Answer:
[tex]P_2 = \$6,000\\P_1 = \$14,000[/tex]
Step-by-step explanation:
The formula of simple interest is:
[tex]I = P_0rt[/tex]
Where I is the interest earned after t years
r is the interest rate
[tex]P_0[/tex] is the initial amount
We know that the investment was $20,000 in two accounts
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For the first account r = 0.07 per year.
Then the formula is:
[tex]I_1 = P_1r_1t[/tex]
Where
[tex]P_1[/tex] is the initial amount in account 1 at a rate [tex]r_1[/tex] during t = 1 year
[tex]I_1 = P_1(0.07)(1)\\\\I_1 = 0.07P_1[/tex]
For the second account r = 0.05 per year.
Then the formula is:
[tex]I_2 = P_2r_2t[/tex]
Where
[tex]P_2[/tex] is the initial amount in account 2 at a rate [tex]r_2[/tex] during t = 1 year
Then
[tex]I_2 = P_2(0.05)(1)\\\\I_2 = 0.05P_2[/tex]
We know that the final profit was I $1,280.
So
[tex]I = I_1 + I_2=1,280[/tex]
Substituting the values [tex]I_1[/tex], [tex]I_2[/tex] and I we have:
[tex]1,280 = 0.07P_1 + 0.05P_2[/tex]
As the total amount that was invested was $20,000 then
[tex]P_0 = P_1 + P_2 = 20,000[/tex]
Then we multiply the second equation by -0.07 and add it to the first equation:
[tex]0.07P_1 + 0.05P_2 = 1.280\\.\ \ \ \ \ \ \ \ +\\-0.07P_1 -0.07P_2 = -1400\\-------------[/tex]
[tex]-0.02P_2 = -120\\\\P_2 = 6,000[/tex]
Then [tex]P_1 = 14,000[/tex]
