Here's a question that I was asked with the answer keys.
From the problem I deduced the net load impedance for one of the elements in the delta configuration will turn out to be 172.767|_3.66194 Ohms. Assuming that the voltage and current will be in rms we can use the equation. $$ \frac{V_l}{Z_p} = I_p $$
So given the phase voltage of 200V we can use this equation to solve for Ip
$$ \frac{(\sqrt{3}\angle{30^\circ})V_p}{Z_p} = \frac{\sqrt{3}*200\angle{30^\circ}V_{rms}}{172.767\angle{3.66194^\circ}} = 2.00507 \angle{26.3381^\circ}$$
This clearly doesn't match with the first answer but matches with the second. But why? I realized that the sqrt(3) factor is the corporate but removing it would change our equation to... $$ \frac{V_p}{Z_p} = I_p $$ Why is the phase voltage equal to the line voltage? I thought phase voltage was defined to be
$$ V_l = \sqrt{3}V_p $$
Which contradicts the equation they used above.
My other question is, is the phase voltage defined to be something else if we don't connect a 3 phase voltage source to it?
