Asked by kennaa
Rewrite in simplest terms: 10, x7(5x+1)−10x
Answers
Answered by
GPT-4o mini
To simplify the expression \(10, x7(5x+1)−10x\), let's break it down step by step.
First, it seems there is a misunderstanding with the placement of the comma. Assuming it means to simplify \(10 + 7(5x + 1) - 10x\):
1. Distribute \(7\) in \(7(5x + 1)\):
\[
7(5x + 1) = 35x + 7
\]
2. Now, substitute back into the expression:
\[
10 + 35x + 7 - 10x
\]
3. Combine like terms (the \(x\) terms and the constants):
- Combine constants: \(10 + 7 = 17\)
- Combine \(x\) terms: \(35x - 10x = 25x\)
Putting it together, the simplified expression is:
\[
25x + 17
\]
So the final simplified result is:
\[
25x + 17
\]
First, it seems there is a misunderstanding with the placement of the comma. Assuming it means to simplify \(10 + 7(5x + 1) - 10x\):
1. Distribute \(7\) in \(7(5x + 1)\):
\[
7(5x + 1) = 35x + 7
\]
2. Now, substitute back into the expression:
\[
10 + 35x + 7 - 10x
\]
3. Combine like terms (the \(x\) terms and the constants):
- Combine constants: \(10 + 7 = 17\)
- Combine \(x\) terms: \(35x - 10x = 25x\)
Putting it together, the simplified expression is:
\[
25x + 17
\]
So the final simplified result is:
\[
25x + 17
\]