Question 1:NM 10 points (a) Proof that [pf [k] [Pl = diag(una b) Normalize the vectorsand
Rpi Ri Mi 1. Specifications (a) RR21 150 k. (b) RDi 3 k2. (c) Rs1 400 Ω. (d) RL 10 k. (e) 9m-10 mS. (f) Use 10μF capacitors. (h) Cod 5 pF (i) Cds= 25 pF Tasks (a) Determine (b) Determine Tod (c) Determine TL from Ci2 and CDB) (d) Determine H, the 3 dB high frequency bandwidth Rpi Ri Mi 1. Specifications (a) RR21 150 k. (b) RDi 3 k2. (c) Rs1 400 Ω. (d) RL 10 k. (e)...
(a) Find the orthogonal projection Pf(x) of a) i/2 onto the subspace of Question 1 (b) Express P in the form of an integral operator Pf(x)K(x,y)f(y) dy and find the kernel K(x, y)
b) (Bonus Question - 10 Points): Compute the infinite sum 1 Σ k= (2k-1)(2k +1)
please help Problem 4 (10 points): 1. Consider the numbers 23.724 and 0.3344770219. Please normalize both 2. Calculate their sum by hand. 3. Convert to binary assuming each number is stored in a 16-bit register. Half-precision binary floating-point has: sign bit: lbit, exponent width: 5bits and a bias of 15, and significand 10 bits (16 bits total) 4. Show cach step of their binary addition, assuming you have one guard, one round, and one sticky bit, rounding to the nearest...
Question 14 (10 points): Sodium light with wavelengths 588.99 nm and 589.59 nm is incident on a grating with 5500 lines per cm. A screen is placed 3.0 m above the grating. What is the distance between the two spectral lines in the first-order spectrum (Ay_1) and second order spectrum (Ay_2) on the screen? Question 14 (10 points): Sodium light with wavelengths 588.99 nm and 589.59 nm is incident on a grating with 5500 lines per cm. A screen is...
please answer the question using 0 & 1 instead of T & F 7. (10) Give a direct proof and an indirect proof of the following: 7. (10) Give a direct proof and an indirect proof of the following:
2. Given 10 pF 50 V( o(t) 1k10 Figure 1 (a) (10 points) The switch in the circuit below has been closed for a long time and it opens at t -0. Find vo(t) for t>0. (b) (5 points) Use MATLAB to plot vo(t) for t>0.
Please solve all parts of the question 6. (10 points 5+5) We want to prove by contradiction that, for all integers k not divisible by p, if p is prime then no two different numbers in the set Ak(k,2k, 3k.. 1)k) are congruent mod p. (a) Clearly state the assumption to begin the proof by contradiction. (b) Complete the proof by making two observations regarding this assumption that immediately lead to a contradiction
10. Let dk -Ck*+1/2 exp(-k), where C is a strictly positive constant. At some point in the proof of Stirling's formula, we have that k! lim-= 1 and that (22n (n!)2 )2 (2nn+)2 (22n (dn)22 r π lim - Show that lim n→oo (dy.)"(2n+1) 2 10. Let dk -Ck*+1/2 exp(-k), where C is a strictly positive constant. At some point in the proof of Stirling's formula, we have that k! lim-= 1 and that (22n (n!)2 )2 (2nn+)2 (22n (dn)22...
Part 4 of 10 - Question 4 of 10 1.0 Points Find k such that Pr[Z<k] = .7517, where Z is the standard normal random variable. O A..2483 O B.-.32 Oc..32 O D.-.68 O E..68 Reset Selection