Answer:
1) They are not inverses
2) They are inverses
Explanation:
We need to find the composition function between these functions to verify if these functions are inverses. If f[g(x)] and g[f(x)] are equal to x they are inverses.
1)
Let's find f[g(x)] and simplify.
![f[g(x)]=(1)/(2)g(x)+(3)/(2)](https://img.qammunity.org/2022/formulas/mathematics/college/a6nrksolh739fo3x8xsc48euz886iq2h10.png)
![f[g(x)]=(1)/(2)(4-(3)/(2)x)+(3)/(2)](https://img.qammunity.org/2022/formulas/mathematics/college/qt3x00gl0b9cp8227aqwqq6ngsrfg5y3cc.png)
![f[g(x)]=(7)/(2)-(3)/(4)x](https://img.qammunity.org/2022/formulas/mathematics/college/ratf4d2xh9c4ij412ujvpolmsrgp9d8n50.png)
As f[g(x)] is not equal to x, these functions are not inverses.
2)
Let's find f[g(x)] and simplify.
![f[g(n)]=(-16+(4n+16))/(4)](https://img.qammunity.org/2022/formulas/mathematics/college/sqh351pcz01pjy4ovwqzbhkvhoxc5ta8db.png)
![f[g(n)]=(-16+4n+16)/(4)](https://img.qammunity.org/2022/formulas/mathematics/college/78oqrdygx6hbs8izvaqhdg6jcirnbsduh3.png)
![f[g(n)]=(4n)/(4)](https://img.qammunity.org/2022/formulas/mathematics/college/akunpdtuu3sbxsc4iwsxaqsvqs3qdi2x40.png)
![f[g(n)]=n](https://img.qammunity.org/2022/formulas/mathematics/college/h5vra8ixn49h1tmeqcwtmqojawmzaxkthe.png)
Now, we need to find the other composition function g[f(x)]
Let's find g[f(x)] and simplify.
![g[f(x)]=4((-16+n)/(4))+16](https://img.qammunity.org/2022/formulas/mathematics/college/ef12afqpct8ultib90cv64hc4h42pg3qb4.png)
![g[f(x)]=-16+n+16](https://img.qammunity.org/2022/formulas/mathematics/college/rizs0isyxbeco9qmhdmbz6hq18xqpyxkd8.png)
![g[f(x)]=n](https://img.qammunity.org/2022/formulas/mathematics/college/a38yuoqefc6z1hprlw1p61595e9nqos4w3.png)
Therefore, as f[g(n)] = g[f(n)] = n, both functions are inverses.
I hope it helps you!