аЯрЁБс>ўџ >@ўџџџ=џџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџџьЅС` №П'bjbjЫsЫs 40ЉЉџџџџџџЄјјјјјјј дддд р ‚ъ л л л $lhдК'јл л л л л 'јј л<5 5 5 л ј ј 5 л 5 5 јј5 є 0…ЋЛ№Шдх ю5 R0‚5 Žг XŽ5 Žј5 Ьл л 5 л л л л л ''+ л л л ‚л л л л   $0Є   0   јјјјјјџџџџ "Directions on how to use the "Financial Calculator" Remember from the class, tap on calculator and use your thumb to hit the right side of the navigator. Before you begin to solve each problem, you might want to clear away any residual results or input parameters of earlier calculations. You can do this pressing the "Edit" button then the "Clear" key. The six financial function keys are: N Number of periods APR Periodic Interest rate P/Yr Periods per Year PV Present Value PMT Periodic Payment, and FV Future Value The basic strategy for solving financial problems is to enter a value into five of the six financial registers using their respective buttons and then tell the calculator to solve for the sixth parameter. To solve you need to enter the calculation mode with the "Edit" button then use the "Solve" button to get your answer. Negative amounts are used to indicate money that flows away from you. These are cash outflows or disbursements. Whenever you pay for something with cash (or an equivalent), you have a negative cash flow. Whenever you make a payment on a loan, that is a negative cash flow. When you receive money, that's a positive cash flow. Positive cash flows occur when you sell something for cash, or borrow money. How to... Solve for the Principal and Interest on a home and show the payment schedule. Suppose you would like to know how much it will cost per month in Principal and Interest to buy a new home. The builder is asking $255,000 for a new home, the interest rate for a 30 year amortized mortgage is 6.25% and you have a down payment of about $20,000. Saving $10,000 for closing costs, you plan on borrowing $245,000 enter 245,000 press PV (Positive, initially received from the bank) enter 360 press N (30 * 12 ) enter 6.25 press APR enter 12 press P/Yr enter 0 press FV Press the Edit button to enter the calculation mode. Payment Mode: End Pmt should be cleared, not zero, after clicking "Solve", it should show Pmt as $-1508.507 Once you enter the Payment mode the screen changes and you can stay there to try more calculations. Click on "Done" then click on "Amt" to show the entire payments schedule on a monthly basis. This will show how much is paid towards the Principal and Interest as time progresses in a spreadsheet format. ( yes, I know... what an amazing little tool !! ) If you click on Running Totals you will see that at the end of the 30 years the loan will have cost the borrower $298,062.57 in interest. Solve for the Balance on a mortgage loan after 10 years Suppose that you have been paying your mortgage for ten years and you would like to know how much you still owe. When you initially purchased the house you took a standard 30 year amortized mortgage of $250,000 and your monthly payments have been $1300. enter 250,000 press PV (Positive, you received that amount initially from the bank) enter 120 press N (10 * 12 ) enter 6.25 press APR enter 12 press P/Yr enter 1300 press +/- to show -1300 then press Pmt (Negative, payments to the bank) Press the Edit button to enter the calculation mode Payment Mode: End FV should be clear, not zero, after hitting "Solve", it should show FV as $-250,346.09 !!! This means your monthly payments were barely enough to cover the interest payments on the loan for the last 10 years and you still owe about the same amount as when you initially purchased your house. If you redo this loan with a N of 360 and a FV of 0 with the Pmt as unknown you will find that the standards payments to amortize this loan fully should be around $-1539.29 per month. Solve for the equity on your home Suppose you would like to know how much equity you have in your home. The equity is the value of the house less what you owe on the mortgage. What you know is that you borrowed $175,000 to buy the house 5 years ago and you have 15 years to pay on the mortgage. The interest rate on the mortgage is 6.25% and the tax appraisal district says that the house is worth $220,000. Your monthly payments are $1279.12 (P&I). What is your equity? This is a two step problem. The first step is to figure out how much you owe. You know that you have 180 (15 X 12) months to pay on the loan, the interest rate is 6.25% (annual), your monthly payments are $1279.12 and the balance of the loan at the end of the 180 months will be zero. enter 6.25 press APR enter 12 press P/Yr enter 180 press N (15 * 12 ) enter 1279.12 press +/- to show -1279 then Pmt (Negative, disbursement to the bank) enter 0 press FV Press the Edit button to enter the calculation mode. Payment Mode: End PV should be clear, not zero, after hitting "Solve", it should show PV as $149,181.93 Subtract that from the appraised value ($220,000) and you'll have your equity. Your equity is about $70,818 and seven cents. Solve for Number of Payments to pay off debt (out cash flow) Suppose that you owe your credit card company a total of $5,950 and you would like to pay off the balance. How long will it take you to pay it off if the credit card company charges 18.75% annual interest and you can afford to pay $120 per month? enter 5,950 press PV enter 0 press FV enter 18.75 press APR enter 12 press P/Yr enter 120 press +/- to show -120 then press Pmt (Negative, disbursement to the bank) Press the Edit button to enter the calculation mode. Payment Mode: End N should be clear, not zero, after hitting "Solve", it should show N as 96.135 It will take 96 monthly payments of $120 to pay off this debt at this interest rate. Solve for Number of Payments to Save for a Future Purchase Suppose that you would like to buy a boat that will cost $15,500. In order to save the money to buy this boat, you have opened a savings account at your bank. The savings account pay 3.25% annual interest, compounded monthly. You opened the account with an initial deposit of $1000, and you are able to save an additional $350 each month. How long will it take you to save enough to buy the boat? enter 15,500 press FV (Positive, future value is money that we expect to get in the future) enter 1,000 press +/- to show -1,000 press PV (Negative, we're going to give it to the bank) enter 3.25 press APR enter 12 press P/Yr enter 350 press +/- to show -350 then Pmt (Negative, the payment is leaving our hands) Press the Edit button to enter the calculation mode. Payment Mode: End N should be clear not zero, after hitting "Solve", it should show N as 39.03 So the answer is 39 months to save enough to buy the boat. Solve for the rate of return of an investment Suppose you bought a bond for $985. The bond will pay you $45 semiannually for the next 7 and a half years. At the end of that time, the corporation that issued the bond will redeem the bond for $1050. What rate of return will you realize on the bond if you hold it to the maturity date? enter 1050 press FV enter 985 press +/- to show -985 press PV (Negative, disbursement paid to get the bond) enter 45 press Pmt enter 2 press P/Yr enter 15 press N (7.5 * 2 = 15 periods of 6 months) Press the Edit button to enter the calculation mode. APR should be clear not zero, after hitting "Solve", it should show APR as 9.7544 So the return on this investment is equivalent to 9.75% interest rate. Solve for the rate of return of an investment every month Suppose you bought a bond for $985. The bond will pay you $7.50 monthly for the next 7 and a half years. At the end of that time, the corporation that issued the bond will redeem the bond for $1050. What rate of return will you realize on the bond if you hold it to the maturity date? enter 1050 press FV enter 985 press +/- to show -972 press PV (Negative, disbursement paid to get the bond) enter 7.5 press Pmt enter 12 press P/Yr enter 90 press N (7.5 * 12 = 90 months) Press the Edit button to enter the calculation mode. 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