Convert Base 3 to Hexadecimal
Convert Base 3 (base 3) to Hexadecimal (hex) instantly and accurately.
Selected Base 3 (base 3) - available characters: 0, 1, 2
Conversion Formula
Step-by-step example using the value 42 (decimal):
Convert Base 3 (base 3) → Hexadecimal (base 16)
Step 1: Expand each digit of 1120 (base 3) by position:
1 × 3^3 = 27
1 × 3^2 = 9
2 × 3^1 = 6
0 × 3^0 = 0
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Sum = 42 (decimal)
Step 2: Divide 42 by 16 repeatedly (read remainders upward):
42 ÷ 16 = 2 r 10 (A)
2 ÷ 16 = 0 r 2
Read remainders upward: 2A
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Result: 1120 (base 3) = 2A (hex)
About Base 3
Ternary (base 3) uses digits 0, 1, 2. Each position is a power of 3: 3⁰=1, 3¹=3, 3²=9, 3³=27. Balanced ternary (β’1, 0, +1) represents negatives without a sign and minimises rounding error. The Soviet Setun computer (1958) was the only practical balanced-ternary machine. Ternary underlies the Cantor set and Toom-Cook multiplication. Conversion: decimal 42 = 1×27+1×9+2×3+0 = 1120₃.
About Hexadecimal
Hexadecimal (base 16) uses digits 0-9 and A-F (A=10, B=11, C=12, D=13, E=14, F=15). Each position is a power of 16: 16⁰=1, 16¹=16, 16²=256. Because 16 = 2⁴, each hex digit = exactly 4 bits (one nibble). Ubiquitous in computing: memory addresses (0x7FFF…), CSS colours (#FF5733), IPv6, SHA-256 hashes (64 hex digits = 256 bits), MAC addresses, UUID/GUIDs, and binary file magic numbers. The '0x' prefix originated in C (1972) and is standard in C++, Java, Python, JS, Rust, and Go. Conversion: decimal 42 = 2×16+10 = 2A₁₆.
Quick Reference Table
| Base 3 (base 3) | Hexadecimal (hex) |
|---|---|
| 1 | 1 |
| 2 | 2 |
| 12 | 5 |
| 22 | 8 |
| 101 | A |
| 120 | F |
| 121 | 10 |
| 1120 | 2A |
| 2101 | 40 |
| 10201 | 64 |
| 100110 | FF |