kofigc
Nov 25, 2010, 01:32 PM
Hi, I posted a thread a day or two back but still haven't managed to get any further with it :( to top it off I tried to move on to the next question and proceeded to get it and the next incorrect! HELLLP! Lol
Here are the questions I'm really struggling to cope with (disappointed as I thought I had this topic under wraps - apparently not!) Hoping that someone can offer me guidance on how I should tackle each of the questions... I've tried several methods of solving them and am still getting 0% :( I'll post what I have done so far for each of the questions so it may be easier to highlight where or what I am going/doing wrong.
Thank you in advance again to anyone who can help me on this, I really do appreciate it greatly.
Q1: A man deposits £1000 every half year into a pension fund earning 6% interest per annum, compunded half yearly. Deposits are made at the start of each half year. How much will the fund be worth at the end of 7.5 years after the initial deposit?
Q1 Working S7.5= 1000(1+6/200)^15 + 1000(1+6/200)^14 + 1000(1+6/200)^13 +... + 1000(1+6/200)^1
a=1.03, n=15, r=1.03
S15=1.03[(1-1.03^15)/(1-1.03)]
S15= 1000*1.03*18.6 = 19158
Q2: An investment account offers an interest rate of 8% per annum, compounded yearly. Assuming a single deposit of £39700 is placed in this investment account, how long would it take to amount to £68900 assuming that £100 is withdrawn at the end of the first two years and thereafter no further withdrawals are made?
Q2 Working
A1=39700*1.08-100= 42776
A2=42776*1.17-100=49947.92
Reinvest £49947.92 for t-2 years to get £68900.
68900=49947.9*1.08^t-2
log(68900/49947.92) = (t-2) log1.08
t-2=log(68900/49947.92)/log1.08 = 4.18
t= 6.18
Q3: An investment account offers an interest rate of 6% per annum compunded monthly. Assuming a single deposit of money is placed in this account, how much money must be invested now in order for the account to contain £45000 after 10 years?
Q3 Working: At=A0(1+r/100m)^mt
45000=Ao(1+6/1200)^1200
45000=Ao*1.005^1200
45000/1.005^1200=Ao
Ao=113.22
Here are the questions I'm really struggling to cope with (disappointed as I thought I had this topic under wraps - apparently not!) Hoping that someone can offer me guidance on how I should tackle each of the questions... I've tried several methods of solving them and am still getting 0% :( I'll post what I have done so far for each of the questions so it may be easier to highlight where or what I am going/doing wrong.
Thank you in advance again to anyone who can help me on this, I really do appreciate it greatly.
Q1: A man deposits £1000 every half year into a pension fund earning 6% interest per annum, compunded half yearly. Deposits are made at the start of each half year. How much will the fund be worth at the end of 7.5 years after the initial deposit?
Q1 Working S7.5= 1000(1+6/200)^15 + 1000(1+6/200)^14 + 1000(1+6/200)^13 +... + 1000(1+6/200)^1
a=1.03, n=15, r=1.03
S15=1.03[(1-1.03^15)/(1-1.03)]
S15= 1000*1.03*18.6 = 19158
Q2: An investment account offers an interest rate of 8% per annum, compounded yearly. Assuming a single deposit of £39700 is placed in this investment account, how long would it take to amount to £68900 assuming that £100 is withdrawn at the end of the first two years and thereafter no further withdrawals are made?
Q2 Working
A1=39700*1.08-100= 42776
A2=42776*1.17-100=49947.92
Reinvest £49947.92 for t-2 years to get £68900.
68900=49947.9*1.08^t-2
log(68900/49947.92) = (t-2) log1.08
t-2=log(68900/49947.92)/log1.08 = 4.18
t= 6.18
Q3: An investment account offers an interest rate of 6% per annum compunded monthly. Assuming a single deposit of money is placed in this account, how much money must be invested now in order for the account to contain £45000 after 10 years?
Q3 Working: At=A0(1+r/100m)^mt
45000=Ao(1+6/1200)^1200
45000=Ao*1.005^1200
45000/1.005^1200=Ao
Ao=113.22