Ask Question
13 October, 11:33

Find the inverse of

f (x) = - 2 (x+3) ^2 - 1

+1
Answers (1)
  1. 13 October, 15:30
    0
    Step-by-step explanation:

    Note that the graph of this function is that of a parabola that opens down and has its vertex at (-3, - 1). If we draw a horiz. line thru this graph, it will intersect the graph in two places below this vertex. Thus, this graph fails the horiz. line test and the function has no inverse.

    However, if we restrict x as follows: [-3, ∞)

    the graph passes the horiz. line test, and the function has an inverse on this restricted domain.

    To find it, do the following:

    1) replace "f (x) " with "y": y = - 2 (x+3) ^2 - 1

    2) Interchange x and y: x = - 2 (y+3) ² - 1

    3) Solve this result for y: 2 (y + 3) ² = - x - 1 ↔ (y + 3) ² = (1/2) (-x - 1)

    ↔ √ (y + 3) ² = √ (1/2) (-x - 1)

    ↔ y + 3 = (1/√2) · √ (-[x + 1])

    ↔ y = - 3 + (1/√2) · √ (-[x + 1])

    Note that the domain of the √ function is [0, ∞), so - x - 1 must be ≥ 0.

    Simplifying: - x - 1 must be ≥ 0 ↔ - x ≥ 1, or x ≤ 1.

    This inverse function is defined ONLY on x ≤ 1 same as (-∞, 1].

    4) As a last step, replace this "y" with:

    -1

    f (x)
Know the Answer?
Not Sure About the Answer?
Find an answer to your question ✅ “Find the inverse of f (x) = - 2 (x+3) ^2 - 1 ...” in 📘 Mathematics if you're in doubt about the correctness of the answers or there's no answer, then try to use the smart search and find answers to the similar questions.
Search for Other Answers