§ 1) Find V2 3 V 5 V 2) Find I -6 A 2 A
Q 3) Find v1, V2 and v3. + 30 V – + 20 V – - 50 V + + v2- 40 V
Decompose v into two vectors V, and V2, where V, is parallel to w and v2 is orthogonal to w. v=i-5j, w = 3i+j 1 29 3 7 O A. Vy=-51+ - 51, V2 = -51 5) 3 1 6 24 O B. Vy = - 51+ - 51, V2 = 51 5 3 1 8 24 OC. V = 5+ - 51, V2 = 51+ 2 2 5 43 OD. Vq = - 31+ - g), V2 = 3i+-gi
Vw Vout V2 SR, The circuit above has R1 = 1.5 k22, R2 = 2 k22, R3 = 1 k2, R4 = 2 ks, R6 = 2 k2, R2 = 750 12, Rg = 4 k22 and Rg = 1 k12. If V2 = 3 V + 3 sin(2000nt) V, determine R5 and the dc voltage v1 so that the output is 5.4 sin(2000nt) V. O v1 = -0.5 Vdc and R5 = 1 k12 Ov1 = 0.7 Vdc and...
For the given vectors V, and V2, determine V1 + V2, V1 + V2, V1 - V2, V, X V2, V1 V2. Consider the vectors to be nondimensional. у V2 = 15 Vi = 11 4 3 28° --- V1 + V2 = 26 V, + V2 = k) V. - V2 = k) + i + Vix V2 = j+ k) V1 V2 =
For a Maxwellian distribution, ⓝd's-G,T)" exp(- the units of f are (v2 + V, + V:))d%, b- 1/m3 c- s/m3 d. None of the aboeu) hay he dimension :-For the Maxwellian speed distribution, r(v)=GT) /2 (4π v2)exp i T), the most probable speed a- increases with T b /decreases with T ) 2%eT_ c- is independent of T d- None of the above MV
Determine the Voltage V2 6 + V1=10V - P=30W 24 V + 31. - V2 +
Assume very large β. Find h and V2. 10.7 V 0.7V V2 - 10.7 V
(v) v3 v2-VI (ii) In the circuit below, find the currents Ii and I2. Then find node b voltage 3k1, 4 k 6V4k 3 k 1 k I
5. (a) Show that Q(V2) C Q V2). (b) Find [Q( 12): Q(V2)]. (c) Show that r - V2 is irreducible in Q(V2)[].