If Millie invests $3,000 today in her retirement account at a 6% annual return, how much will she have after 5 years?

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Study for the Personal Financial Planning Test. Access flashcards and multiple choice questions with hints and explanations. Prepare thoroughly for your certification exam now!

To determine how much Millie will have after 5 years when investing $3,000 at a 6% annual return, we can use the formula for compound interest, which is:

[ A = P(1 + r)^n ]

Where:

( A ) is the amount of money accumulated after n years, including interest.
( P ) is the principal amount (the initial amount of money).
( r ) is the annual interest rate (decimal).
( n ) is the number of years the money is invested or borrowed.

In Millie's case:

( P = 3,000 )
( r = 0.06 ) (which is 6% expressed as a decimal)
( n = 5 )

Substituting the values into the formula, we have:

[ A = 3,000(1 + 0.06)^5 ]

Calculating step-by-step:

Calculate ( (1 + 0.06) ), which equals 1.06.
Raise 1.06 to the power of 5, which gives approximately 1.338226.
Multiply by the principal amount:

[ A

If Millie invests $3,000 today in her retirement account at a 6% annual return, how much will she have after 5 years?

Study for the Personal Financial Planning Test. Access flashcards and multiple choice questions with hints and explanations. Prepare thoroughly for your certification exam now!

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