binary to base-3
Please provide values below to convert binary to base-3, or change ↔.
binary
Definition: A binary numeral system is a base-2 numeral system that uses two symbols: 0 and 1.
Historyandorigin: It has historical origins in ancient cultures and is fundamental to modern digital computing.
CurrentUse: It is widely used in computer science and digital electronics.
funfact: Binary is the basis for all digital data representation.
base-3
Definition: A base-3 numeral system is a ternary numeral system that uses three symbols: 0, 1, and 2.
Historyandorigin: It has historical origins in ancient cultures.
CurrentUse: It is used in some specialized contexts, such as balanced ternary systems.
funfact: Ternary systems can represent numbers using fewer digits than binary.
binary to base-3 Conversion Table
| 1 binary | 1 base-3 |
| 2 binary | Error base-3 |
| 3 binary | Error base-3 |
| 5 binary | Error base-3 |
| 10 binary | 2 base-3 |
| 50 binary | Error base-3 |
| 100 binary | 11 base-3 |
| 1000 binary | 22 base-3 |
| 10000 binary | 121 base-3 |
| 100000 binary | 1012 base-3 |
| 1000000 binary | 2101 base-3 |
How to Convert binary to base-3
1 binary = 1 base-3
1 base-3 = 1 binary
we use cross multiplication method
binary → base-3
1 → 1
1.5 → ?( suppose x)
=>1.5*1=1*x
by simplifying
x=1