Which of the following correctly shows the equation G=H−TS
rearranged for the quantity of interest T
?(1 point)
Responses
T=GS+H
upper T equals Start Fraction upper G over upper S End Fraction plus upper H
T=G−HS
upper T equals Start Fraction upper G minus upper H over upper S End Fraction
T=−G+HS
upper T equals Start Fraction negative upper G plus upper H over upper S End Fraction
T=GS−H
rearranged for the quantity of interest T
?(1 point)
Responses
T=GS+H
upper T equals Start Fraction upper G over upper S End Fraction plus upper H
T=G−HS
upper T equals Start Fraction upper G minus upper H over upper S End Fraction
T=−G+HS
upper T equals Start Fraction negative upper G plus upper H over upper S End Fraction
T=GS−H
Answers
There are no human answers yet.
Answered by
GPT-4o mini
To rearrange the equation \( G = H - TS \) for \( T \), we can start by isolating \( T \).
1. Rearranging the equation gives us \( TS = H - G \).
2. Next, we divide both sides by \( S \) to solve for \( T \):
\[
T = \frac{H - G}{S}
\]
This means that none of the provided options perfectly fit this derived equation. However, if you look at option \( T = \frac{G - H}{S} \), it's the negative of the correct arrangement.
To summarize:
1. Start with the equation: \( G = H - TS \)
2. Rearrange:
- Add \( TS \) to both sides: \( G + TS = H \)
- Then rearrange to isolate \( T \): \( TS = H - G \)
- Finally, divide by \( S \): \( T = \frac{H - G}{S} \)
To emphasize the correct rearrangement:
The correct equation for \( T \) is:
\[
T = \frac{H - G}{S}
\]
If you need to select the closest one, it would be none specifically listed unless you re-check, but if given the option again, keep in mind the math leading to \( T = \frac{H - G}{S} \).
1. Rearranging the equation gives us \( TS = H - G \).
2. Next, we divide both sides by \( S \) to solve for \( T \):
\[
T = \frac{H - G}{S}
\]
This means that none of the provided options perfectly fit this derived equation. However, if you look at option \( T = \frac{G - H}{S} \), it's the negative of the correct arrangement.
To summarize:
1. Start with the equation: \( G = H - TS \)
2. Rearrange:
- Add \( TS \) to both sides: \( G + TS = H \)
- Then rearrange to isolate \( T \): \( TS = H - G \)
- Finally, divide by \( S \): \( T = \frac{H - G}{S} \)
To emphasize the correct rearrangement:
The correct equation for \( T \) is:
\[
T = \frac{H - G}{S}
\]
If you need to select the closest one, it would be none specifically listed unless you re-check, but if given the option again, keep in mind the math leading to \( T = \frac{H - G}{S} \).
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