🔢 Viral Maths — Chapter 06: Squares

by Navneet Tiwari (Adda247)  ·  5 Named Techniques for Finding Squares Fast · Bank / SSC / Railway / BPSC / BSSC

📌 What This Chapter Covers
  • Finding squares fast is a foundational skill — it feeds directly into Multiplication (Padosan, Trishul approaches) and Square Roots (next chapter).
  • 5 named techniques hain, har ek specific number-range ke liye optimized: near 50, near 100, ending in 5, near 150/200/300+, ending in 25.
  • Book ki advice: squares 1–100 pehle cold yaad karo (Ch01 Important Products mein diya gaya), phir yeh advanced techniques 3-digit numbers ke liye use karo.
⚡ QUICK RECALL
Selection guide: number 40s-50s mein → Near Base 50; number 90s-120s mein → Near Base 100; ends in 5 → dedicated 5-trick; number 150+ near a multiple of 50/100 → Near Base 150/200/300; ends in 25 → dedicated 25-trick.
🗂️ Chapter Index
TabTechniqueBest For
2Near Base 50Numbers roughly 35–65
3Near Base 100Numbers roughly 85–125
4Ends in 5Any number ending in digit 5
5Near Base 150/200/250/300...3-digit numbers near a multiple of 50
6Ends in 25Numbers like 125, 225, 325, 725, 825...
7Master TableAll 5 techniques summarized
Square of Number Near Base 50
Example: (41)² — number LESS than 50
Step 1: 41 is 9 less than 50 Step 2: Subtract 9 from 25: 25−9 = 16 Step 3: Square of 9 = 81 Step 4: Combine: 1681
Example: (53)² — number MORE than 50
Step 1: 53 is 3 more than 50 Step 2: Add 3 to 25: 25+3 = 28 Step 3: Square of 3 = 09 Step 4: Combine: 2809
⚠ EXAM TRAP
Distance ka square hamesha 2-digit slot mein jaata hai — agar single digit ho (jaise 3²=9), to 09 likho, sirf 9 nahi. Warna answer galat ho jayega.
⚡ QUICK RECALL
Number 50 se KAM ho to 25 mein se distance GHATAO. Number 50 se ZYADA ho to 25 mein distance JODO. Phir distance ka square right side mein attach karo.
Square of Number Near Base 100
Example: (94)² — number LESS than 100
Step 1: 94 is 6 less than 100 Step 2: Subtract 6 from the ORIGINAL number: 94−6 = 88 Step 3: Square of 6 = 36 Step 4: Combine: 8836
Example: (112)² — number MORE than 100 (with carry)
Step 1: 112 is 12 more than 100 Step 2: Add 12 to the ORIGINAL number: 112+12 = 124 Step 3: Square of 12 = 144 Step 4: 144 has 3 digits — carry the extra 1 to 124: 124+1 = 125 Step 5: Combine: 12544
⚠ EXAM TRAP
Base 50 approach mein hum "25" se add/subtract karte hain, lekin Base 100 approach mein hum ORIGINAL NUMBER se add/subtract karte hain — yeh formula alag hai, mat mix karo.
Agar distance ka square 2 digits se zyada ho jaaye (jaise 12²=144), to extra digit ko carry karo left mein.
Square of Number Ending with 5
Example: (65)²
Step 1: Square of last digit 5: 25 (always fixed ending) Step 2: Multiply the leading digit (6) by its successor (7): 6×7 = 42 Step 3: Combine: 4225
⚡ QUICK RECALL
Formula: n5² = [n×(n+1)] | 25. Works for ANY number ending in 5 — 15², 25², 35²... even 105², 205².
Square of Number Close to Base 150/200/250/300...
Example: (207)² — number MORE than base 200
Step 1: 207 is 7 more than 200 (extra = 7) Step 2: Add extra to original: 207+7 = 214 Step 3: Since base is 200, multiply by (200/100=2): 214×2 = 428 Step 4: Square the extra: 7² = 49 Step 5: Combine: 42849
Example: (348)² — number LESS than base 350
Step 1: 348 is 2 less than 350 (negative extra = 2) Step 2: Subtract from original: 348−2 = 346 Step 3: Since base is 350, multiply by (350/100=3.5): 346×3.5 = 1211 Step 4: Square the extra: 2² = 04 Step 5: Combine: 121104
⚡ QUICK RECALL — Multiplier Rule
Multiplier = Base ÷ 100. Base 150→×1.5, Base 200→×2, Base 250→×2.5, Base 300→×3, Base 350→×3.5, Base 400→×4.
⚠ EXAM TRAP
Extra number ka square hamesha 2-digit slot mein rakho (single-digit extra ho to 0 pad karo, jaise 2²=04) — warna final combine step mein digits misalign ho jayenge.
Square of Number Ending With 25
Example: (725)²
Step 1: Square the leading digit(s): 7² = 49 Step 2: Add half of the leading digit(s) to it: 49 + 3.5 = 52.5 Step 3: Multiply by 10: 52.5 × 10 = 525 Step 4: Square of 25 (fixed): 625 Step 5: Combine: 525625
Example: (825)²
Step 1: 8² = 64 Step 2: 64 + half of 8 (4) = 68 Step 3: 68 × 10 = 680 Step 4: Square of 25: 625 Step 5: Combine: 680625
⚡ QUICK RECALL
Formula: for n25², compute [n² + n/2] × 10, then attach 625 (the fixed square of 25).
📋 Master Table — All Square Techniques
TechniqueRangeCore Formula
Near Base 50~35–65(25±distance) | distance² (2-digit slot)
Near Base 100~85–125(original±distance) | distance² (carry if ≥100)
Ends in 5any n5[n×(n+1)] | 25
Near Base 150/200/300...3-digit near multiples of 50(original±extra)×(base/100) | extra² (2-digit slot)
Ends in 25any n25[n²+n/2]×10 | 625
🔑 Approach Selection Flowchart
  • Number ends in 25 → Ends-in-25 technique (most specific, check first)
  • Number ends in 5 (but not 25) → Ends-in-5 technique
  • Number is roughly 35–65 → Near Base 50
  • Number is roughly 85–125 → Near Base 100
  • 3-digit number near a multiple of 50 (150, 200, 250, 300...) → Near Base 150/200/300 technique
⚡ QUICK RECALL
Sabse pehle check karo: kya number 25 ya 5 pe end hota hai? Agar haan, to woh dedicated trick use karo — sabse fast hain. Warna base-proximity dekh ke Near-50/100/150+ choose karo.