There is a 4nC located at the position (2m,0) and a -6nC charge located at (0,3m)....
can you just answer the forst one then Question 11 (1 point) There is a 4nC located at the position (2m.0) and a -6nC charge located at (0,3m). What is the electric potential V at the origin? (9210°) (4:10) (9–10°) (6x10-9) V = 18 + 18 = 36J/C + 2 3 You can not add them because one is from the x-axis and the other is from the y- axis. ov (9x10') (4x10") 22 (9:10")( 6x109) = 9 - 6...
There is a 4nC located at the position (2m,0) and a -6nC charge located at (0,3m). What is the electric potential V at the origin? You can not add them because one is from the x-axis and the other is from the y-axis. (9x10') (6x10-9 + 18 + 18 Ov (9x10°) (4x10-) = 36J/C 2 3 (9x109) (-6z10-) + = 18 – 18 v = (9x10°) (4210-9) = 0J/C 2 3 lov (9x10°) (-6x10 6 (9x10') (4x10) 24 3.) /...
Question 3 (1 point) WW 2 Ω W 4 Ω 52 I 12 V What is the current leaving the battery? Rseries = R1 + R2 + R3+... 1 R1 + R2 + R3 + Rparallel V = IR 1.09A L21 What is the current leaving the battery? Rseries = R1 + R2 + R3+... = R + + + Rparallel V= IR 1 1.09A 6.3A 11.4A 1A
12V What is the current leaving the battery? Rseries R1 + R2 + R3+... ti + 2 + 3 + Rparallel V=IR 1A 11.4A 1.09A 6.3A о в 232 492 5 Ω IA 12 V What is the current leaving the battery? Rseries = R1 + R2 + R3+... + R2 + R3 + 1 R1 Rparallel V = IR Ο 1Α 11.4A 6.3A
13 2: What is the equivalent resistance? Think about the flow of current. Resistances are in series only when they have exactly the same current. Resistances are in parallel when their 'legs' are connected on one side and on the other side. Do this in a couple of steps. Rseries = R1 + R2 + R +... het is + Rparallel V=IR 3: 110.80 52.17 230 Next Page Page 12 of 18 Question 12 (1 point) If the wavelength of...
Find i1a , R1a , v1b , R1b , P1c , and R1c The resistance R, is a variable resistor that can take on values in the range 0 R,24 Find the value of R1 = R1a that maximizes current i and 1 the resulting maximum current i1 = i1a Find the value of R1 = R1b that maximizes voltage v1 and 2. the resulting maximum voltage vı = v1b Find the value of R1 R1c that maximizes the power...
Solve each practice problem. TYPE solutions in engineering notation TYPE solutions in engineering notation. Calculate the component voltages and branch currents for the circuit shown in Figure 6.40, along with the values of I, and Rr. 3. R3 2 kn R4 4.7 k R1 10 k Vs 26 V R5 3.3 k R2 3 kn FIGURE 6.40 Calculate the component currents and loop voltages for the circuit shown in Figure 6.42, along with the values of I and Rr 5....