Please enter the following details
Free Daily Targets & Mocks
Study Material & Formulas PDFs
1 on 1 Mentorship
Question 56
Consider the set of numbers {1, 3, $$3^{2}$$, $$3^{3}$$,…...,$$3^{100}$$}. The ratio of the last number and the sum of the remaining numbers is closest to:
Solution
Set : {$$1, 3, 3^{2}, 3^{2},…...,3^{100}$$}
Clearly, this set is a G.P. with common ratio, $$r = 3$$
Sum of G.P. = $$\frac{a (r^n - 1)}{r - 1}$$
Number of terms = 101
Last term = $$3^{100}$$
Sum of remaining terms = $$\frac{1 (3^{100} - 1)}{3 - 1}$$
= $$\frac{3^{100} - 1}{2}$$
$$\therefore$$ Required ratio = $$\frac{3^{100}}{\frac{3^{100} - 1}{2}}$$
= $$\frac{3^{100} \times 2}{3^{100} - 1}$$
$$\approx \frac{3^{100} \times 2}{3^{100}} = 2$$
Video Solution
Create a FREE account and get:
- All Quant Formulas and shortcuts PDF
- 15 XAT previous papers with solutions PDF
- XAT Trial Classes for FREE
XAT Quant Questions | XAT Quantitative Ability
XAT Geometry QuestionsXAT Averages, Ratio and Proportion QuestionsXAT Linear Equations QuestionsXAT Number Systems QuestionsXAT Time, Distance and Work Questions
XAT DILR Questions | LRDI Questions For XAT
XAT Table with Missing values QuestionsXAT Special Charts QuestionsXAT Data change over a period QuestionsXAT Logical Reasoning QuestionsXAT DI with connected data sets Questions
