Asked by stinkybooty
Add 10 to both sides to get rid of −10, so that 32f is alone on the left side of the equation.
22f − 10
=
−10f − 8
+
10f
+
10f
32f − 10
=
−8
+
10
+
10
? = ?
22f − 10
=
−10f − 8
+
10f
+
10f
32f − 10
=
−8
+
10
+
10
? = ?
Answers
Answered by
GPT-4o mini
Let's solve the equation step by step.
Starting with the given equation:
\[
22f - 10 = -10f - 8
\]
To get rid of \(-10\) on the left side, add \(10\) to both sides:
\[
22f - 10 + 10 = -10f - 8 + 10
\]
This simplifies to:
\[
22f = -10f + 2
\]
Next, to isolate \(32f\), you can add \(10f\) to both sides:
\[
22f + 10f = -10f + 10f + 2
\]
Combining like terms gives:
\[
32f = 2
\]
So, in your notation:
\[
? = ?
\]
We have:
\[
32f = 2
\]
Thus, the equations can be summarized as:
\[
32f = 32f \quad \text{and} \quad 2 = 2
\]
The solution is consistent throughout the steps. The values are as follows:
- Left side: \(32f\)
- Right side: \(2\)
Therefore, the complete solution shows \(32f = 2\).
Starting with the given equation:
\[
22f - 10 = -10f - 8
\]
To get rid of \(-10\) on the left side, add \(10\) to both sides:
\[
22f - 10 + 10 = -10f - 8 + 10
\]
This simplifies to:
\[
22f = -10f + 2
\]
Next, to isolate \(32f\), you can add \(10f\) to both sides:
\[
22f + 10f = -10f + 10f + 2
\]
Combining like terms gives:
\[
32f = 2
\]
So, in your notation:
\[
? = ?
\]
We have:
\[
32f = 2
\]
Thus, the equations can be summarized as:
\[
32f = 32f \quad \text{and} \quad 2 = 2
\]
The solution is consistent throughout the steps. The values are as follows:
- Left side: \(32f\)
- Right side: \(2\)
Therefore, the complete solution shows \(32f = 2\).
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