Answer:
[tex]\displaystyle k^{-1} (-4) = -\frac{39}{5}[/tex]
Step-by-step explanation:
We are given the function:
[tex]\displaystyle k(w) = \frac{w + 3}{w + 9}[/tex]
And we want to find k⁻¹(-4).
Recall that by the definition of inverse functions:
[tex]\displaystyle \text{If } f(a) = b, \text{ then } f^{-1}(b) = a[/tex]
Let k⁻¹(-4) = x, where x is an unknown value. Then by definition, k(x) must equal -4.
So:
[tex]\displaystyle k(x) = \frac{x+3}{x+9} = -4[/tex]
Solve for x:
[tex]\displaystyle \begin{aligned} \frac{x+3}{x+9} &= -4 \\ \\ x+3 &= -4(x+9) \\ \\ x+3 &= -4x - 36 \\ \\ x &= -\frac{39}{5} \end{aligned}[/tex]
Hence, k(-39/5) = -4. By definition of inverse functions, then, k⁻¹(-4) = -39/5.
