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Kumar Rohan

Physics and Mathematics

Geometric Progression (GP) — Complete Formula

  • ⭐ – Most used in JEE
  • ⚠️ – Common Mistake
  • 💡 – Memory Hint

Basic Definition of GP

Concept Formula Symbols Meaning Key Notes / Tricks
General Form [a, ar, ar^2, ar^3, …] [a] = first term, [r] = common ratio Ratio remains constant ⭐
Common Ratio [r = \dfrac{a_2}{a_1}] [a_1, a_2] = consecutive terms Also [r = \dfrac{a_n}{a_{n-1}}] ⭐

💡 Memory Hint:
GP → multiply by r each time


nth Term of GP

Concept Formula Symbols Meaning Key Notes / Tricks
nth Term [a_n = a r^{n-1}] [a_n] = nth term, [n] = term number Most important ⭐
Alternate Form [a_n = a_m r^{n-m}] [a_m] = mth term Useful in JEE ⭐

💡 Memory Hint:
Each term = previous × [r]


Sum of n Terms

Concept Formula Symbols Meaning Key Notes / Tricks
Sum (r ≠ 1) [S_n = a \dfrac{r^n – 1}{r – 1}] [S_n] = sum of n terms Standard form ⭐
Alternate Form [S_n = a \dfrac{1 – r^n}{1 – r}] Use when [r < 1] ⭐
Special Case [S_n = na] (if [r = 1]) All terms equal

💡 Memory Hint:
Two forms → choose based on ease of simplification


Sum to Infinity

Concept Formula Symbols Meaning Key Notes / Tricks
Infinite Sum [S_\infty = \dfrac{a}{1 – r}] Valid when [-1 < r < 1]

💡 Memory Hint:
Converges only if |r| < 1


Last Term in GP

Concept Formula Symbols Meaning Key Notes / Tricks
Last Term [l = a r^{n-1}] [l] = last term Same as nth term ⭐

Finding Number of Terms

Concept Formula Symbols Meaning Key Notes / Tricks
From nth Term [n = 1 + \dfrac{\log(a_n/a)}{\log r}] Log-based ⭐
From Sum Solve equation in [r^n] Often logarithmic ⭐

💡 Memory Hint:
GP problems often → logarithms


Geometric Mean (GM)

Concept Formula Symbols Meaning Key Notes / Tricks
Single GM [GM = \sqrt{ab}] [a, b] = numbers Important ⭐
Relation with AM [AM \ge GM] Equality when [a = b] ⭐

💡 Memory Hint:
GM is always ≤ AM


Insertion of Geometric Means

Concept Formula Symbols Meaning Key Notes / Tricks
Common Ratio [r = \left(\dfrac{b}{a}\right)^{\dfrac{1}{n+1}}] [n] = number of means Important ⭐
Terms [a r, a r^2, …] Construct GP

💡 Memory Hint:
Divide ratio into equal multiplicative steps


Special Results / Important Sums

Concept Formula Symbols Meaning Key Notes / Tricks
Sum of Powers [1 + r + r^2 + … + r^{n-1} = \dfrac{r^n – 1}{r – 1}] Base identity ⭐
Infinite Series [1 + r + r^2 + … = \dfrac{1}{1 – r}] [r] = Common ratio

💡 Memory Hint:
GP sum builds from geometric growth

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