Back to Topic 1.11 — Infinite geometric series (HL only)
1.11.1Math AI HL8 flashcards

Sum to infinity

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Card 1 of 81.11.1
1.11.1
Question

What is the sum to infinity of a geometric series?

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All 8 Flashcards — Sum to infinity

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Card 1formula

Question

What is the sum to infinity of a geometric series?

Answer

S∞ = u₁/(1 − r), the finite total of all (infinitely many) terms — valid only when |r| < 1.

Card 2concept

Question

When does a geometric series have a sum to infinity?

Answer

Only when −1 < r < 1 (|r| < 1). The terms must shrink toward 0. If |r| ≥ 1, no sum to infinity exists.

Card 3concept

Question

Why does an infinite series sometimes give a finite total?

Answer

When |r| < 1 each term is a fraction of the last, so the terms shrink toward 0 fast enough that the running total closes in on a fixed value.

Card 4concept

Question

Sum to infinity with u₁ = 12, r = 0.5?

Answer

S∞ = 12/(1 − 0.5) = 12/0.5 = 24.

Card 5formula

Question

How do you find r from S∞ and u₁?

Answer

Rearrange S∞ = u₁/(1 − r): 1 − r = u₁/S∞, so r = 1 − u₁/S∞.

Card 6concept

Question

S∞ = 36 and u₁ = 24. Find r.

Answer

1 − r = 24/36 = 2/3, so r = 1/3 (and |1/3| < 1, so it converges).

Card 7concept

Question

In a bouncing-ball distance problem, what's the trick?

Answer

Add the first drop, then count each rebound height TWICE (up and down): total = drop + 2 × (rebound series).

Card 8concept

Question

After finding S∞ in an applied question, what earns the last mark?

Answer

Interpreting it in context (e.g. the steady drug level or long-run total) and commenting on whether the model is realistic.

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