- #1
FrankSilliman
- 1
- 0
1. [tex]Find \ C \ in \ terms \ of \ x_0 \ such \ that \ \psi(x,0) \ is \ normalized, \ where \ C \ and \ x_0 \ are \ constants.[/tex]
2. [tex]\psi(x,0)=Cexp\left (-\frac{\left |x \right |}{x_0} \right )[/tex]
3. [tex]\\ \psi(x,0)=Cexp\left (-\frac{\left |x \right |}{x_0} \right )\\
\Rightarrow \psi(x,0)=Cexp\left ( -\frac{x}{x_0} \right ) \ for \ x\geq 0 \\
and \ \psi(x,0)=Cexp\left ( \frac{x}{x_0} \right ) \ for \ x<0[/tex]
My thoughts were to split the absolute value up, but I am unsure. Also, I am unsure as to how to choose the bounds for normalizing. Should it just be over (-∞,+∞)?
2. [tex]\psi(x,0)=Cexp\left (-\frac{\left |x \right |}{x_0} \right )[/tex]
3. [tex]\\ \psi(x,0)=Cexp\left (-\frac{\left |x \right |}{x_0} \right )\\
\Rightarrow \psi(x,0)=Cexp\left ( -\frac{x}{x_0} \right ) \ for \ x\geq 0 \\
and \ \psi(x,0)=Cexp\left ( \frac{x}{x_0} \right ) \ for \ x<0[/tex]
My thoughts were to split the absolute value up, but I am unsure. Also, I am unsure as to how to choose the bounds for normalizing. Should it just be over (-∞,+∞)?