If we substitute the equation \(x_l (t)= u_c (t)+j u_s (t)\) in equation x (t) + j ẋ (t) = xl(t) ej2πFct and equate real
Posted: Thu Jul 14, 2022 9:46 am
a) x(t)=\(u_c (t) \,cos2π \,F_c \,t+u_s (t) \,sin2π \,F_c \,t\); ẋ(t)=\(u_s (t) \,cos2π \,F_c \,t-u_c \,(t) \,sin2π \,F_c \,t\)
b) x(t)=\(u_c (t) \,cos2π \,F_c \,t-u_s (t) \,sin2π \,F_c \,t\); ẋ(t)=\(u_s (t) \,cos2π \,F_c t+u_c (t) \,sin2π \,F_c \,t\)
c) x(t)=\(u_c (t) \,cos2π \,F_c t+u_s (t) \,sin2π \,F_c \,t\); ẋ(t)=\(u_s (t) \,cos2π \,F_c t+u_c (t) \,sin2π \,F_c \,t\)
d) x(t)=\(u_c (t) \,cos2π \,F_c \,t-u_s (t) \,sin2π \,F_c \,t\); ẋ(t)=\(u_s (t) \,cos2π \,F_c \,t-u_c (t) \,sin2π \,F_c \,t\)
b) x(t)=\(u_c (t) \,cos2π \,F_c \,t-u_s (t) \,sin2π \,F_c \,t\); ẋ(t)=\(u_s (t) \,cos2π \,F_c t+u_c (t) \,sin2π \,F_c \,t\)
c) x(t)=\(u_c (t) \,cos2π \,F_c t+u_s (t) \,sin2π \,F_c \,t\); ẋ(t)=\(u_s (t) \,cos2π \,F_c t+u_c (t) \,sin2π \,F_c \,t\)
d) x(t)=\(u_c (t) \,cos2π \,F_c \,t-u_s (t) \,sin2π \,F_c \,t\); ẋ(t)=\(u_s (t) \,cos2π \,F_c \,t-u_c (t) \,sin2π \,F_c \,t\)