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지난번 글에서 컴퓨터는 2진수를 통해 데이터를 인식한다고 설명했습니다. 트랜지스터는 전류가 흐르거나 흐르지 않는 상태를 통해 1 또는 0으로 나타낼 수 있습니다. 즉, 트랜지스터를 통해 컴퓨터가 인식할 수 있는 데이터를 나타낼 수 있습니다.
트랜지스터를 도식화하면 다음과 같은데, Gate에 전압을 걸어주거나 걸어주지 않는 것으로 Drain으로 전류를 흐르게 하거나 흐르지 않게 할 수 있습니다.
이런 트랜지스터의 특성을 통해 스위치 역할을 함으로써 논리회로(Logic Gate)를 만들 수 있습니다.
1. NOT gate
NOT gate는 참을 거짓으로, 거짓을 참으로 출력하는 회로입니다. 즉, Gate에 전류가 흐르면 거짓, 전류가 흐르지 않으면 참을 출력합니다.
A에 전류가 흐르지 않으면 GND로 전류가 흐르지 않아서 출력선으로 전류가 흐르게 됩니다. 즉, 참을 출력합니다.
반면에 A에 전류가 흐르면 GND로 전류가 흐를 수 있어서 출력선으로는 전류가 흐르지 않습니다. 즉, 거짓을 출력합니다.
진리표
논리식은 로 나타내며, 기호는 다음과 같습니다.
2. AND gate
AND gate는 두 입력선이 모두 참이면 참, 아니면 거짓을 출력하는 회로입니다.
![](data:image/png;base64,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)
진리표
A |
B |
A AND B |
0 |
0 |
0 |
1 |
0 |
0 |
0 |
1 |
0 |
1 |
1 |
1 |
논리식은 로 나타내며, 기호는 다음과 같습니다.
3. OR gate
OR gate는 두 입력선 중 하나라도 참이면 참을 출력하는 회로입니다.
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진리표
A |
B |
A OR B |
0 |
0 |
0 |
1 |
0 |
1 |
0 |
1 |
1 |
1 |
1 |
1 |
논리식은 로 나타내며, 기호는 다음과 같습니다.
4. NAND gate
NAND gate는 AND gate의 반대값을 출력하는 회로입니다. 즉, 모든 입력이 참일 경우에만 거짓을 출력합니다.
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진리표
A |
B |
A NAND B |
0 |
0 |
1 |
1 |
0 |
1 |
0 |
1 |
1 |
1 |
1 |
0 |
논리식은 로 나타내며, 기호는 다음과 같습니다.
5. NOR gate
NOR gate는 OR gate의 반대값을 출력하는 회로입니다. 즉, 두 입력선 중 하나라도 참일 경우에는 거짓을 출력합니다.
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진리표
A |
B |
A NOR B |
0 |
0 |
1 |
1 |
0 |
0 |
0 |
1 |
0 |
1 |
1 |
0 |
논리식은 로 나타내며, 기호는 다음과 같습니다.
6. XOR gate
XOR gate는 배타적 논리합을 구현한 회로입니다. 즉, 두 입력선의 값이 서로 다른 경우에만 참을 출력합니다. 논리식은 로 나타내며, 와 같습니다.
진리표
A |
B |
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAACUAAAAPCAYAAABjqQZTAAAApUlEQVRIicVUQQ6AMAijxv9/GU8syACZQdfEg2PSrtSBiJgMmKelAQBhrQsgR9RuHLsFeDifNsgoO8aWxUIAIB+fbtKVpainXt82PntI/R6KqljdibJTf/z+RPNI3aB/5ZLu63GICaFT1qVOoQDG42ESJeTMXBaystcTaLlvovSdlJ2kG5ZnytQbIZVvMidt7YgKK4QryLIqNbBRE92yb0VWs6b7XgyvVR3ByuKHAAAAAElFTkSuQmCC) |
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAACUAAAAPCAYAAABjqQZTAAAAoklEQVRIicWUUQ6AMAhDqfH+V8YvDCIwpuia+KGb9K2QgYiYfhZzbAmAQAugRtpWA3jaRxskagCvzbK2iYbt00U6oLKa+vuy9tlD6vcQqhJ1p8pJdbVsJNtSd9C/SknX9TwkhDApm1InKIDz8XSDEnNmLoPM7PUArfcFSt9J2Um6ZX1uM/UEpPJPlqRd26KFGcMZZbMqa2BDE92yTyGrs6brHuyRVR0zj+hTAAAAAElFTkSuQmCC) |
A XOR B |
0 |
0 |
0 |
0 |
0 |
1 |
0 |
0 |
1 |
1 |
0 |
1 |
1 |
0 |
1 |
1 |
1 |
0 |
0 |
0 |
위 논리식을 토대로 회로를 구성하면 다음과 같습니다.
기호는 다음과 같습니다.
7. XNOR gate
XOR gate는 XOR gate의 반대값을 출력하는 회로입니다. 즉, 두 입력선의 값이 서로 같은 경우에만 참을 출력합니다. 논리식은 또는 A⊙B로 나타내며, 와 같습니다.
진리표
A |
B |
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAACUAAAAPCAYAAABjqQZTAAAAo0lEQVRIicWUQQ7AIAgE3ab//zI9YSiCoMG4iYeKhXEhorVGTYlo2OoC4MayivLDgrqt5zaApTc6wFafbhsrbJ9MUgE1yyn3r7VPX1J+u1AZqyuVdqqqZZF0S81BP+WSzGvVYBNcp7RLlaAA+rI0QHFxIkqDrJy1AHXtH5R8k2Y3qZauM8zUDkjmn5mTOvZ4gZWCK5rNKsdAisZ7ZXchs7Mm837cw1gdUlidOwAAAABJRU5ErkJggg==) |
![](data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAACUAAAAMCAYAAADlPXT9AAAAlklEQVRIibWUUQ7AIAhDqdn9r8w+FhaGWtGwJvvYYPRZjRARFSLVpwyAtaVks5gACBiUH1IBxWb6763E6UBxkf59CpWJulLppKq2bKW4pdeq6S/zkYeFME0qplQJCuB9RuqgzFxV0yA7vSPA6P2B8ncSW0m1ok93pk5AMv+wJGOtzQo7hjtiZ9Vq0EAzu2VPIbNnzc+9AQ4SURehejKyAAAAAElFTkSuQmCC) |
A XNOR B |
0 |
0 |
1 |
0 |
1 |
1 |
0 |
0 |
0 |
0 |
0 |
1 |
0 |
0 |
0 |
1 |
1 |
0 |
1 |
1 |
위 논리식을 토대로 회로를 구성하면 다음과 같습니다.
기호는 다음과 같습니다.
|