Given H(t)=10-2t^2 , find h^-1 (t), is h (t) one to one ? What does this imply about h^-1(t)

Question

asked Nov 14, 2023 131k views

1 Answer

← Prev Question Next Question →

Ask a Question

Khalil Gharbaoui · Answer 1 · 2023-11-18T15:34:20+0000

We have the function:

And we have to find the inverse function.

We can write this as:

We can solve this as:

$\begin{gathered} H(H^(-1)(t))=10-2(H^(-1))^3=t \\ 10-2(H^(-1))^3=t \\ 2(H^(-1))^3=10-t \\ (H^(-1))^3=(10-t)/(2) \\ H^(-1)=\sqrt[3]{(10-t)/(2)}^{} \end{gathered}$

The inverse function is:

$H^(-1)=\sqrt[3]{(10-t)/(2)}^{}$

The domain of H is all the real numbers, as the domain of H^-1.

Given H(t)=10-2t^2 , find h^-1 (t), is h (t) one to one ? What does this imply about h^-1(t)

Please log in or register to add a comment.

Please log in or register to answer this question.

1 Answer

Please log in or register to add a comment.

No related questions found

Categories

Other Questions