find $f^{-1}(-7)$.\
\
| $x$ | $f(x)$ |\
| --- | --- |\
| $6$ | $-5$ |\
| $5$ | $-2$ |\
| $-7$ | $7$ |\
| $-17$ | $0$ |\
| $-4$ | $-7$ |\
| $7$ | $-4$ |\
\
answer attempt 1 out of 3\
submit answer

Question

find $f^{-1}(-7)$.\
\
| $x$ | $f(x)$ |\
| --- | --- |\
| $6$ | $-5$ |\
| $5$ | $-2$ |\
| $-7$ | $7$ |\
| $-17$ | $0$ |\
| $-4$ | $-7$ |\
| $7$ | $-4$ |\
\
answer attempt 1 out of 3\
  submit answer

Accepted Answer

# Explanation:
## Step1: Recall inverse function definition
The inverse function $ f^{-1}(y) $ gives the $ x $ such that $ f(x) = y $. So we need to find $ x $ where $ f(x) = -7 $.

## Step2: Look at the table for $ f(x) = -7 $
From the table, when $ f(x) = -7 $, the corresponding $ x $ value is $ -4 $.

# Answer:
$ -4 $

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QUESTION IMAGE

Question

Explanation:

Step1: Recall inverse function definition

Step2: Look at the table for \( f(x) = -7 \)

Answer:

$x$	$f(x)$	\
---	---	\
$6$	$-5$	\
$5$	$-2$	\
$-7$	$7$	\
$-17$	$0$	\
$-4$	$-7$	\
$7$	$-4$	\