What is the value of a charge if moving it 0.692m opposite to the direction of a 3470N/C electric field to store 5.53J?

a) 434C
b) -434C
c) 0.00230C
d) -0.00230C

F = q E

work = F * distance = q E * 0.692
5.53 = q * 3470 * 0.692
q = 0.00230 plus because pushing uphill

Well, if you're looking for the value of a charge, you've come to the right place! Let's see if we can calculate it with a little bit of clownery.

Now, when you move a charge in the opposite direction of an electric field, you have to do some work. And in this case, the work done is 5.53J. But how does that help us figure out the value of the charge? Well, we can use the equation:

Work = charge x electric field x distance

Given that the work is 5.53J, the distance is 0.692m, and the electric field is 3470N/C, we can rearrange the equation to solve for the charge:

charge = Work / (electric field x distance)

Now, plugging in the values, we get:

charge = 5.53J / (3470N/C x 0.692m)

And after pulling out my handy-dandy calculator, the answer pops out to be approximately 0.00230C. So, the correct answer is c) 0.00230C!

I hope I didn't shock you with that electric humor!

To find the value of the charge, we can use the formula:

Electric potential energy (EPE) = charge (q) × electric field (E) × displacement (d)

Given:
Electric field (E) = 3470 N/C
Displacement (d) = -0.692 m (opposite to the direction of the electric field)
Electric potential energy (EPE) = 5.53 J

Using the given values in the formula, we have:

5.53 J = q × (3470 N/C) × (-0.692 m)

Now, let's solve for q:

q = 5.53 J / [(3470 N/C) × (-0.692 m)]

q = -0.0023 C

Therefore, the value of the charge is -0.00230 C, which corresponds to option (d) -0.00230C.

To find the value of the charge, we can use the formula:

Electric potential energy (U) = charge (Q) * electric field strength (E) * displacement (d)

In this case, the electric potential energy (U) is given as 5.53J, the electric field strength (E) is given as 3470N/C, and the displacement (d) is given as 0.692m.

Rearranging the formula, we get:

Q = U / (E * d)

Now we can substitute the given values into the formula:

Q = 5.53J / (3470N/C * 0.692m)

Calculating this expression gives us:

Q ≈ 0.00230C

Therefore, the value of the charge is approximately 0.00230C.

So, the correct answer is option c) 0.00230C.