The table below shows some inputs and outputs of the invertible function f with domain all real numbers.

x | 14 | -6 | -1 | 10 | -10 | 3
f(x) | 7 | -10 | -15 | 14 | -4 | -9

Find the following values:

f^-1(f^-1(7)) = ?
f^-1(-4) = ?

f(x) is a function where we plug in the given row of x values to have them lead to the corresponding f(x) values in the table. We see that x = 14 leads to y = f(x) = 7. Going backwards, we can say [tex]f^{-1}(7) = 14[/tex]. The inverse simply undoes everything f(x) does.

So,

[tex]f^{-1}(f^{-1}(7)) = f^{-1}(14) = 10[/tex]

For the portion [tex]f^{-1}(14) = 10[/tex], look at the column that has x = 10. This shows it leading to f(x) = 14. You trace this column upward to go backward to undo f(x).

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That takes care of the first part. The second part is pretty much the same idea. We locate where -4 is in the bottom row, and then we write down the corresponding x value.

We see that y = -4 pairs with x = -10, which is why [tex]f^{-1}(-4) = -10[/tex]

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Keep in mind that this function must be one-to-one for the inverse to exist. If not, then you'll have to do some kind of domain restriction.

keshavgandhi04 keshavgandhi04 · Answer 2 · 2022-08-01T07:18:24+02:00

The answer of the first table is 10 and the answer of the second table is -10.

What is a function?

A certain kind of relationship called a function binds inputs to essentially one output.

A function can be regarded as a computer, which is helpful.

In other words, the function is a relationship between variables, and the nature of the relationship defines the function for example y = sinx and y = x +6 like that.

Given that data set

x | 14 | -6 | -1 | 10 | -10 | 3

f(x) | 7 | -10 | -15 | 14 | -4 | -9

now at x =14 , f(x) = 7

f(14) = 7 ⇒ [tex](f^-(7))[/tex] = 14

Now at x =-10 , f(x) = 14

f(10) = 14 now since f inverse of f inverse 7 is equal to f inverse 14 so from here

[tex](f^-(14))[/tex] = [tex]f^-(f^-(7))[/tex] = 10 hence it will be the correct answer for the first block.

Now for the second block at x = -10 , f(x) = -4 so

[tex](f^-(-4))[/tex] = -10 hence it will be the correct answer for the second block.

For more about the function

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The table below shows some inputs and outputs of the invertible function f with domain all real numbers. x | 14 | -6 | -1 | 10 | -10 | 3 f(x) | 7 | -10 | -15 | 14 | -4 | -9 Find the following values: f^-1(f^-1(7)) = ? f^-1(-4) = ?

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What is a function?

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The table below shows some inputs and outputs of the invertible function f with domain all real numbers.

x | 14 | -6 | -1 | 10 | -10 | 3
f(x) | 7 | -10 | -15 | 14 | -4 | -9

Find the following values:

f^-1(f^-1(7)) = ?
f^-1(-4) = ?