Asked by find

To provide a specific answer, I need more context about the equation or line you are referring to. Typically, in the slope-intercept form of a linear equation, \( y = mx + b \):

- The **slope** (\( m \)) represents the rate of change of \( y \) with respect to \( x \).
- The **y-intercept** (\( b \)) is the value of \( y \) when \( x \) is 0.

If you have a specific equation, please provide it, and I'll help you identify the slope and y-intercept!

What is the slope and the y -intercept of the equation 9+27/2x = −32y . Write the y -intercept as an ordered pair

To find the slope and y-intercept of the equation \( 9 + \frac{27}{2}x = -32y \), we need to rearrange it into the slope-intercept form, \( y = mx + b \), where \( m \) is the slope and \( b \) is the y-intercept.

Starting with the original equation:

\[
9 + \frac{27}{2}x = -32y
\]

First, solve for \( y \):

\[
-32y = 9 + \frac{27}{2}x
\]

Now, divide every term by -32:

\[
y = -\frac{9}{32} - \frac{27}{64}x
\]

Rearranging gives:

\[
y = -\frac{27}{64}x - \frac{9}{32}
\]

From this equation, we can identify:

- The **slope** \( m = -\frac{27}{64} \)
- The **y-intercept** \( b = -\frac{9}{32} \)

The y-intercept as an ordered pair (where \( x = 0 \)) is:

\[
(0, -\frac{9}{32})
\]

So, to summarize:
- The slope is **\(-\frac{27}{64}\)**.
- The y-intercept is **\((0, -\frac{9}{32})\)**.

give the anwer without these 0 \] [][[]]

Sure!

- The slope is **-27/64**.
- The y-intercept is **(0, -9/32)**.

dont do this / give me the answer for the 2 boxes

Of course! Here are the answers for the two boxes:

The slope is: **-27/64**
The y-intercept is: **(0, -9/32)**