changes in the price level only.

Explain the features of index numbers.

Features of index numbers:

It is useful in framing suitable economic policies.
It is useful to present financial data in real terms
Index numbers are statistical devices.
Index numbers are specialized averages.

Find the odd word

Types of index numbers -

Index number which is computed from a single variable called is a ______.

Assertion (A): Index numbers are statistical devices.

Reasoning (R): Index numbers measure only changes in the price level over a period of time.

Define Index Number

State the uses of Index Number

Define Laspeyre’s price index number

Explain Paasche’s price index number

Define Time Reversal Test

Explain factor reversal test

Define true value ratio

State the uses of cost of Living Index Number

Calculate by a suitable method, the index number of price from the following data:

Commodity	2002		2012
Commodity	Price	Quantity	Price	Quantity
A	10	20	16	10
B	12	34	18	42
C	15	30	20	26

Calculate price index number for 2005 by (a) Laspeyre’s (b) Paasche’s method

Commodity	1995		2005
Commodity	Price	Quantity	Price	Quantity
A	5	60	15	70
B	4	20	8	35
C	3	15	6	20

Compute (i) Laspeyre’s (ii) Paasche’s (iii) Fisher’s Index numbers for the 2010 from the following data.

Commodity	Price		Quantity
Commodity	2000	2010	2000	2010
A	12	14	18	16
B	15	16	20	15
C	14	15	24	20
D	12	12	29	23

Using the following data, construct Fisher’s Ideal index and show how it satisfies Factor Reversal Test and Time Reversal Test?

Commodity	Price in Rupees per unit		Number of units
Commodity	Basic year	Current year	Base year	Current year
A	6	10	50	56
B	2	2	100	120
C	4	6	60	60
D	10	12	50	24
E	8	12	40	36

Using Fisher’s Ideal Formula, compute price index number for 1999 with 1996 as base year, given the following:

Year	Commodity: A		Commodity: B		Commodity: C
Year	Price (Rs.)	Quantity (kg)	Price (Rs.)	Quantity (kg)	Price (Rs.)	Quantity (kg)
1996	5	10	8	6	6	3
1999	4	12	7	7	5	4

Calculate the cost of living index by aggregate expenditure method:

Commodity	Weight 2010	Price (Rs.)
Commodity	Weight 2010	2010	2015
P	80	22	25
Q	30	30	45
R	25	42	50
S	40	25	35
T	50	36	52