What is a numbers converter?

A numbers converter helps you convert between different units of numbers quickly and accurately.

How do I convert base-31 to base-4?

Simply enter the value in the base-31 input field, and the converter will show you the equivalent value in base-4 instantly.

Is this numbers converter free to use?

Yes, this numbers converter is completely free and easy to use for all your conversion needs.

Can I switch between base-31 and base-4 easily?

Yes, there is a switch button provided to quickly swap the conversion direction between base-31 and base-4.

How accurate are the conversion results?

The conversion results are calculated using precise formulas to ensure accuracy for most practical purposes.

Convert base-31 to base-4 Online | Free numbers Converter

31 Number System

The base-31 number system, also called the untrigesimal system, is a positional numeral system that uses thirty-one symbols: 0, 1, 2, 3, 4, 5, 6, 7, 8, 9, A, B, C, D, E, F, G, H, I, J, K, L, M, N, O, P, Q, R, S, and T, where A represents ten, B eleven, C twelve, D thirteen, E fourteen, F fifteen, G sixteen, H seventeen, I eighteen, J nineteen, K twenty, L twenty-one, M twenty-two, N twenty-three, O twenty-four, P twenty-five, Q twenty-six, R twenty-seven, S twenty-eight, and T twenty-nine in decimal. Each digit’s position represents a power of 31, starting from $31^0$ at the rightmost digit and increasing to the left. For example, the base-31 number 3T7 equals $3 \times 31^2 + 29 \times 31^1 + 7 \times 31^0 = 2883 + 899 + 7 = 3789$ in decimal. Base-31 is primarily used in theoretical mathematics, number theory, and educational exercises to explore alternative numeral systems, positional notation, and arithmetic patterns. Understanding base-31 allows learners to perform arithmetic operations, convert numbers between bases, and analyze properties of non-decimal systems. Although rarely used in computing or daily life, studying the untrigesimal system enhances logical reasoning, problem-solving skills, and comprehension of abstract number representations. It also provides a foundation for higher-level numeral systems and theoretical mathematics.

Number System

The base-4 number system, also known as the quaternary system, is a positional numeral system that uses four distinct digits: 0, 1, 2, and 3. Each digit’s position represents a power of 4, starting from $4^0$ at the rightmost digit and increasing to the left. This system is similar to binary (base-2) and decimal (base-10) systems but is specifically useful in applications where data can naturally be divided into four states, such as in certain digital circuits or computing systems. For example, the base-4 number 213 represents $2 \times 4^2 + 1 \times 4^1 + 3 \times 4^0 = 32 + 4 + 3 = 39$ in decimal. Base-4 is also efficient for representing binary data because every base-4 digit corresponds to exactly two binary digits, simplifying the conversion between binary and quaternary systems. Quaternary systems can be used in computer science, coding theory, and mathematics to reduce complexity in specific algorithms and storage systems. Learning and understanding base-4 helps in exploring alternative numbering systems, enhances computational thinking, and provides insights into how different bases represent quantities and perform arithmetic operations.