Respuesta :
Answer:
more will you have to save each month 981.9
Explanation:
given data
time = 30 year = 30 × 12 = 360 months
expected earn = 8.5 % = [tex]\frac{0.085}{12}[/tex] = 0.0070833
time = 10 year = 10 × 12 = 120 months
future value = millionaire = [tex]10^{6}[/tex]
solution
we consider here saving end of this month = x
and saving end of 10 year = y
now we solve for x
[tex]10^{6}[/tex] = x × [tex]\frac{1+ r^{t}}{r} - 1[/tex]
[tex]10^{6}[/tex] = x × [tex]\frac{1+ 0.0070833^{360}}{0.0070833} - 1[/tex]
x = 605.8
and
[tex]10^{6}[/tex] = y × [tex]\frac{1+ r^{t}}{r} - 1[/tex]
[tex]10^{6}[/tex] = y × [tex]\frac{1+ 0.0070833^{120}}{0.0070833} - 1[/tex]
y = 1594.9
so here we require more amount to save is y - x in end of each month = 1594.9 - 605.8 = 981.9
Answer:
558.11/month; 1301.78/month. You will have to save 743.67 more if you wait 10 years before saving.
Explanation:
In the annuity problem above, the future value is given as 1,000,000 and we need to estimate the amount to be saved today (C). Thus:
FVA = 1000000; C = unknown; r = 8.5%/12 = 0.7083%; t = 30*12 = 360.
[tex]FVA = C[\frac{(1+r)^{t}}{r}][/tex]
C = 1000000/1791.753 = 558.11/month
To wait for 10 years before saving means that t = 30-10 = 20 years = 20*12 = 240. Similarly,
FVA = 1000000; C = unknown; r = 8.5%/12 = 0.7083%; t = 20*12 = 240.
C = 1000000/768.18 = 1301.78/month
You will have to save(1301.78 - 558.11) 743.67 more if you wait 10 years before saving.
