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29 Exponential Growth and Decay Warm Up Simplify each expression. 1. (4 + 0.05)2 2. 25(1 + 0.02)3 3. 4. The first term of a geometric sequence is 3 and the common ratio is 2. What is the 5th term of the sequence? 5. The function f(x) = 2(4)x models an insect population after x days. What is the population after 3 days? Holt McDougal Algebra 1 29 Exponential Growth and Decay Objective Solve problems involving exponential growth and decay. Exponential growth occurs when an quantity increases by the same rate r in each period t. When this happens, the value of the quantity at any given time can be calculated as a function of the rate and the original amount. Holt McDougal Algebra 1 29 Exponential Growth and Decay Example 1: Exponential Growth The original value of a painting is $9,000 and the value increases by 7% each year. Write an exponential growth function to model this situation. Then find the painting’s value in 15 years. Step 1 Write the exponential growth function for this situation. Write the formula. Substitute 9000 for a and 0.07 for r. Simplify. Step 2 Find the value in 15 years. Substitute 15 for t. Use a calculator and round to the nearest hundredth. The value of the painting in 15 years is Holt McDougal Algebra 1 29 Exponential Growth and Decay Example 2 A sculpture is increasing in value at a rate of 8% per year, and its value in 2000 was $1200. Write an exponential growth function to model this situation. Then find the sculpture’s value in 2006. Step 1 Write the exponential growth function for this situation. Write the formula Substitute 1200 for a and 0.08 for r. Simplify. Step 2 Find the value in 6 years. Substitute 6 for t. Use a calculator and round to the nearest hundredth. The value of the painting in 6 years is Holt McDougal Algebra 1 29 Exponential Growth and Decay A common application of exponential growth is compound interest. Recall that simple interest is earned or paid only on the principal. Compound interest is interest earned or paid on both the principal and previously earned interest. Reading Math For compound interest • annually means “once per year” (n = 1). • quarterly means “4 times per year” (n =4). • monthly means “12 times per year” (n = 12). Holt McDougal Algebra 1 29 Exponential Growth and Decay Example 3: Finance Application Write a compound interest function to model each situation. Then find the balance after the given number of years. $1200 invested at a rate of 2% compounded quarterly; 3 years. Step 1 Write the compound interest function for this situation. Write the formula. Substitute 1200 for P, 0.02 for r, and 4 for n. Simplify. Holt McDougal Algebra 1 29 Exponential Growth and Decay Example 3 Continued Write a compound interest function to model each situation. Then find the balance after the given number of years. $1200 invested at a rate of 2% compounded quarterly; 3 years. Step 2 Find the balance after 3 years. Substitute 3 for t. Use a calculator and round to the nearest hundredth. The balance after 3 years is Holt McDougal Algebra 1 29 Exponential Growth and Decay Example 4: Finance Application Write a compound interest function to model each situation. Then find the balance after the given number of years. $15,000 invested at a rate of 4.8% compounded monthly; 2 years. Step 1 Write the compound interest function for this situation. Write the formula. Substitute 15,000 for P, 0.048 for r, and 12 for n. Simplify. Holt McDougal Algebra 1 29 Exponential Growth and Decay Example 4 Continued Write a compound interest function to model each situation. Then find the balance after the given number of years. $15,000 invested at a rate of 4.8% compounded monthly; 2 years. Step 2 Find the balance after 2 years. Substitute 2 for t. Use a calculator and round to the nearest hundredth. The balance after 2 years Holt McDougal Algebra 1 29 Exponential Growth and Decay Example 5 Write a compound interest function to model each situation. Then find the balance after the given number of years. $1200 invested at a rate of 3.5% compounded quarterly; 4 years Step 1 Write the compound interest function for this situation. Write the formula. Substitute 1,200 for P, 0.035 for r, and 4 for n. Simplify. Holt McDougal Algebra 1 29 Exponential Growth and Decay Example 5 Continued Write a compound interest function to model each situation. Then find the balance after the given number of years. $1200 invested at a rate of 3.5% compounded quarterly; 4 years Step 2 Find the balance after 4 years. Substitute 4 for t. Use a calculator and round to the nearest hundredth. The balance after 4 years is Holt McDougal Algebra 1 29 Exponential Growth and Decay Example 6 Write a compound interest function to model each situation. Then find the balance after the given number of years. $4000 invested at a rate of 3% compounded monthly; 8 years Step 1 Write the compound interest function for this situation. Write the formula. Substitute 4,000 for P, 0.03 for r, and 12 for n. Simplify. Holt McDougal Algebra 1 29 Exponential Growth and Decay Example 6 Continued Write a compound interest function to model each situation. Then find the balance after the given number of years. $4000 invested at a rate of 3% compounded monthly; 8 years Step 2 Find the balance after 8 years. Substitute 8 for t. Use a calculator and round to the nearest hundredth. The balance after 4 years is Holt McDougal Algebra 1
