Home > Electronics and Telecommunication Engineering > Quizzes > Network Theory: Synthesis of RLC Circuits
Network Theory: Synthesis of RLC Circuits
Fast practice, instant feedback. Timer auto-submits when time’s up.
Avg score: 33% Most missed: “The driving point impedance of a one-port reactive network is given by Z(s)=5(s2…”
Network Theory: Synthesis of RLC Circuits
Time left 00:00
6 Questions

1. The driving point impedance of an LC network is given by Z(s)=(s4+4s2+3)/(s3+2s) . By taking the continued fraction expansion using second Cauer form, find the value of C1.
2. The driving point impedance of an LC network is given by Z(s)=(2s5+12s3+16s)/( s4+4s2+3). By taking the continued fraction expansion using first Cauer form, find the value of L1.
3. The driving point impedance of a one-port reactive network is given by Z(s)=5(s2+4)(s2+25)/s(s2+16) . After taking the partial fractions, find the coefficient of 1/s.
4. Consider a function Z(s)=5(s+1)(s+4)/(s+3)(s+5) . Find the value of R1 after performing the first form of Foster method.
5. Consider the admittance function, Y(s)=((2s2+16s+30))/( s2+6s+8). Determine the value of L1 after performing the second form of Foster method.
6. Consider the impedance function; Z(s)=((s+4)(s+8))/((s+2)(s+6)) . Find the value of R1 after converting into first Cauer form.