Answer:
Explanation:
Maximum power will be delivered to the load if
Z(load) = Z(t)*
If the Thevenin is defined as Z(t) = R(t) + jX(t), then the load impedance will be
Z(load) = Z(t)* = R(t) - jX(t)
Finding the equivalent impedance, we have that
Z(eq) = Z(t) + Z(load)
Simplifying further, we have
Z(eq) = R(t) + jX(t) + R(t) - jX(t)
Z(eq) = 2R(t)
Therefore, maximum power will be delivered to the load when Z(load) = Z(t)*
Maximum power will be delivered to a pure resistance table if
R(load) = |Z(t)|
Again, if we define the impedance of Thevenin, we have
Z(t) = R(t) + jX(t)
And therefore, our load resistance is
R(load) = √[R(t)² + X(t)²]
