6.7 The smith chart

Now let's see how we can use The Bilinear Transform to get the co-ordinates on the $\frac{Z(s)}{Z_0}$ plane transferred over onto the $r(s)$ plane. The Bilinear Transform tells us how to take any $\frac{Z(s)}{Z_0}$ and generate an $r(s)$ from it. Let's start with an easy one. We will assume that $\frac{Z(s)}{Z_0}=1+iX$ , which is a vertical line, which passes through 1, and can take on whatever imaginary part it wants .

According to The Bilinear Transform , the first thing we should do is add 1 to $\frac{Z(s)}{Z_0}$ . This gives us the line $2+iX$ .

• add 1
• invert
• multiply by -2
• add 1

OK, is a plot of the $\frac{Z(s)}{Z_0}$ plane. The lines shown represent the real part of $\frac{Z(s)}{Z_0}$ that we want to transform. We run them all through The Bilinear Transform , to get them onto the $r(s)$ plane. Now we have a whole family of circles, the biggest of which has a diameter of 2 (which corresponds to theimaginary axis) and the smallest of which has a diameter of 0 (which corresponds to points at $$∞ ) . The circles all fit within one another, and since a +1 was added to every transform as the final bit ofmanipulation, all of the circles pass through the point +1, $0i$ . Circles with smaller diameters correspond to larger values of real $\frac{Z(s)}{Z_0}$ , while the larger circles correspond to the lesser values of $\frac{Z(s)}{Z_0}$ .

We have done a most wondrous thing! (Although you may not realize it yet.) We have taken the entire half plane of complex impedance $\frac{Z(s)}{Z_0}$ and mapped the whole thing into a circle with diameter 1! Let's put the two of them side by side. (Although we can'tshow the whole $\frac{Z(s)}{Z_0}$ plane of course.) These are shown here , where we show how each line on $\frac{Z(s)}{Z_0}$ maps into a (curved) line on the $r(s)$ plane. Note also, that for every point on the $\frac{Z(s)}{Z_0}$ plane ("A" and "B") there is a corresponding point on the $r(s)$ plane. Pick a couple more points, "C" and "D" and locate them either on the $\frac{Z(s)}{Z_0}$ plane, or the $r(s)$ plane, and then find the corresponding point on the other plane.