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Hi I’m looking to get a step by step solution in solving this problem in the red

Hi I’m looking to get a step by step solution in solving this problem in the red-example-1
User Syamantak Basu
by
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1 Answer

14 votes
14 votes

Given:


\begin{gathered} f(x)=13x+2 \\ \\ g(x)=3x^2-13 \\ \\ h(x)=(13)/(x+13) \end{gathered}

Find-:

The inverse of a function.

Explanation-:

(a)

For the inverse of a function, x change as y and y change as x and solve for 'y'


\begin{gathered} f(x)=13x+2 \\ \\ f(y)=13y+2 \\ \\ x\rightarrow y \\ \\ y\rightarrow x \\ \\ \end{gathered}

Then solve,


\begin{gathered} y=13x+2 \\ \\ y-2=13x \\ \\ x=(y-2)/(13) \end{gathered}

So, value,


f^(-1)(y)=(y-2)/(13)

(b)


g(x)=3x^2-13

So, the value is:


g(y)=3y^2-13

The inverse of a function is:


\begin{gathered} x=3y^2-13 \\ \\ x\rightarrow y \\ \\ y\rightarrow x \\ \\ y=3x^2-13 \\ \\ 3x^2=y+13 \\ \\ x^2=(y+13)/(3) \\ \\ x=\sqrt{(y+13)/(3)} \end{gathered}

So, the inverse value is:


g^(-1)(y)=\sqrt{(y+13)/(3)}

(c)


h(x)=(13)/(x+13)

Value of h(y) is:


h(y)=(13)/(y+13)

Then solve for inverse function,


\begin{gathered} x=(13)/(y+13) \\ \\ x\rightarrow y \\ \\ y\rightarrow x \\ \\ y=(13)/(x+13) \\ \\ y(x+13)=13 \\ \\ x+13=(13)/(y) \\ \\ x=(13)/(y)-13 \end{gathered}

So, inverse value is:


h^(-1)(y)=(13)/(y)-13

User Piotr
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