Geometric progression – count terms up to a given term: How many terms are there in the GP 5, 20, 80, 320, …, 20480?
Aptitude
Odd Man Out and Series
Difficulty: Easy
Choose an option
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A7
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B6
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C5
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D10
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E8
Answer
Correct Answer: 7
Explanation
Introduction / Context:Counting terms in a GP reduces to solving a_n = a * r^(n−1) for n, given first term, common ratio, and last term.
Given Data / Assumptions:
- a = 5
- Common ratio r = 20/5 = 4
- Last term L = 20480
Concept / Approach:Set 5 * 4^(n−1) = 20480 ⇒ 4^(n−1) = 4096. Express 4096 as a power of 4 to find n − 1.
Step-by-Step Solution:4^5 = 1024, 4^6 = 4096.Thus 4^(n−1) = 4^6 ⇒ n − 1 = 6 ⇒ n = 7.
Verification / Alternative check:The sequence terms are 5, 20, 80, 320, 1280, 5120, 20480 — exactly 7 terms.
Why Other Options Are Wrong:6 or 5 underestimate; 8 or 10 overestimate the power index required to reach 20480.
Common Pitfalls:Dividing by r incorrectly or misidentifying r from adjacent terms.
Final Answer:7