Answer:
Step-by-step explanation:
We will make a table with the values for both a 6% account and a 9% account.
The formula for this problem is Prt = I, where P is the amount invested in each account, r is the interest rate each carries in decimal form, t is the time in years, and I is the interest earned from the multiplication of the 3 previous values. We don't know how much is invested in either account, but we do know that no matter how much is invested in the 6% account, there is 6 times that in the 9% account. We know that the 6% account has a decimal rate of .06 and that the 9% account has a decimal rate of .09. "Annual" means 1 year, so the time is 1 year. Filling in the table, then:
P * r * t = I
Acct 6% x .06 1
Acct 9% 6x .09 1
What we do with those number is multiply them straight across each row to get the amount of interest earned from each:
P * r * t = I
Acct 6% x * .06 * 1 = .06x
Acct 9% 6x * .09 * 1 = .54x
The amount of Interest for both ADDS UP to 800; therefore:
.06x + .54x = 800 and
.6x = 800 so
x = 1333.33
That's how much was invested in the account that earned 6% interest annually.
