Find the inverse of a linear function f(x) = 4x + 5.

To find the inverse of a linear function, we’ll swap the x and y variables and solve for y.

Given the linear function

f(x) = 4x + 5

let’s replace f(x) with y

y = 4x + 5

Let’s switch the x and y variables and move the constant term to the left side

x = 4y + 5
x - 5 = 4y

Divide both sides by 4

\$("x" - 5)/4 = (4"y")/4\$

\$"y" = ("x" - 5)/4\$

Therefore, the inverse of the linear function f(x) = 4x + 5 is: \$"f"^(-1)("x") = ("x" - 5)/4\$.

This option has an incorrect intercept; it should be -5 instead of +5 for the inverse function

\$"f"^(-1)("x") = ("x" + 5)/4 \$

This option has a different slope and an incorrect intercept, making it the wrong choice for the inverse function

\$"f"^(-1)("x") = ("x" - 4) / 5 \$

This option correctly represents the inverse function with the right slope and intercept

\$ "f"^(-1)("x") = ("x" - 5)/4 \$

This option suggests adding 4 and dividing by 5, resulting in an incorrect slope and intercept

\$ "f"^(-1) ("x") = ("x" + 4)/5 \$

Option

C

Can you summarize what you’ve understood in the above steps?