Index NumbersMCQMTP Oct 21Question 3908 of 197
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If P0Q0=1360\displaystyle \sum P_0 Q_0 = 1360, P1Q0=1900\displaystyle \sum P_1 Q_0 = 1900, P0Q1=1880\displaystyle \sum P_0 Q_1 = 1880 then the Laspeyre's Index is

Options

A71\displaystyle 71
B139\displaystyle 139
C175\displaystyle 175
DNone of these
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Correct Answer

Option b139\displaystyle 139

All Options:

  • A71\displaystyle 71
  • B139\displaystyle 139
  • C175\displaystyle 175
  • DNone of these

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Detailed Solution & Explanation

We are given: - P0Q0=1360\displaystyle \sum P_0 Q_0 = 1360 - P1Q0=1900\displaystyle \sum P_1 Q_0 = 1900 The Laspeyres price index is: P01L=P1Q0P0Q0×100=19001360×100139.71%P_{01}^L = \frac{\sum P_1 Q_0}{\sum P_0 Q_0} \times 100 = \frac{1900}{1360} \times 100 \approx 139.71\% This is closest to 139\displaystyle 139 (Option B). *(Note: Although some answer keys point to Option A (71\displaystyle 71) due to an inverted formula P0Q0P1Q0×100=71.58\displaystyle \frac{\sum P_0 Q_0}{\sum P_1 Q_0} \times 100 = 71.58, the mathematically correct Laspeyres Index is 139.71%, which corresponds to Option B).* Hence, **Option B** is the correct answer.

About This Chapter: Index Numbers

Paper

Paper 3: Quantitative Aptitude

Weightage

4-6 Marks

Key Topics

Construction of Index Numbers, Time Series

This chapter covers Construction of Index Numbers, Time Series and is part of Paper 3: Quantitative Aptitude in the CA Foundation exam.

View Official ICAI Syllabus

Exam Strategy Tip

This topic carries 4-6 Marks weightage. Focus on understanding core concepts rather than memorizing.

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