Math

QuestionInterpret the expression 10,785(1.0275)x10,785(1.0275)^{x}: What are the initial investment and growth rate? Choose A, B, C, D, or E.

Studdy Solution

STEP 1

Assumptions1. The expression 10,785(1.0275)x10,785(1.0275)^{x} represents the amount of money in an investment account with interest that compounds. . The number 10,78510,785 represents the initial investment amount.
3. The number 1.02751.0275 represents the growth rate of the investment.
4. The variable xx represents the number of compounding periods.

STEP 2

The initial investment is the coefficient of the exponential function, which is 10,785.10,785.Initialinvestment=$10,785Initial\,investment = \$10,785$

STEP 3

The growth rate of the investment is the base of the exponent, subtracted by1 and expressed as a percentage.Growthrate=(1.02751)×100%Growth\,rate = (1.0275 -1) \times100\%

STEP 4

Calculate the growth rate.
Growthrate=(1.0271)×100%=2.75%Growth\,rate = (1.027 -1) \times100\% =2.75\%The initial investment is $10,785\$10,785 and the growth rate of the investment is 2.75%2.75\%. Therefore, the correct answer is. The initial investment is $10,785\$10,785 and the growth rate of the investment is 2.75%2.75\%.

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