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  • You want to buy a $222,000 home.

  • You plan to pay 10% as a down payment

  • and take out a 30 year loan for the rest.

  • Part A, how much is the loan amount going to be?

  • Because you are putting 10% down,

  • the loan amount it going to be 90% of $222,000,

  • since 100% minus 10% is 90%.

  • So we need to find 90% of $222,000.

  • To find the percent of a number,

  • we convert the perfect to a decimal and multiply.

  • 90% of the decimal is 0.90 or just 0.9,

  • giving us 0.9 times 222,000.

  • And now let's go to the calculator.

  • 0.9 times 222,000 is 199,800

  • and therefore, the loan amount is $199,800.

  • If you were asked to find the down payment,

  • we would find 10% of 222,000,

  • which would be 0.1 times 222,000,

  • which would be 22,200.

  • So another way to find the loan amount

  • would be to take 222,000 and subtract 22,200.

  • And now for part B, what will you monthly payments be

  • if the interest rate is 6%?

  • To answer this questions we will use

  • the loan formula shown below,

  • where Po is the loan amount,

  • which we now know is $199,800.

  • Giving us 199,800 equals, on the right side,

  • PMT is the loan payment which we are solving for,

  • so we have PMT, then in the numerator we have

  • the payment times the quantity one minus

  • and in parenthesis, we have one plus r divided by n,

  • where r is the annual interest rate as a decimal

  • and n is the number of compounds per year.

  • Which if not specifically given,

  • we use number of payments per year.

  • So for part B, our 6%, which is a decimal, is 0.06.

  • This is divided by n,

  • because you're making monthly payments and there's 12.

  • All this has raised the power of negative n times t,

  • which is negative 12 times t

  • as the length of the loan in years

  • for 30 year loan and therefore, t is 30.

  • Close parenthesis, all this is divided by r divided by n,

  • which gives us 0.06, divided by 12.

  • And then to solve for PMT,

  • we will evaluate this quotient here

  • which will give us PMT times n value.

  • And then we can solve for PMT

  • by dividing both sides by that value.

  • So going to the calculator,

  • we will evaluate this quotient here

  • on the right side of the equation.

  • So we have open parenthesis,

  • one minus open parenthesis one plus 0.06

  • divided by 12, close parenthesis,

  • it says raise to the power of

  • negative 12 times 30 which is negative 360.

  • Right arrow to exit the exponent, close parenthesis

  • and then divide it by the parenthesis we have,

  • 0.06 divided by 12.

  • Which means on the right side of the equation,

  • we have PMT times approximately 166.7916144.

  • Let's go ahead and write this down.

  • The equation is now 199,800 equals PMT times,

  • again, 166.7916144.

  • And that'll solve for PMT the loan payment,

  • we divide both sides of the equation by 166.7916144.

  • Notice on the right side, this quotient is equal to one,

  • giving us PMT times one, of course, which is just PMT.

  • So the monthly payment is going to be this quotient here,

  • which we will round to the nearest cent.

  • So going back to the calculator,

  • we have 199,800 divided by 166.7916144, enter.

  • To the nearest cent, if the interest rate is 6%,

  • then the monthly payment will be $1,197.90.

  • And now for part C,

  • we're asked to determine the monthly payments

  • if the interest rate is 7% instead of 6%.

  • So to make this change,

  • we can go back up to this equation here

  • and simply change 0.06, which is 6% as a decimal to 0.07,

  • which is 7% as a decimal.

  • So again, we will now change 0.06 here and here to 0.07.

  • So we have 0.07 here and 0.07 here.

  • And now let's go back

  • and determine this quotient here again.

  • If we press second enter,

  • it brings up the previous entry which we can then edit.

  • So if you press second enter twice,

  • it brings us back up to this expression

  • where now we can just change 0.06 to 0.07

  • to save ourselves some time.

  • Press the left arrow

  • until we're over the six for 0.06 here,

  • change this to seven

  • and then change this 0.6 to 0.07 as well.

  • Then we press the right arrow until we're over the six

  • and change this to seven and then press enter.

  • And now this quotient is approximately 150.3075679

  • and therefore, the right side of the equation

  • can be written as PMT times this value here.

  • Let's go ahead and do that.

  • When the interest rate is 7%,

  • we have the equation 199,800

  • equals PMT times 150.3075679.

  • And that'll solve for PMT the monthly payment,

  • we divide both sides of the equation by 150.3075679.

  • Simplifying on the right, this quotient is one,

  • giving us PMT times one, which is PMT.

  • The monthly payment is equal to the quotient on the left,

  • which you will now evaluate on the calculator

  • and round to the nearest cent.

  • Now 199,800 divided by 150.3075679,

  • to the nearest cent, if the interest rate is 7%,

  • the monthly payment is now $1,329.27.

  • Looking at the monthly payments,

  • notice how the monthly payment goes up

  • by over $130 when the interest rate goes from 6% to 7%,

  • which is why the interest rate

  • of a mortgage loan is so important.

  • I hope you found this helpful.

You want to buy a $222,000 home.

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兩種不同利率下的按揭付款比較(計算公式 (Compare Mortgage Payments at Two Different Interest Rates (Formula))

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