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IRA accounts

Started by Silver R/T, January 26, 2007, 04:49:14 PM

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Silver R/T

Anyone here have an IRA account? How does it work? Im thinking about setting up one or two.
http://www.cardomain.com/id/mitmaks

1968 silver/black/red striped R/T
My Charger is hybrid, it runs on gas and on tears of ricers
2001 Ram 2500 CTD
1993 Mazda MX-3 GS SE
1995 Ford Cobra SVT#2722

Old Moparz

You can try it this way like a coworker does......

e14 = Effective annual rate = EXP(D13*LN(1+(D12/D13)))-1
e15 = Interest rate per payment = (EXP(LN(E14+1)/(D10*D11))-1)*D10*D11

e17 = Payments = APMT(E9,E15/D11,D10*D11) ( both these functions are
= PMT (E9,E15/D11,D10*D11) ( identical,diff spreadsheet)
APMT( principal amount,interest rate per period,# periods )
( this is a standard function on any true commercial spreadsheet)

OR use the following if done using a calculator = Payments = P*I/[1-(I+1)^-T] = E9*(E15/D11)/(1-((E15/D11) +1)**(-1*D10*D11))

Total interest cost = E17*D10*D11-E9

Use these formulas if you wish to generate an amortization table -- always add up to 'Payments (e17)'
     Interest per payment  = current balance * ( E15 / D11 )
     Principal per payment = current balance - Interest per payment new current balance   = current balance - Principal per payment - (extra payment)

keep repeating until 'new current balance' = 0 Derivation of Compound Interest Rate Formula

Suppose you deposited a fixed payment into an interest bearing account at regular intervals, say monthly, at the end of each month. How much money would there be in the account at the end of the nth month (at which point you've made n payments)?

Let i be the monthly interest rate as a fraction of principle.
Let x be the amount deposited each month.
Let n be the total number of months.
Let p[k] be the principle after k months.

So the recursive formula is:

This yields the summation:

The way to solve this is to multiply through by (1 + i) and subtract the original equation from the resulting equation. Observe that all terms in the summation cancel except the last term of the multiplied equation and the first term of the original equation:

or

Now suppose you borrow p at constant interest rate i. You make monthly payments of x. It turns out that this problem is identical to taking out a balloon loan of p (that is it's all due at the end of some term) and putting payments of x into a savings account. At the end of the term you use the principle in the savings account to pay off the balance of the loan. The loan and the savings account, of course, must be at the same interest rate. So what we want to know is: what monthly payment is needed so that the balance of the savings account will be identical to the balance of the balloon loan after n payments?

The formula for the principal of the balloon loan at the end of the nth month is:

So we set this expression equal to the expression for the the savings account, and we get:

or solving for x:

If it's large enough (say greater than 5), here is an approximation for determining n from x, p, and i:

The above approximation is based upon the following approximation:

Which is within 2 For example, a $100000 loan at 1% monthly, paying $1028.61 per month should be paid in 360 months. The approximation yields 358.9 payments.

If this were your 30 year mortgage and you were paying $1028.61 per month and you wanted to see the effect of paying $1050 per month, the approximation tells you that it would be paid off in 303.5 months (25 years and 3.5 months). If you stick 304 months into the equation for x, you get $1051.04, so it is fairly close. This approximation does not work, though, for very small interest rates or for a small number of payments. The rule is to get a rough idea first of what  is. If that is greater than 5, the approximation works pretty well. In the examples given,  is about 36.

Finding i given n, x, and p is not as easy. If i is less than 5% per payment period, the following equation approximately holds for i:

There is no direct solution to this, but you can do it by Newton-Raphson approximation. Begin with a guess, i[0]. Then apply:

You must start with i too big, because the equation for i has a solution at i=0, and that's not the one you want to end up with.

Example: Let the loan be for  ,  per week for 5 years (n=260). Let i[0] = 20% per annum or 0.3846% per week. Since i must be a fraction rather than a percent, i[0] = 0.003846. Then, applying eq 11:

The series is clearly beginning to converge here.

To get i[5] as an annual percentage rate, multiply by 52 weeks in a year and then by 100%, so i[5] = 10.997% per annum. Substituting i[5] back into eq 7, we get  , so it works pretty well.

Or you can try it an easier way.....
               Bob               



              Going Nowhere In A Hurry

ChargerSG

I only know one Ira and thats no bank :-\
Looking for 383 Magnum #0B196875 and 0B115166

Ponch ®

Are you trying to funnel funds to the IRA?
"I spent most of my money on cars, birds, and booze. The rest I squandered." - George Best

Chrysler Performance West

Silver R/T

no, trying to learn how to make a buck or two
http://www.cardomain.com/id/mitmaks

1968 silver/black/red striped R/T
My Charger is hybrid, it runs on gas and on tears of ricers
2001 Ram 2500 CTD
1993 Mazda MX-3 GS SE
1995 Ford Cobra SVT#2722

Ponch ®

Quote from: Silver R/T on January 26, 2007, 06:08:54 PM
no, trying to learn how to make a buck or two

well, you take buck, and you introduce it to a hind, put some Barry White or Maxwell on the CD player, and let nature take its course...



"I spent most of my money on cars, birds, and booze. The rest I squandered." - George Best

Chrysler Performance West

MichaelRW

Just google it. Here's one of many links explaining what they are and how they work.

http://personal.fidelity.com/products/retirement/getstart/what_is.shtml.cvsr
A Fact of Life: After Monday and Tuesday even the calendar says WTF.........

bull

The Irish Republican Army?

ChargerSG

Thats the ones i was thinking of...
Looking for 383 Magnum #0B196875 and 0B115166

Daytona R/T SE

Quote from: Silver R/T on January 26, 2007, 06:08:54 PM
no, trying to learn how to make a buck or two


Put on your little white tennis skirt, smear on the tangerine lip gloss and start hangin' out in the parking lot of the local truckstop. ;)