Convert Binary and Octal Numbers to Decimal

How can we convert the binary number 0110 1010 to decimal?

What about converting the binary number 0110 1010 to octal?

Can you explain how to convert the octal number 123 to decimal?

How do we convert the number 35 from decimal to binary, octal, and hexadecimal?

Answer:

To convert the binary number 0110 1010 to decimal, you can use the place value system. Do you want to know the step-by-step process?

For converting the binary number 0110 1010 to octal, you need to group the binary digits into sets of three from right to left. Interested in learning more about this conversion?

To convert the octal number 123 to decimal, the place value system based on powers of 8 can be employed. Would you like a detailed explanation of this conversion process?

When converting the number 35 from decimal to binary, we can divide it by 2 and use the remainders to form the binary representation. Do you want to know the detailed steps?

Detailed Explanation:

To convert the binary number 0110 1010 to decimal, we use the place value system where each binary digit represents a power of 2. From right to left, we calculate each digit's value and then sum them up to get the decimal equivalent.

For converting the binary number 0110 1010 to octal, we group the binary digits in sets of three from right to left and then calculate their octal equivalents based on the binary-to-octal conversion table.

When converting the octal number 123 to decimal, we use the place value system where each octal digit represents a power of 8. By calculating each digit's value and summing them up, we obtain the decimal equivalent.

For converting the number 35 from decimal to binary, we repeatedly divide the number by 2 and record the remainders until we reach 0. By reading the remainders in reverse order, we get the binary representation of the decimal number 35.

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