Question #d8878

Question

Question #d8878

1 Answer

Impact of this question

1158 views around the world

You can reuse this answer
Creative Commons License

Answer 1 · 2017-09-18T23:44:54

$25$ $25$ months

Explanation:

Suppose that the number of months is $x$ $x$ .

We can express the two situations as functions of $x$ $x$ .

If Lauren were to subscribe to the music website, she'd have to pay $$ 35$ $$35$ a month. So over a certain number of months, she'd have to pay $$ 35$ $$35$ times the number of months she downloaded music.

Mathematically, this is expressed as $35 x$ $35 x$ .

But with this membership, Lauren would also need to pay an annual fee of $$ 500$ $$500$ .

As a whole function, we can write this as $f (x) = 35 x + 500$ $f(x) = 35 x + 500$ .

If Lauren downloads music without becoming a member, she'd have to pay $$ 55$ $$55$ a month, without any extra fees.

Similarly, this can be expressed mathematically as $55 x$ $55 x$ , or in function form as $h (x) = 55 x$ $h(x) = 55 x$ .

Now, we need to find the number of months $x$ $x$ that Lauren would have to download music so as both costs are the same.

Basically, we need to find the "meeting point" between these two functions.

So let's set the two functions equal to each other, i.e $f (x) = h (x)$ $f(x) = h(x)$ :

$\Rightarrow 35 x + 500 = 55 x$ $Rightarrow 35 x + 500 = 55 x$

Let's solve for $x$ $x$ :

$\Rightarrow 500 = 55 x - 35 x$ $Rightarrow 500 = 55 x - 35 x$

$\Rightarrow 500 = 20 x$ $Rightarrow 500 = 20 x$

$\Rightarrow 25 = x$ $Rightarrow 25 = x$

$therefore x = 25$

Therefore, Lauren would have to download music for $25$ months for the cost to be the same with and without a membership.

Science

Math

Humanities

... and beyond

Question #d8878

1 Answer

Explanation:

Related questions

Impact of this question