De acordo com Sadiku, Musa, Alexander (2014, p.98), dois resistores estão em paralelo quando conectados aos mesmos terminais ou nós. Em circuitos paralelos, cada elemento está ligado a dois nós, existem múltiplos caminhos para a corrente fluir, e a tensão sobre cada elemento é a mesma. Uma vantagem dos circuitos paralelos é que, se um elemento falhar, os outros continuam funcionando normalmente.[br][br][br]FIG.4: Circuitos com Resistores em Paralelo[br][br][img]data:image/png;base64,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[/img][br]Fonte: Sadiku, Musa, Alexander (2014,p.98)[br][br]
De acordo com Sadiku, Musa, Alexander (2014, p.99), a lei de Kirchhoff para corrente (LKC) estabelece que a soma algébrica das correntes que entram em um nó é zero:[br][br][math]I_1+I_2+I_3+I_4+...+I_n=0[/math] [br][br]Sendo n o número de ramos conectados ao nó e [math]I_n[/math] é a n-ésima corrente entrando (ou saindo) do nó. [br][br]a Lei de Kirchhoff das Correntes (LKC), que afirma que a soma das correntes que entram em um nó é igual à soma das correntes que saem do nó. As correntes podem ser consideradas positivas ao entrar no nó e negativas ao sair, ou vice-versa.[br][br]Considere o nó na FIG.5, aplicando a LKC:[br][br]FIG.5: Correntes em um nó e a LKC[br][img]data:image/png;base64,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[/img] [math]I_1-I_2+I_3+I_4-I_5=0\longleftrightarrow I_1+I_3+I_4=I_2+I_5[/math][br]Fonte: Sadiku, Musa, Alexander (2014, p.99)[br][br][br]Ou seja, a soma das correntes que entram em um nó é igual à soma das correntes que saem[br]do nó.[br][br]
Quando um circuito com dois resistores estão conectados em paralelo, isso significa que ambos estão sob a mesma tensão. Isso ocorre porque ambos “veem” a mesma queda de tensão. A explicação se baseia na lei de Ohm. (Sadiku, Musa, Alexander, 2014, p.102)[br][br]FIG.6: Resistores em Paralelo[br][img]data:image/png;base64,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[/img] [math]V=R_1I_1=R_2I_2\longrightarrow I_1=\frac{V}{R_1}[/math] e [math]I_2=\frac{V}{R_2}[/math][br]Fonte: Sadiku, Musa, Alexander (2014, p.102)[br][br]Aplicando a LKC ao nó [math]a[/math] tem-se a corrente total I como [math]I=I_1+I_2\longleftrightarrow I=\frac{V}{R_1}+\frac{V}{R_2}\longleftrightarrow I=V\left(\frac{1}{R_1}+\frac{1}{R_2}\right)\longleftrightarrow I=\frac{V}{R_{eq}}[/math][br][br]Sendo [math]\frac{1}{R_{eq}}=\frac{1}{R_1}+\frac{1}{R_2}=\left(\frac{R_1+R_2}{R_1R_2}\right)\longrightarrow R_{eq}=\frac{R_1R_2}{R_1+R_2}[/math] [math][/math][br][br]Ou seja, a resistência equivalente de dois resistores em paralelo é a razão entre o produto de[br]suas resistências e a soma de suas resistências.[br][br]Para mais detalhes, assista o vídeo abaixo, disponibilizado pelo canal Khan Academy, que trata da definição de Circuito com Resistores em Paralelo e um segundo vídeo que faz uma revisão de Resitores em Série e também define em Paralelo.[br][br]Em ambos os vídeos abaixo, esclarecedores da noção de Circuito Elétrico, ao tratar de Resistores em Série e em Paralelo ao tratar a Corrente Elétrica com a variável [math]i[/math] difere desse projeto, pois consideramos essa Corrente Elétrica como [math]I[/math] por se tratar de Corrente Contínua (CC ou DC). A variável minúscula surgirá no estudo de Corrente Alternada.
Nessa perspetiva vamos montar o exemplo de circuito simples, apresentado pelo canal Khan Academy, com a bateria de 3V e os resistorese [math]R_1=20\Omega[/math] e [math]R_2=60\Omega[/math] em paralelo no kit construtor de circuitos (DC) virtual disponibilizado pela Universidade do Colorado. Num primeiro momento procurando entender a questão da corrente continua e do resistor equivalente [math]R_{eq}[/math] .
Muito bem! Vamos analisar o problema proposto no software GeoGebra, o cálculo simbólico e a representação gráfica desse circuito proposto, procurando interpretar a função hipérbole aplicada num circuito elétrico com resistores em paralelo .
No vídeo, ao tratar de corrente elétrica é importante ressaltar a definição da LKC: a soma das correntes que entram em um nó é igual à soma das correntes que saem do nó, pois, ficou ausente na explanação.
Supondo um circuito elétrico simples com uma bateria de V (volts) e dois resistores em paralelo [math]R_1[/math] e [math]R_2[/math] a corrente elétrica total I em A (ampere) equivale a:
SADIKU, Matthew N. O; ALEXANDER, Charles K.; MUSA, Sarhan. Análise de circuitos elétricos com aplicações. AMGH Editora, 2014.