data:image/png;base64,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22
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true
explanation
22
113
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true
explanation
Program comments:
Name: Scarlett Spohn
Creation Date: March 20, 2025
Program Purpose: Design a program which explains how to convert binary numbers to decimal numbers and also provide a list of practice problems. """Convert 10110 to a decimal""",Convert 01110001 to a decimal,Convert 0001001 to a decimal
"First: look at the first value all the way to the right. If it is a 1, add 1 to your total decimal value. If it is a zero, add zero to your total decimal value.
","Second step: Look at the second value all the way to the right. If it is a 1, add 2 to your total decimal value. If it is a zero, add nothing to your total decimal value.
","Third step: look at the third value all the way to the right. If it is a 1, add 4 to your total decimal value. If it is a zero, add zero to your total decimal value.
","Fourth Step: Continue adding each value from right to left to your total decimal value. Make sure you understand what value to add to your total decimal value.
","Fifth Step:To understand how much to add to your total decimal value, raise 2 to the power of the position of your number. The right-most value is always assigned the position of 0. The second right value is 1 and the third value is 2.
","Example problem: 101. First add 1 to your total decimal value. Next add 0 because the second position carries a 0. Lastly, add 2^2 (which is 4). Your total decimal value is 5.
"