A solar cell that is 15% efficient in converting solar to electric energy produces an energy flow of 1.00 kW/ $m^{2}$ $\text(m)^2$ when exposed to full sunlight. The cell has an area of 30.0 ${cm}^{2}$ $\text(cm)^2$ . (a) What is the power output of the cell, in watts?

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A solar cell that is 15% efficient in converting solar to electric energy produces an energy flow of 1.00 kW/ $m^{2}$ $\text(m)^2$ when exposed to full sunlight. The cell has an area of 30.0 ${cm}^{2}$ $\text(cm)^2$ . (a) What is the power output of the cell, in watts?

Two sections:

What is the power output of the cell, in watts?

If the power calculated in part (a) is produced at 0.45 V , how much current does the cell deliver?

1 Answer

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Answer 1 · 2016-11-23T03:47:19

Here's what I got.

Explanation:

Start by calculating the energy flow of the solar cell in kilowatts per square centimeter, ${kW cm}^{- 2}$ $"kW cm"^(-2)$ . Use the fact that

$color(blue)(ul(color(black)("1 m"^2 = 10^4"cm"^2)))$

to find

$1.00 "kW"/color(Red)(cancel(color(black)("m"^2))) * (1color(Red)(cancel(color(black)("m"^2))))/(10^4"cm"^2) = 1.00 * 10^(-4) "kW cm"^(-2)$

Now, you know that the total surface of the solar cell is equal to $"30.0 cm"^2$ . Use this to calculate the total power processed by the cell from the incoming solar energy

$30.0 color(Red)(cancel(color(black)("cm"^2))) * (1.00 * 10^(-4)"kW")/(1color(Red)(cancel(color(black)("cm"^2)))) = 3.00 * 10^(-3)"kW"$

The cell is said to have an efficiency of $15%$ , which basically means that for every $"100 kW"$ of processed solar power, i.e. the power input, only $"15 kW"$ are converted to electric power, i.e. the power output.

In your case, this efficiency will produce a power output of

$3.00 * 10^(-3)color(Red)(cancel(color(black)("kW input"))) * "15 kW output"/(100color(Red)(cancel(color(black)("kW input")))) = 4.5 * 10^(-4)"kW"$

Finally, to convert this to watts, use the fact that

$color(blue)(ul(color(black)("1 kW" = 10^3"W")))$

You will end up with

$4.5 * 10^(-4) color(Red)(cancel(color(black)("kW"))) * "1 W"/(10^3color(Red)(cancel(color(black)("kW")))) = color(darkgreen)(ul(color(black)("0.45 W")))$

The answer is rounded to two sig figs, the number of sig figs you have for the efficiency of the solar cell.

For part (b), use the fact that

$color(blue)(ul(color(black)(P = I * V)))$

Here

$P$ is electric power

$I$ is electric current

$V$ is voltage

Rearrange to solve for $I$

$P = I * V implies I = P/V$

Keeping in mind that in terms of units you have

$color(blue)(ul(color(black)("1 W" = "1 A" * "1 V")))$

plug in your values to find

$I = (0.45color(red)(cancel(color(black)("V"))) * "A")/(0.45color(red)(cancel(color(black)("V")))) = color(darkgreen)(ul(color(black)("1.0 A")))$

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A solar cell that is 15% efficient in converting solar to electric energy produces an energy flow of 1.00 kW/ $m^{2}$ $\text(m)^2$ when exposed to full sunlight. The cell has an area of 30.0 ${cm}^{2}$ $\text(cm)^2$ . (a) What is the power output of the cell, in watts?

Two sections:

What is the power output of the cell, in watts?

If the power calculated in part (a) is produced at 0.45 V , how much current does the cell deliver?

1 Answer

Explanation:

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A solar cell that is 15% efficient in converting solar to electric energy produces an energy flow of 1.00 kW/\text(m)^2m2\text(m)^2 when exposed to full sunlight. The cell has an area of 30.0 \text(cm)^2cm2\text(cm)^2. (a) What is the power output of the cell, in watts?

Two sections: What is the power output of the cell, in watts? If the power calculated in part (a) is produced at 0.45 V , how much current does the cell deliver?

1 Answer

Explanation:

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Impact of this question

A solar cell that is 15% efficient in converting solar to electric energy produces an energy flow of 1.00 kW/ $m^{2}$ $\text(m)^2$ when exposed to full sunlight. The cell has an area of 30.0 ${cm}^{2}$ $\text(cm)^2$ . (a) What is the power output of the cell, in watts?

Two sections:

What is the power output of the cell, in watts?

If the power calculated in part (a) is produced at 0.45 V , how much current does the cell deliver?