You are given Vs = A1.12.cos (100t +B) Vc = A2. Cos (100t + B2) Find VR = Az . cos (100t + B3) with - 180° SB3 S 180° + DR w Solve without using a calculator. Given Variables: A1: 8 V B1: 5 degrees A2:8 V B2: -40 degrees Determine the following: A3 (V): B3 (degrees):
Please explain how you added the phasors together. You are given vs = A1.v2.cos (100t + B1) Vc = A2 · cos (100t + B2) Find VR = Az · cos (100t + B3) with – 180° 5 B3 = 180° + VC Solve without using a calculator. Given Variables: A1:20 B1: 25 degrees A2:20 B2: -20 degrees Determine the following: A3 (V): B3 (degrees):
vs(t) = A1 cos(1000t + B1) (a) Find the instantaneous power supplied by the power supply p = A2V3+ Az cos(2000t + B3) with –180° < B3 5 180 (b) Find the instantaneous power received by the inductor p = A4V3+ As cos(2000t + B5) with –180º < B5 S 180 vs RV3 = Given Variables: A1:10 V B1: 90 degrees R: 4 ohm C:250 uF L:2mH
vs(t) = A cos(1000t + B1) (a) Find the instantaneous power supplied by the power supply p = A2V3+ A3 cos(2000t + B3) with-180° < B3 S 180 (b) Find the instantaneous power received by the inductor p = A4V3 + A5 cos(2000t + B5) with-180° < B5 < 180 Vs RV3 Given Variables: A1:4V B1:30 degrees R:2 ohm C: 500 uF L:2 mH
LWW is(t) = A1 . cos(1000t +90) + A2 cos(2000t -90) Assume the system is in steady state. Find the current ia at times t1 47 ms: ia (t1) = B1 t2= 5m ms: ia (t2) = B2 kia(t) + R2 Given Variables: A1:9A A2:3A L:2 mH C:500 uF R1:10 ohm R2:2 ohm k:3 V/A Determine the following
Urgent!! Please label all the answers and find a1,a2,a3 and b1,b2,b3. (1 point) The second order equation x2y" - (x – ķ) y = 0 has a regular singular point at x = 0, and therefore has a series solutio y(x) = Σ CnN+r n=0 The recurrence relation for the coefficients can be written in the form Cn =( DCn-1, n = 1,2, ..., (The answer is a function of n and r.) The general solution can be written in...
Urgent! Please mark all correct answers and find values of a1,a2,a3 and b1,b2,b3. (1 point) The second order equation 3x2y" + 5xy' +(-1x – 1)y = 0 has a regular singular point at x = 0, and therefore has a series solution DO (x) = ± x"+". N=0 The recurrence relation for the coefficients can be written in the form n=1,2,.... C =( ),-1) (The answer is a function of n and r.) The general solution can be written in...
Find A and B1 -1 1+j 21 l1-A^ eB, with 0A, and -180 B, 180 Solve without a calculator Given Variables: a :2 b:2 Determine the following: A1 () B1 (degrees)
Assume that in A1, A2, A3, and A4 you have the values of 1, 2, 3, and 4, respectively. In B1, C1, and D1, have the letters a, b, and c, respectively. In B2, C2, and D2 you have the letters of d, e, and f, respectively. In B3, C3, and D3 you have the letters of g, h, and i, respectively. What will the command of =VLOOKUP(3,A1:D4,3) return? Group of answer choices h c a g i
Urgent!! Please show mark all correct answers and also find values of a1,a2,a3,a4,a5,a6 and b1,b2,b3,b4,b5,b6. Thank you! (1 point) The second order equation x?y" + xy' +(x2 - y = 0 has a regular singular point at x = 0, and therefore has a series solution y(x) = Σ CGxhtr P=0 The recurrence relation for the coefficients can be written in the form of n = 2, 3, ... C =( Jan-2 (The answer is a function of n and...