Answer:
Step-by-step explanation:
The answer to this problem can be found by writing an equation for the total interest in terms of the amounts invested at each rate.
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Let x represent the amount invested at 9% (the higher rate). Then (11000-x) is the amount invested at 3%, and the total interest earned is ...
0.09x +0.03(11000 -x) = 750
0.06x = 420 . . . . . . . subtract 330 and simplify
x = 7000 . . . . . . . divide by 0.06 . . . amount invested at 9%
11000 -7000 = 4000 . . . amount invested at 3%
Larry invested $4000 at 3%, and $7000 at 9%.
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Additional comment
In "mixture" problems of this type, it generally works well to let the variable represent the amount of the highest-value contributor. That way, the equations end up with positive coefficients, tending to reduce errors.
