$V_(DD) = 8V$
$V_(t0) = 2V$
$mu n C_(0x) = 20 muA/(V^2)$
$gamma = 0.50 sqrt(V)$
$2phi f = 0.6$
$C_l = 0.1 pF$
Trovare:
$(Z_d)/(Z_l)$ tale che $V_ = 0.566 V$
$V_h$ , $deltal$ , $deltah$ , $(dVo)/(dVi)$
$Z_l$ tale che $tpd = 10.44 ns$
$f : P_(st) = P_(d)$
CMOS
$V_(DD) = 8V$
$V_(tn0) = -V_(tp0) = 2V$
$mu n C_(0x) = 20 muA/(V^2)$
$mu p C_(0x) = 8 muA/(V^2)$
$Z_(n) = Z_(p) = Z$
$C_l = 0.1 pF$
Trovare:
$SL$ , $deltal$ , $deltah$ , $Vl_t$
$Z$ tale che $tpd = 11.66 ns$
$P$ tale che $f=f_(max)$
Ecco i miei risultati:
EEMOS
$(Z_d)/(Z_l) = 9$
$V_h = 5.185 V$
$(dVo)/(dVi) = -2.718$
$V_Ohm = 5.185 V$
$V_IlM = 2 V$
$V_OlM = 1.134 V$
$V_Ihm = 3.727 V$
$deltal = 0.866 V$
$deltah = 1.458 V$
$Z_l = 0.5$
$f = 159.82 Mhz$
CMOS
$SL = 8 V$
$Vl_t = 3.550 V$
$V_Ohm = 7.626 V$
$V_IlM = 2.929 V$
$V_OlM = 0.535 V$
$V_Ihm = 3.907 V$
$deltal = 2.394 V$
$deltah = 3.719 V$
$Z = 0.5$
$P = 548.885 muW$