Let $f(x)=5x+4$ and $g(x)=x−4/5$ , find: a). $(f@g)(x)$ ? b). $(g@f)(x)$ ?

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Let $f(x)=5x+4$ and $g(x)=x−4/5$ , find: a). $(f@g)(x)$ ? b). $(g@f)(x)$ ?

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Answer 1 · 2018-02-26T16:51:14

$(f ∘ g) (x) = 5x$ $(g ∘ f) (x)=5x+16/5$

Explanation:

Finding $(f ∘ g) (x)$ means finding $f(x)$ when it is composed with $g(x)$ , or $f(g(x))$ . This means replacing all instances of $x$ in $f(x)=5x+4$ with $g(x)=x-4/5$ :

$(f ∘ g) (x)=5(g(x))+4=5(x-4/5)+4=5x-4+4=5x$

Thus, $(f ∘ g) (x) = 5x$

Finding $(g ∘ f) (x)$ means finding $g(x)$ when it is composed with $f(x)$ , or $g(f(x)).$ This means replacing all instances of $x$ in $g(x)=x-4/5$ with $f(x)=5x+4:$

$(g ∘ f) (x) = f(x)-4/5=5x+4-4/5=5x+20/5-4/5=5x+16/5$

Thus, $(g ∘ f) (x)=5x+16/5$

Answer 2 · 2018-02-26T17:05:19

See explanation...

Explanation:

Alright, first lets remember what $f@g$ and $g@f$ mean.

$f@g$ is a fancy way of saying $f(g(x))$ and $g@f$ is a fancy way of saying $g(f(x))$ . Once we realize this, these problems aren't that difficult to solve.

So $f(x)=5x+4$ and $g(x)=x-4/5$

a) $f@g$

Ok lets start with the $f(x)$ function

$f(x)=5x+4$

Then, we just add the $g(x)$ function whenever we see an $x$ in the $f(x)$ function.

$f(g(x))=5g(x)+4$ $->$ $5(x-4/5)+4$

Simplify:

$f(g(x)))=(5x-4)+4$ $->$ $5xcancel(-4)cancel(+4)$

So therefore, $f@g=5x$

b) $g@f$

Alright, it's the same process here just it's the opposite. Let's start with the $g(x)$ function.

$g(x)=x-4/5$

Then, we just add the $f(x)$ function whenever we see an $x$ in the $g(x)$ function.

$g(f(x))=f(x)-4/5$ $->$ $(5x+4)-4/5$

Simplify:

$g(f(x))=5x+16/5$

Therefore, $g@f=5x+16/5$

Hope this helped!
~Chandler Dowd

Answer 3 · 2018-03-22T17:22:05

For $g(x)=x-4/5$ it is solved by Chandler Dowd and VNVDVI
For $g(x)=(x-4)/5$ , [ requested by Widi K. ]the solution is

$color(red)( (fog)(x)=x and (gof)(x)=x)$

Explanation:

We have, $f(x)=color(red)(5x+4 ...to(1)$
$and g(x)=color(blue)((x-4)/5.......to(2)$ .
Hence,
$(fog)(x)=f(g(x))$
$(fog)(x)=f(color(blue)((x-4)/5))....to$ from(2)
$(fog)(x)=f(m)$ ,......[ take $m=(x-4)/5$ ]
$(fog)(x)=color(red)(5m+4$ ......[Apply (1) for $x tom$ ]
$(fog)(x)=cancel5(color(blue)((x-4)/cancel5))+4$ ...[ put $m=(x-4)/5$ ]
$(fog)(x)=x-4+4$
$(fog)(x)=x$

$(gof)(x)=g(f(x))$
$(gof)(x)=g(color(red)(5x+4))......to$ from(1)
$(gof)(x)=g(n)........$ [ take $n=5x+4$
$(gof)(x)=(color(blue)((n-4)/5))$ ......[ Apply (2) for $x ton$
$(gof)(x)=(5x+4-4)/5....$ [ put $n=5x+4 ]$
$(gof)(x)=(5x)/5$
$(gof)(x)=x$

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Let $f(x)=5x+4$ and $g(x)=x−4/5$ , find: a). $(f@g)(x)$ ? b). $(g@f)(x)$ ?

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Let $f(x)=5x+4$ and $g(x)=x−4/5$ , find: a). $(f@g)(x)$ ? b). $(g@f)(x)$ ?