The initial balance of a mutual fund is $1200. The fund is expected to grow in value at an annual rate of 2%.

Let x represent the number of years since the fund was started. Let y represent the value of the fund x years later.

What equation models the value of the mutual fund x years after it was started?

1200 + .02x = y

The 1,200 has nothing done to and just added in the equation since it's the initial balance. The annual rate is 2% and in decimal form that's .02. x is years so years is multiplied by the 2% fee since the fee is annual. Then this equals the value of the fund x years later which is y. Hopefully all of that made sense XD
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JeanaShupp JeanaShupp · Answer 2 · 2018-12-19T09:47:31+01:00

Answer: [tex]y=1200+0.02x[/tex]

Step-by-step explanation:

Given: The initial balance of a mutual fund = $1200

The annual rate of growth = 2%

Let x represent the number of years since the fund was started.

Let y represent the value of the fund x years later.

Then the growth in fund each year=2% of x

⇒ The growth in fund each year= [tex]0.02x[/tex]

Thus the value of fund x years later (y)=[tex]1200+0.02x[/tex]

Hence, the equation models the value of the mutual fund x years after it was started is [tex]y=1200+0.02x[/tex]