Question
Which equation is equivalent to w = x + y - z?
A. z = (x + y) / w
B. z = x + y + w
C. z = w - x - y
D. z = x + y - w
A. z = (x + y) / w
B. z = x + y + w
C. z = w - x - y
D. z = x + y - w
Answers
GPT-4o mini
To find an equation equivalent to \( w = x + y - z \), we can manipulate this original equation to isolate \( z \).
Starting with the original equation:
\[
w = x + y - z
\]
We can rearrange it to solve for \( z \):
1. Add \( z \) to both sides:
\[
w + z = x + y
\]
2. Next, subtract \( w \) from both sides to isolate \( z \):
\[
z = x + y - w
\]
Now, let's compare this with the options given:
A. \( z = \frac{x + y}{w} \) — Not equivalent.
B. \( z = x + y + w \) — Not equivalent.
C. \( z = w - x - y \) — Not equivalent.
D. \( z = x + y - w \) — This is equivalent to what we derived.
The correct answer is:
**D. \( z = x + y - w \)**
Starting with the original equation:
\[
w = x + y - z
\]
We can rearrange it to solve for \( z \):
1. Add \( z \) to both sides:
\[
w + z = x + y
\]
2. Next, subtract \( w \) from both sides to isolate \( z \):
\[
z = x + y - w
\]
Now, let's compare this with the options given:
A. \( z = \frac{x + y}{w} \) — Not equivalent.
B. \( z = x + y + w \) — Not equivalent.
C. \( z = w - x - y \) — Not equivalent.
D. \( z = x + y - w \) — This is equivalent to what we derived.
The correct answer is:
**D. \( z = x + y - w \)**
nobody
are you sure this is correct
GPT-4o mini
Let's go through the steps again to verify the calculations.
Starting with the equation given:
\[
w = x + y - z
\]
We want to isolate \( z \). To do this, we can rearrange the equation:
1. Add \( z \) to both sides and subtract \( w \) from both sides:
\[
z = x + y - w
\]
Now we have \( z \) expressed in terms of \( w, x, \) and \( y \):
\[
z = x + y - w
\]
Now let’s check each option:
A. \( z = \frac{x + y}{w} \) — Not equivalent.
B. \( z = x + y + w \) — Not equivalent.
C. \( z = w - x - y \) — Not equivalent.
D. \( z = x + y - w \) — This is equivalent to what we derived.
So upon review, we confirm that the correct answer is indeed:
**D. \( z = x + y - w \)**
If you have any further questions or need clarification on a specific part, feel free to ask!
Starting with the equation given:
\[
w = x + y - z
\]
We want to isolate \( z \). To do this, we can rearrange the equation:
1. Add \( z \) to both sides and subtract \( w \) from both sides:
\[
z = x + y - w
\]
Now we have \( z \) expressed in terms of \( w, x, \) and \( y \):
\[
z = x + y - w
\]
Now let’s check each option:
A. \( z = \frac{x + y}{w} \) — Not equivalent.
B. \( z = x + y + w \) — Not equivalent.
C. \( z = w - x - y \) — Not equivalent.
D. \( z = x + y - w \) — This is equivalent to what we derived.
So upon review, we confirm that the correct answer is indeed:
**D. \( z = x + y - w \)**
If you have any further questions or need clarification on a specific part, feel free to ask!