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Planning Ahead Saving money is an important part of financial freedom and responsibility. What are the advantages of having a savings account?. Lesson Objective Find compound interest using a table and the compound interest formula. Content Vocabulary. compound interest table.
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Planning Ahead Saving money is an important part of financial freedom and responsibility. What are the advantages of having a savings account?
Lesson Objective Find compound interest using a table and the compound interest formula. Content Vocabulary • compound interest table compound interest table A tool to calculate compound interest quickly.
Example 1 State Bank pays 6 percent interest compounded quarterly on regular savings accounts. You deposited $3,000 for 2 years. You made no deposits or withdrawals. How much interest did you earn in 2 years? (Note: Use the Compound table on page A11 of your textbook to solve this problem.)
Example 1 Answer: Step 1 Find the total interest periods. Periods per Year × Number of Years 4 quarters per year × 2 years = 8 periods
Example 1 Answer: Step 2 Find the interest rate per period. Periods per Year × Number of Years Annual Rate ÷Number of Periods per Year 6% ÷4 = 1.5%
Example 1 Answer: Step 3 Find the amount for 8 periods at 1.5 percent per period using the Compound Interest—Amount of $1.00 table on page A11 of your textbook. It is 1.12649.
Example 1 Answer: Step 4 Find the amount. Original Principal ×Amount of $1.00 $3,000.00 ×1.12649 = $3,379.47
Example 1 Answer: Step 5 Find the compound interest. Amount – Original Principal $3,379.47 – $3,000.00 = $379.47
Example 2 Juan Lopez opens an account and deposits $4,379.47. The account pays 6 percent annual interest and compounds quarterly. Six months later he deposits $2,000. How much will he have in the account in 1½ more years if he continues to pay 6 percent interest compounded quarterly?
Example 2 Answer: Step 1 Find the total interest periods for first 6 months. Periods per Year ×Number of Years 4 quarters per year × ½ year = 2 periods
Example 2 Answer: Step 2 Find the interest rate per period. Annual Rate ÷Number of Periods per Year 6% ÷4 = 1.5%
Example 2 Answer: Step 3 Find the amount of $1.00 for 2 periods at 1.5 percent per period using the Compound Interest—Amount of $1.00 table on page 797. It is 1.03023.
Example 2 Answer: Step 4 Find the amount for 6 months. Original Principal ×Amount of $1.00 $4,379.47 ×1.03023 = $4,511.86 (new principal)
Example 2 Answer: Step 5 Find the amount for 1.5 years. Periods per Year ×Number of Years 4 quarters per year ×1.5 years = 6 periods
Example 2 Answer: Step 6 Find the amount of $1.00 for 6 periods at 1.5 percent per paid using the Compound Interest—Amount of $1.00 table on page 797. It is 1.09344.
Example 2 Answer: Step 7 Find the amount for 1.5 years. New Principal ×Amount of $1.00 ($4,511.86 + $2,000.00) ×1.09344 = $6,511.86 ×1.09344 = $7,120.33
Practice 1 $8,240 invested at 5.75 percent compounded semiannually for 3 years. No additional deposits or withdrawals. Find the amount.
Practice 1 Answer $8,240 x 1.18538 = $9,767.53
Practice 2 $1,900 invested at 6.25 percent compounded semiannually for 5 years. No additional deposits or withdrawals. Find the amount. How much interest did the money earn in 5 years?
Practice 2 Answer $1,900 invested at 6.25 percent compounded semiannually for 5 years: 1,900 x 1.36032 = $2,584.61 Interest earned in 5 years: 2,584.61 – 1900 = $684.61