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Find the simple interest on the loan. $1400 at 6% for 10 years. Find the total amount due for the simple interest loan. $1300 at

Find the simple interest on the loan. $1400 at 6% for 10 years. Find the total amount due for the simple interest loan. $1300 at 7% for 10 years. Determine the amount due on the compound interest loan. (Round your answers to the nearest cent.) $11,000 at 5% for 15 years if the interest is compounded in the following ways. (a) annually $ (b) quarterly $ Find the term of the compound interest loan. (Round your answer to two decimal places.) 4.9% compounded quarterly to obtain $8300 from a principal of $2000. Yr Use the "rule of 72" to estimate the doubling time (in years) for the interest rate, and then calculate it exactly. (Round your answers to two decimal places.) 9% compounded annually. "rule of 72" yr exact yr answer Find the effective rate of the compound interest rate or investment. (Round your answer to two decimal places.) 14% compounded monthly. [Note: This rate is a typical credit card interest rate, often stated as 1.2% per month.] You have just received $175,000 from the estate of a long-lost rich uncle. If you invest all your inheritance in a tax-free bond fund earning 6.7% compounded quarterly, how long do you have to wait to become a millionaire? (Round your answer to two decimal places.) Yr You have just won $150,000 from a lottery. If you invest all this amount in a tax-free money market fund earning 7% compounded weekly, how long do you have to wait to become a millionaire? (Round your answer to two decimal places.) Yr In the following ordinary annuity, the interest is compounded with each payment, and the payment is made at the end of the compounding period. Find the accumulated amount of the annuity. (Round your answer to the nearest cent.) $4500 annually at 7% for 10 years. In the following ordinary annuity, the interest is compounded with each payment, and the payment is made at the end of the compounding period. Find the required payment for the sinking fund. (Round your answer to the nearest cent.) Monthly deposits earning 5% to accumulate $9000 after 10 years. In the following ordinary annuity, the interest is compounded with each payment, and the payment is made at the end of the compounding period. Find the amount of time needed for the sinking fund to reach the given accumulated amount. (Round your answer to two decimal places.) $3500 yearly at 7% to accumulate $100,000. Yr In the following ordinary annuity, the interest is compounded with each payment, and the payment is made at the end of the compounding period. An individual retirement account, or IRA, earns tax-deferred interest and allows the owner to invest up to $5000 each year. Joe and Jill both will make IRA deposits for 30 years (from age 35 to 65) into stock mutual funds yielding 9.8%. Joe deposits $5000 once each year, while Jill has $96.15 (which is 5000/52) withheld from her weekly paycheck and deposited automatically. How much will each have at age 65? (Round your answer to the nearest cent.) J o e $ Ji ll $ In the following ordinary annuity, the interest is compounded with each payment, and the payment is made at the end of the compounding period. You and your new spouse each bring home $1600 each month after taxes and other payroll deductions. By living frugally, you intend to live on just one paycheck and save the other in a mutual fund yielding 7.81% compounded monthly. How long will it take to have enough for a 20% down payment on a $155,000 condo in the city? (Round your answer to two decimal places.) Yr Determine the payment to amortize the debt. (Round your answer to the nearest cent.) Monthly payments on $170,000 at 5% for 25 years. Find the unpaid balance on the debt. (Round your answer to the nearest cent.) After 7 years of monthly payments on $180,000 at 5% for 25 years. $ Solve the system by graphing. (Enter your answers as a commaseparated list. If the system is inconsistent, enter INCONSISTENT. If the system is dependent, enter DEPENDENT.) x+y= 4 xy= 2 Solve the system by the elimination method. (Enter your answers as a comma-separated list. If the system is inconsistent, enter INCONSISTENT. If the system is dependent, enter DEPENDENT.) x + y = 10 2x + 3y = 24 Formulate the situation as a system of two linear equations in two variables. Be sure to state clearly the meaning of your xand y-variables. Solve the system by the elimination method. Be sure to state your final answer in terms of the original question. A lawyer has found 60 investors for a limited partnership to purchase an inner-city apartment building, with each contributing either $4,000 or $8,000. If the partnership raised $340,000, then how many investors contributed $4,000 and how many contributed $8,000? x = $4,000 investors y = $8,000 investors Find the dimension of the matrix. 3 7 9 3 7 5 Find the values of the specified elements. a1,1 = a3,2 = Find the augmented matrix representing the system of equations. x + 3y = 9 2x + 7y = 13 Carry out the row operation on the matrix. R1 R2 on 4 9 3 2 2 9 2 8 Carry out the row operation on the matrix. R1 R2 R1 on 2 4 5 3 6 0 5 5 Carry out the row operation on the matrix. 1 5 R2 R2 on 6 3 49 5 10 0 0 Interpret the augmented matrix as the solution of a system of equations. (Enter your answers as a comma-separated list. If the system is inconsistent, enter INCONSISTENT. If the system is dependent, enter DEPENDENT.) 1 0 8 0 1 2 Express the situation as a system of two equations in two variables. Be sure to state clearly the meaning of your x- and yvariables. Solve the system by row-reducing the corresponding augmented matrix. State your final answer in terms of the original question. For the final days before the election, the campaign manager has a total of $32,000 to spend on TV and radio campaign advertisements. Each TV ad costs $3000 and is seen by 10,000 voters, while each radio ad costs $500 and is heard by 2000 voters. Ignoring repeated exposures to the same voter, how many TV and radio ads will contact 116,000 voters using the allocated funds? x = TV ads y = radio ads Find the augmented matrix representing the system of equations. x1 + x2 + x3 = 3 x1 + 3x2 + x3 = 4 x1 + 2x2 + 5x3 = 5 Interpret the row-reduced matrix as the solution of a system of equations. (Enter your answers as a comma-separated list. If the system is inconsistent, answer INCONSISTENT. If the system is dependent, parametrize the solutions in terms of the parameter t.) 1 0 0 2 0 1 0 5 0 0 1 4 Use an appropriate row operation or sequence of row operations to find the equivalent row-reduced matrix. 1 0 1 5 0 1 0 8 0 0 1 2 Use the given matrix to find the expression. C= 5 5 3 1 6 5 9 7 2 ; 3C Use the given matrices to find the expression. A= 1 8 2 5 7 4 1 4 3 C= 2 4 8 1 1 1 8 7 6 ; A+C Find the matrix product. 4 2 1 3 1 1 3 2 4 Rewrite the system of linear equations as a matrix equation AX = B. x1 + 3x2 + 5x3 = 5 x1 + x2 + x3 = 2 6x1 + 6x2 + 4x3 = 6 Solve the linear programming problem by sketching the region and labeling the vertices, deciding whether a solution exists, and then finding it if it does exist. (If an answer does not exist, enter DNE.) Minimize C = 10x + 50y Subject to C = 10x + 50y Subject to Subject to 2x + 5y 20 x 0, y 0 C= Question 1 $840.00 Question 2 = 910+1300 = $ 2210 Question 3 a) = $22,868.21 Question 3 b) = $23,178.99 Question 4 = 29.75 periods Question 5 Rule of 72 yr = 8.00 Exact answer = 8.04 Question 6 = 14.93% Question 7 t = 26.88 periods Question 8 t = 28.04 periods Question 9 Accumulated annuity = $8,852.18 Question 10 Sinking value = $57.72 Question 11 Sinking fund period = 2.5 years Question 12 Joe = $874,564.94 Jill = $845,896.33 Question 13 2.42 years Question 14 Debt balance = $249,457 Question 15 Solution = (3,1) Question 16 (6,4) Question 17 35 $ 4000 investors 25 $ 8000 investors Question 18 a1,1 = 2 a3,2 = 5 Question 19 (12 37)( xy)=(139 ) Question 20 You can also mail on (onsongonyaundi@gmail.com) 1. Find the values of the specified elements. a1,1 = a3,2 = 2. Find the augmented matrix representing the system of equations. x + 3y = 9 2x + 7y = 13 3. Carry out the row operation on the matrix. R1R2 on ( 4 9| 29 3 2|28 ) 4. Carry out the row operation on the matrix. R1R2R1 on ( 2 4 | 60 5 3| 55 ) 5. Carry out the row operation on the matrix. 1R2R2 on ( 6 -3 | -49 0 -5| 10) 6. Interpret the augmented matrix as the solution of a system of equations. (Enter your answers as a comma-separated list. If the system is inconsistent, enter INCONSISTENT. If the system is dependent, enter DEPENDENT.) (1 0 | 8 0 1| -2 ) 7. Express the situation as a system of two equations in two variables. Be sure to state clearly the meaning of your x- and y- variables. Solve the system by row-reducing the corresponding augmented matrix. State your final answer in terms of the original question. For the final days before the election, the campaign manager has a total of $32,000 to spend on TV and radio campaign advertisements. Each TV ad costs $3000 and is seen by 10,000 voters, while each radio ad costs $500 and is heard by 2000 voters. Ignoring repeated exposures to the same voter, how many TV and radio ads will contact 116,000 voters using the allocated funds? x= TVads y = radio ads 8. Find the augmented matrix representing the system of equations. x1 +x2 +x3 =3 , x1 +3x2 +x3 =4, x1 +2x2 +5x3 = 5 Interpret the row-reduced matrix as the solution of a system of equations. (Enter your answers as a comma-separated list. If the system is inconsistent, answer INCONSISTENT. If the system is dependent, parametrize the solutions in terms of the parameter t.) 9. (100|2 0 1 0| 5 0 0 1| -4) 10. Use an appropriate row operation or sequence of row operations to find the equivalent rowreduced matrix. ( 1 0 1| 5 0 1 0|8 0 0 1| 2) 11. Use the given matrix to find the expression. C= ( 5 5| 3 1 6| 5 9 7| 2) ; 3C 12. Use the given matrices to find the expression. A= (1 8 | 2 5 7 |4 1 4| 3) C= (2 4 |8 1 1|1 8 7|6) ; A+C 13. Find the matrix product. ( 4 2|1 3 1|1) ( ) 14. Rewrite the system of linear equations as a matrix equation AX = B. x1 +3x2 +5x3 =5 x1 +x2 +x3 =2 6x1 +6x2 +4x3 = 6 15. Solve the linear programming problem by sketching the region and labeling the vertices, deciding whether a solution exists, and then finding it if it does exist. (If an answer does not exist, enter DNE.) Minimize C = 10x + 50ySubject to C = 10x + 50ySubject to Subject to 2x + 5y 20 x0, y0 C=

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