Answer:
The total worth of the investment after 6 months is T = $ 1004004
The geometric mean of the above monthly returns is [tex]\= G = 0.001[/tex]
Step-by-step explanation:
From the question we are told that
The growth for each month are
R1 = -0.4, R2= 0.67, R3 = 1.0, R4 = -0.5, R5 = 0.2, R6 = -0.165
The amount invested is [tex]A = \$ 1,000,000[/tex]
The number period of the investment is 6 months
Generally the worth of the investment after each month is
[tex]G_i = G_p * (1 + R_i)[/tex]
Here [tex]G_p[/tex] is the worth of the investment the previous year
[tex]R_i[/tex] is the growth for that month
So considering the first month
[tex]G_1 = G_p (1 + R_1)[/tex]
Here [tex]G_p = A[/tex]
So
[tex]G_1 = 1000000 (1 -0.4)[/tex]
[tex]G_1 = 600000[/tex]
Considering the second month
Here [tex]G_p = 600000[/tex]
So
[tex]G_2 = 600000 (1 + 0.67)[/tex]
=> [tex]G_2 = 1002000[/tex]
Considering the third month
Here [tex]G_p = 1002000 [/tex]
So
[tex]G_3 = 1002000 (1 + 1)[/tex]
[tex]G_3 = 2004000 [/tex]
Considering the fourth month
Here [tex]G_p = 2004000 [/tex]
So
[tex]G_4= 2004000 (1 + -0.5)[/tex]
[tex]G_4= 1002000 [/tex]
Considering the fifth month
Here [tex]G_p = 1002000 [/tex]
So
[tex]G_5= 1002000 (1 + 0.2)[/tex]
[tex]G_5= 1202400 [/tex]
Considering the six month
Here [tex]G_p = 1202400 [/tex]
So
[tex]G_6= 1202400 (1 -0.165)[/tex]
[tex]G_6= 1004004 [/tex]
Generally the total worth of the investment after 6 months is T = $ 1004004
Generally the geometric mean of the monthly returns is
[tex]\= G = \sqrt[n]{ [(1 + R_1 ) * \cdots (1 + R_n)} ]-1[/tex]
Here n represents the number of months which has a value n = 6
So
[tex]\= G = \sqrt[6]{[(1+ (-0.4 )) * (1 + 0.67) * \cdots * (1 + (-0.165))]} - 1[/tex]
[tex]\= G = 0.001[/tex]
