The third term of a geometric progression is 6. Then the product of first five…
2020
The third term of a geometric progression is 6. Then the product of first five terms is:
- A.
63
- B.
64
- C.
66
- D.
65
Attempted by 1 students.
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Correct answer: D
Concept: In a geometric progression, terms equally far from a central term have reciprocal powers of the common ratio. For five consecutive GP terms with third term T, the terms can be written as T/r2, T/r, T, Tr, Tr2, so their product is T5.
This works because the ratio powers cancel in symmetric pairs, leaving only repeated factors of the middle term.
Let the third term be 6 and the common ratio be r.
The first five terms are 6/r2, 6/r, 6, 6r, and 6r2.
Their product is (6/r2) × (6/r) × 6 × (6r) × (6r2).
The powers of r cancel: r-2-1+1+2 = r0 = 1.
The remaining product is 6 × 6 × 6 × 6 × 6 = 65.
Cross-check: The first and fifth terms multiply to 62, and the second and fourth terms also multiply to 62; multiplying those with the middle term 6 gives 62 × 62 × 6 = 65.
Therefore, the product of the first five terms is 65.