A buyer of a manufactured good not only obtains the good
itself, amenity, or awareness, but also receives good after-sales services that
aid in handling and increasing products efficiently. Providing this kind of
services are important to the capability of the business to uphold fruitful
relations as well as marketing mixes by creating continuous growth in products
and over market research. Providing excellence after-sale deal encourages the
goodwill of the business. This competence lets customers not to use money for maintenances
for 1 or 2 years of warranty period.
Answer:
$50,500
Explanation:
Calculation for by how much will Whispering Winds Corp. increase its van account
Using this formula
Increase in Van account =List price- Cash discount + Sales tax paid
Let plug in the formula
Increase in Van account=$52,000-$4,200+2,700
Increase in Van account=$50,500
Therefore by how much will Whispering Winds Corp. increase its van account will be $50,500
The education or educational programs which helps us to get the required practical and theoretical knowledge is called professional education. If we are provided with professional education it helps us to improve the lifestyle of people. We get job according to our knowledge. Which means if we have got professional education it helps us to get better job which provides us with good amount of money. And if we provided with better money our standard of living becomes good.
$180
if 1/6=30, then we have to figure out 6/6. 1x6=6 so multiply 30 times 6. 180
Answer:
Monthly payment is $840.12
Explanation:
we are given: $70000 which is the present value of the loan Pv
12% compounded monthly where the interest rate is adjusted to monthly where i = 12%/12
the period in which the loan will be repaid in 15years which contain 15x12 = 180 monthly payments which is n
we want to solve for C the monthly loan repayments on the formula for present value as we are looking for future periodic payments.
Pv = C[((1- (1+i)^-n)/i] thereafter we substitute the above mentioned values and soolve for C.
$70000= C[((1-(1+(12%/12))^-180))/(12%/12)] then compute the part that multiplies C in brackets and divide by it both sides.
$70000/83.32166399 = C then you get the monthly loan repayments
C = $840.12 which is the monthly repayments of the $70000 loan.
