# Problem Statement for Auto Loan.. Solution?

I was just kind of learning Binary Search Applications and its usage and in daily life!!

I came accross a problem from topcoder.com.. Below is the problem description.. Would like to start this thread, so that I could learn more about binary Search logic and its application in various... http://www.topcoder.com/stat?c=problem_statement&pm=3970&rd=7993

``````Problem Statement for AutoLoan Problem Statement
``````

Auto dealerships frequently advertise tempting loan offers in order to make it easier for people to afford the "car of their dreams". A typical sales tactic is to show you various cars, and then talk in terms of what your monthly payment would be, to say nothing of how much you are actually paying for the car, how much interest you pay, or how long you have to make payments.

A typical auto loan is calculated using a fixed interest rate, and is set up so that you make the same monthly payment for a set period of time in order to fully pay off the balance. The balance of your loan starts out as the sticker price of the car. Each month, the monthly interest is added to your balance, and the amount of your payment is subtracted from your balance. (The payment is subtracted after the interest is added.) The monthly interest rate is 1/12 of the yearly interest rate. Thus, if your annual percentage rate is 12%, then 1% of the remaining balance would be charged as interest each month.

You have been checking out some of the cars at your local dealership, TopAuto. An excited salesman has just approached you, shouting about how you can have the car you are looking at for a payment of only monthlyPayment for only loanTerm months! You are to return a double indicating the annual percentage rate of the loan, assuming that the initial balance of the loan is price. Definition Class: AutoLoan Method: interestRate Parameters: double, double, int Returns: double Method signature: double interestRate(double price, double monthlyPayment, int loanTerm) (be sure your method is public) Notes - Because of the way interest is compounded monthly, the actual interest accrued over the course of a year is not necessarily the same as (balance * yearly interest rate). In fact, it's usually more. - In a real situation, information like this would typically need to be disclosed, but since you aren't at a point of signing any paperwork, the salesman has no legal obligation to tell you anything. - The return value must be within 1e-9 absolute or relative error of the actual result. Constraints - price will be between 1 and 1000000, inclusive. - monthlyPayment will be between 0 and price / 2, inclusive. - loanTerm will be between 1 and 600, inclusive. - The resulting interest rate will be between 0 and 100, inclusive.
Examples 0)

6800

100

68

Returns: 1.3322616182218813E-13

Noting that 68 payments of 100 equals the total price of 6800, so there is no interest. 1)

2000

510

4

Returns: 9.56205462458368

Here, we do pay a little interest. At 9.562% annual interest, that means each month we pay 0.7968% of the balance in interest. Our payment schedule looks like this:

Month | + Interest | - Payment | =

## Balance

``````  |            |           |  2000.00    1  |     15.94  |   510.00  |  1505.94    2  |     12.00  |
``````

510.00 | 1007.94 3 | 8.03 | 510.00 | 505.97 4 |
4.03 | 510.00 | 0.00

2)

15000

364

48

Returns: 7.687856394581649

This is similar to what purchasing a new car with no money down might look like, if you make payments for 4 years.

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If you really want to do this with binary search, you could write a function

``````double BalanceRemaining(double start, double payment, double interestRate, int months)
``````

And implement it as a for loop:

``````for number of months,
subtract payment
return balance
``````

Then you could pick a minimum and maximum interest rate, use a binary search on interest rate plugged into BalanceRemaining to find the interest rate at which BalanceRemaining returns 0.

But this is really the wrong way to solve the problem. There's a closed form solution using logarithms. Google "time value of money," "mortgage calculations" or "annuity" to figure out how to do that calculation. You have to be a little careful for off-by-one errors, but other than that it's entirely straightforward.

-
``````class AutoLoan
{
public static void Main(string[] args)
{
}

public static double interestRate(double price, double monthlyPayment, int loanTerm)
{
Func<double, double> curriedCalculateTotalPaid = rate => CalculateTotalPaid(price, monthlyPayment, rate, loanTerm);
return BinarySearchLoop(0, 100, curriedCalculateTotalPaid, 0.0, 0.000000001);
}

private static double CalculateTotalPaid(double principle, double monthlyPayment, double rate, int months)
{
for (int i = 0; i < months; i++)
{
principle += principle * (rate / 1200);
principle -= monthlyPayment;
}
return principle;
}

private static double BinarySearchLoop(double min, double max, Func<double, double> funcToApply, double goal, double error)
{
double rate;
double result;
do
{
rate = (min + max) / 2;
result = funcToApply.Invoke(rate);
if (result > goal) //if there is principle left, the interest rate was too high
{
max = rate;
}
else
{
min = rate;
}
}
while (result != goal && (Math.Abs(max - min) > error));
return rate;
}
}
``````

CalculateTotalPaid is sort of a bad method name, but you should get the picture.

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