To find the total value of the account 5 years from now, you need to add 5 years to the current number of years \(x\). This is represented by the function \(f( x+ 5) \), which equals \(q \cdot 1.025^ { ( x+ 5) } \).
Supplemental Knowledge
Exponential functions are commonly used to model situations where growth or decay happens at a constant percentage rate. In the context of finance, exponential functions are often used to calculate compound interest, where the amount of interest earned each period is added to the principal, so that the balance grows exponentially over time.
The general formula for compound interest is:
\[A = P \cdot ( 1 + r) ^ t\]
where:
- \(A\) is the amount of money accumulated after n years, including interest.
- \(P\) is the principal amount (the initial deposit).
- \(r\) is the annual interest rate (as a decimal).
- \(t\) is the time the money is invested for in years.
In this problem, \(f( x) = q \cdot 1.025^ x\), where: - \(q\) represents the initial deposit.
- 1.025 represents a 2.5% annual interest rate.
- \(x\) represents the number of years.
Theory in Practice
Imagine investing $1000 with an annual interest rate of 2.5% into an account where interest accrues at 2.5% annually, compounding at an accelerating pace each year as its interest accrues and adds back into principal for calculation next year - creating a long-term savings boost! This compounding effect can dramatically expand savings over long time frames.
Example: Leaving money in an account without making deposits or withdrawals over five years without additional deposits/withdrawals can help calculate its growth exponentially, similar to Mrs. Varner.
Understanding exponential functions and compound interest can greatly enhance your financial literacy and help you make informed investment decisions. At UpStudy, we offer powerful tools like our Algebra functions calculator to help you master these concepts effortlessly. Dive into our extensive resources and live tutor question bank for personalized guidance on financial mathematics and more.
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