Question
minus, 4, left parenthesis, 8, f, plus, g, right parenthesis, plus, 9, g, minus, 5, left parenthesis, minus, 2, g, plus, 6, f, right parenthesis−4(8f+g)+9g−5(−2g+6f)
Answers
GPT-4o mini
To simplify the given expression \( -4(8f+g) + 9g - 5(-2g+6f) \), we will follow the order of operations, distributing terms where necessary.
1. Distribute the \(-4\) across \( (8f + g) \):
\[
-4(8f + g) = -32f - 4g
\]
2. Distribute the \(-5\) across \( (-2g + 6f) \):
\[
-5(-2g + 6f) = 10g - 30f
\]
Now substituting these results back into the expression:
\[
-32f - 4g + 9g + 10g - 30f
\]
3. Now we can combine like terms:
- For the \(f\) terms: \(-32f - 30f = -62f\)
- For the \(g\) terms: \(-4g + 9g + 10g = 15g\)
Putting it all together, the simplified expression is:
\[
-62f + 15g
\]
Thus, the final answer is:
\[
-62f + 15g
\]
1. Distribute the \(-4\) across \( (8f + g) \):
\[
-4(8f + g) = -32f - 4g
\]
2. Distribute the \(-5\) across \( (-2g + 6f) \):
\[
-5(-2g + 6f) = 10g - 30f
\]
Now substituting these results back into the expression:
\[
-32f - 4g + 9g + 10g - 30f
\]
3. Now we can combine like terms:
- For the \(f\) terms: \(-32f - 30f = -62f\)
- For the \(g\) terms: \(-4g + 9g + 10g = 15g\)
Putting it all together, the simplified expression is:
\[
-62f + 15g
\]
Thus, the final answer is:
\[
-62f + 15g
\]