The function f is defined by f(x) = k/x+3, where k is a constant. Find k, if the graph of f passes through the point (3/4,0). k=

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asked Sep 5, 2021 39.3k views

1 Answer

Nathan Prometheus · Answer 1 · 2021-09-10T15:59:40+0000

Answer:

The value of k if the graph of f passes through the point (3/4,0) is
$\mathbf{k=-(9)/(4)}$

Explanation:

We are given the function:
f(x)=(k)/(x)+3 where k is constant.

We need to find k, if the graph of f passes through the point (3/4,0).

So, graph passes through point (3/4,0) we have x=3/4 and y =0

Putting value of x in given function we can find value of x

We have f(x)=0, and x= 3/4

$f(x)=(k)/(x)+3\\0=(k)/((3)/(4) )+3$

Using fraction rule:
(a)/((b)/(c) )=(a.c)/(b)

$0=(4k)/(3 )+3\\Taking \ LCM\\0=(4k+9)/(3)\\3*0=4k+9\\0=4k+9\\4k=-9\\k=(-9)/(4)$

So, The value of k if the graph of f passes through the point (3/4,0) is
$\mathbf{k=-(9)/(4)}$