Answer:
You should invest $820 in account A and $940 in account B
Step-by-step explanation:
* Lets use the system of linear equations to solve the problem
- Simple Interest Equation I = Prt , Where:
# P = Invested Amount
# I = Interest Amount
# r = Rate of Interest per year in decimal; r = R/100
# t = Time Period involved in months or years
* Lets solve the problem
- The total money invested is $1760
- Account A pays 7β% annual interest
- Account B pays 4β% annual interest
- Let A represent the amount of money invested in the account A
- Let B represent the amount of money invested in the account B
- You would like to earn $ 95 at the end of one year
β΄ The interest from both accounts at the end of one year is $95
- Lets write the equations
# Account A :
β΅ Account A has $A invested
β΄ P = $A
β΅ Account A pays 7β% annual interest
β΄ r = 7/100 = 0.07
β΅ t = 1 year
β΅ I = Prt
β΄ I = A(0.07)(1) = 0.07A
# Account B :
β΅ Account B has $B invested
β΄ P = $B
β΅ Account A pays 4β% annual interest
β΄ r = 4/100 = 0.04
β΅ t = 1 year
β΅ I = Prt
β΄ I = B(0.04)(1) = 0.04B
- The total amount of interest from both accounts at the end of one
Β year is $95
β΄ I from A + I from B = 95
β΄ 0.07A + 0.04B = 95 β multiply both sides by 100
β΄ 7A + 4B = 9500 β (1)
- The total money to invest in both accounts is $1760
β΅ Account A has $A invested
β΅ Account B has $B invested
β΄ A + B = 1760 β (2)
* Lets solve the system of equations to find the amount of money
Β invested in each account
- Multiply equation (2) by -4 to eliminate B
β΅ A + B = 1760 β Γ -4
β΄ -4A - 4B = -7040 β (3)
- Add equation (1) and (3)
β΅ 7A + 4B = 9500 β (1)
β΅ -4A - 4B = -7040 β (3)
β΄ 7A - 4A = 9500 - 7040
β΄ 3A = 2460 β divide both side by 3
β΄ A = 820
- Substitute the value of A in equation (1) or (2)
β΅ A + B = 1760 β (2)
β΄ 820 + B = 1760 β subtract 820 from both sides
β΄ B = 940
- From all above
* You should invest $820 in account A and $940 in account B
