Answer:
Fund X 311.87
Fund Y 172.41
Total at end of year two $559,46
Explanation:
We will solve this like a math exercise with an equation system:
[tex]X(1+0.08/4)^{10\times4} + Y(1+0.06/2)^{10\times2} = 1,000[/tex]
[tex]X(1+0.08/4)^{5\times4} = 2Y(1+0.06/2)^{5\times2}[/tex]
we can solve the factor and solve for each variable:
[tex]\left \{ {{2.20803966361485X + 1.80611123466941Y =1,000} \atop {1.48594739597835X =2Y\times1.34391637934412}} \right.[/tex]
On the second equation we clear for X
X = 1,808834394785938Y
Now we express this value on the first equation
2.20803966361485X + 1.80611123466941Y =1,000
2.20803966361485(1,808834394785938Y) + 1.80611123466941Y =1,000
And solve for Y
5.800Y = 1,000
Y = 172,413793103
And now we solve for X
X = 1,808834394785938 Y
X = 1,808834394785938 (172,413793103) = 311,867999
We can check if this is correct:
[tex]X(1+0.08/4)^{10\times4} + Y(1+0.06/2)^{10\times2} = 1,000[/tex]
[tex]311.87(1+0.08/4)^{10\times4} + 172.41(1+0.06/2)^{10\times2} = 1,000.01296786092[/tex]
We have 1 cent for rounding errors so we could say we are okay.
Now we can proceed to calculate the total at the end of year two
[tex]311.87(1+0.08/4)^{2\times4} + 172.41(1+0.06/2)^{2\times2} = Amount[/tex]
Amount = 365.41 + 194.05 = 559,46
