A 240 VDC series motor takes 40 A when giving its rated output at 1200 rpm. The combined value of armature and series field resistance is 0.3 \Omega . Find what resistance must be added to obtain the rated torque (a) at starting (b) at 800 rpm.
Question 5.36: A 240 VDC series motor takes 40 A when giving its rated outp...
\begin{array}{l}\text { Rated voltage, } V=240 V\\\text { Rated current, } I_{1}=40 A\\\text { Rated speed, } N_{1}=1200 rpm\end{array}
\text { Back emf, } E_{b 1}=V-I_{a} R_{m}=240-40 \times 0.3=228 V
(i) At start when speed is zero, the back emf E_{b 2} will be zero and rated torque will be developed when current drawn by the motor is of rated value i.e.,
\begin{array}{l}\begin{array}{c}\text { Current, } I_{2}=40 A \\\text { Back emf, } E_{b 2}=V-I_{2}\left(R_{1}+R_{m}\right)\end{array}\\\therefore \text { additional resistance, } R_{1}=\frac{V-E_{b 2}}{I_{2}}-R_{m}=\frac{240-0}{40}-0.3= 5 . 7 \text { ohm}\end{array}
(ii) At 800 rpm, the rated torque will be developed only when current drawn by the motor is rated one i.e.,
I_{3}=40 ASince field current remains the same, back emf will be proportional to speed i.e.,
E_{b 2}=E_{b_{1}} \times \frac{N_{3}}{N_{1}}=228 \times \frac{800}{1200}=152 V
\therefore required additional resistance, R_{2}=\frac{V-E_{b 3}}{I_{3}}-R_{m}=\frac{240-152}{40}-0.3=1.9 \Omega
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