Impara online a risolvere i problemi di passo dopo passo. Solve the exponential equation 1-e^(x^4+c)=e^(-x^4+c)+1. Applicare la formula: x+a=b\to x=b-a, dove a=1, b=e^{\left(-x^4+c\right)}+1, x+a=b=1-e^{\left(x^4+c\right)}=e^{\left(-x^4+c\right)}+1, x=-e^{\left(x^4+c\right)} e x+a=1-e^{\left(x^4+c\right)}. Applicare la formula: a+b=a+b, dove a=1, b=-1 e a+b=e^{\left(-x^4+c\right)}+1-1. Applicare la formula: -x=a\to x=-a, dove a=e^{\left(-x^4+c\right)} e x=e^{\left(x^4+c\right)}. Applicare la formula: a=b\to a-b=0, dove a=e^{\left(x^4+c\right)} e b=-e^{\left(-x^4+c\right)}.

Solve the exponential equation 1-e^(x^4+c)=e^(-x^4+c)+1