BCD to Decimal Converter


BCD to Decimal Converter



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A digital circuit that can convert a binary-coded decimal (BCD) number into an equivalent decimal number is referred to as a BCD-to-decimal converter.

The input to a BCD to decimal converter is an 8421 BCD code and the output generated by the converter is a decimal number.

The following is the truth table of the BCD to decimal converter describing its operation.














BCD Code Decimal
B3 B2 B1 B0
0 0 0 0 D0
0 0 0 1 D1
0 0 1 0 D2
0 0 1 1 D3
0 1 0 0 D4
0 1 0 1 D5
0 1 1 0 D6
0 1 1 1 D7
1 0 0 0 D8
1 0 0 1 D9

We can derive the Boolean expressions for each of the decimal outputs in terms of 8421 BCD code. These Boolean expressions are given below −

$$\mathrm{D_{0} \: = \: \overline{B_{3}} \: \overline{B_{2}} \: \overline{B_{1}} \: \overline{B_{0}}}$$

$$\mathrm{D_{1} \: = \: \overline{B_{3}} \: \overline{B_{2}} \: \overline{B_{1}} \: B_{0}}$$

$$\mathrm{D_{2} \: = \: \overline{B_{3}} \: \overline{B_{2}} \: B_{1} \: \overline{B_{0}}}$$

$$\mathrm{D_{3} \: = \: \overline{B_{3}} \: \overline{B_{2}} \: B_{1} \: B_{0}}$$

$$\mathrm{D_{4} \: = \: \overline{B_{3}} \: B_{2} \: \overline{B_{1}} \: \overline{B_{0}}}$$

$$\mathrm{D_{5} \: = \: \overline{B_{3}} \: B_{2} \: \overline{B_{1}} \: B_{0}}$$

$$\mathrm{D_{6} \: = \: \overline{B_{3}} \: B_{2} \: B_{1} \: \overline{B_{0}}}$$

$$\mathrm{D_{7} \: = \: \overline{B_{3}} \: B_{2} \: B_{1} \: B_{0}}$$

$$\mathrm{D_{8} \: = \: B_{3} \: \overline{B_{2}} \: \overline{B_{1}} \: \overline{B_{0}}}$$

$$\mathrm{D_{9} \: = \: B_{3} \: \overline{B_{2}} \: \overline{B_{1}} \: B_{0}}$$

The logic circuit implementation of the BCD to decimal converter is shown in the following figure.


BCD to Decimal Converter

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