kindly solve it jw Tosk 2. rea S-3 ? Commer() nahe ot esponge os vovi es
kindly solve part b, c ,d
Q2: For the following high pass filter in Figure 2. Derive a formula for the gain or transfer function T (jw) = Find the condition of an optimal performance with minimum ripple in the passband. Find the cut-off frequency f3dB- Design this filter to have f3dB=100 Hz and maximum gain of 50. R3 nori Figure 2 w win V,
What is the domain of C{3te3 -- 2e2+ + sin(2t)}(s)? Os> -3 Os> -2 Os > 2 Os > 0 Os > -1 None
OS X 3). Kindly draw the graph of each function. ). Find and show the x and y intercepts. Find and show all asymptotes, if they exest a). fox) =-3x+q b). 3®) = (x-3/x+2) x²+3x-10 x-1 d). før) = 3 /09(x+4)–1 e). M(x) = -4 sin(3x-7)+ 7 (one c). h) = period
2. [15 points]Simplify the following expression Jw 3 C) cos(π) )-(2, +3) (b sin kw S(w)
kindly solve Q3
kindly solve Q4
(25 Puan) f(x)={0 0 < x <4 Expand f(x) in Fourier series. 8 3. (25 Puan) f(x)={0 0 < x <4 Expand f(x) in Fourier series. 8 3.
(25 Puan) f(x)={0 0
3) Find the inverse Fourier transform of X(w) = jw +3 -w2 + j3w + 2 jw +3 (jw + 1) (w + 2)2 X(W) =
28-29 In Fig. 28-25, solve for the following: a. I8 b.Ic c. VCE OS d. Icisaty e. VCE(om Vcc = 12 V R 1.2 kn Rg=220 k Boc 100 EOJ 2 77pieaA Figure 28-25 ba eall bsol-ot enotsloalso anioc-o daiansi
28-29 In Fig. 28-25, solve for the following: a. I8 b.Ic c. VCE OS d. Icisaty e. VCE(om
Vcc = 12 V R 1.2 kn Rg=220 k Boc 100 EOJ 2 77pieaA Figure 28-25 ba eall bsol-ot enotsloalso anioc-o daiansi
A closed-loop system's transfer function is given in the form: T(S) = $3 + 732 - 21s + 10 S6 + 55 – 6s+ - 52 - S + 6 How many poles does the system have on the right-half side, RHS of the s-plane, on the left-half side, LHS of the es-plane, and on the jw-axis. O poles on the RHS, O poles on the LHS, and 6 poles on the jw-axis. 1 pole on the RHS, 1 pole...
2) Given the figure helow witi OS II R by Find SR c Find os 3" 8) Solve: Δ.AT, 'ound to lhe neaicst lenih. d.e lind all angles and sides) LA-90 7 feet 37
how we can solve q2
2. a) The Michaelis-Menten mechanism is +KTERE] - @s→Es (rateco nstant kl) ク ES→ E + S (rate constant k2) E S ES-XⓟHE) orate constant k3) So d[PVdt- k3[ES] Use the steady state approximation to show [El/[ES] (k2+k3)/(k1[S] b) let Km=(k2+k3)/kl and show that you get the expression ·J [EVIES]-Km/[S] c) We will talk in class about how this information eventually gives rise the expression d[P]/dt-k3E][S/(Km +IS) Usually [S>>Km. Show what this equation simplifies to...