Answer:
It is False
The law of one price (LOOP) states that in the absence of trade frictions (such as transport costs and tariffs), and under conditions of free competition and price flexibility (where no individual sellers or buyers have power to manipulate prices and prices can freely adjust), identical goods sold in different.
Answer:
a.Expenditure on new plants, equipment, and residential construction, plus changes in business inventories.
Explanation:
Gross investment is the punt that is invested in a business without considering depreciation cost. When depreciation is removed we get net investment.
Investment can be in fixed assets (such as new plants, equipment, and residential construction) or on variable assets (such as inventory or working capital).
Gross income is the total amount invested in fixed and variable aspects of the business.
Answer:
<em>Quasi Contract</em>
Explanation:
A quasi contract <em>is a two-party retroactive agreement that has no prior commitments to each other.</em> A judge creates it to correct a situation where one party at the expense of the other obtains something.
The agreement is intended to prevent one party from taking undue advantage of the situation at the expense of the other party.
Answer:
$ 7,322
Explanation:
$2300 per year is an annuity investment. The formula for future annuity value is as below
FV = A × (1 + r)^n - 1 / r
Where A = amount invested periodically
r = interest rate, 6% or 0.06
n = 3 years
Fv = $2300 x{ (1 +0.6)^3 -1} /0.06
Fv = $2300 x (1.191016-1) /0.06
Fv = $2300 x ( 0.191016/0.06)
Fv = $2300 x 3.1836
Fv= $ 7,322.28
Fv= $ 7,322
Answer:
Difference = $9773.02
Explanation:
An annuity is a series of cash flows or payments that are of constant amount, occur after equal intervals of time and are for a limited and defined period of time. Thus, the winnings from lottery are an annuity as they pay a fixed amount $11300 every year for 21 years.
The annuity can be of two types namely ordinary annuity and annuity due. In ordinary annuity the cash flows occur at the end of the period and in annuity due, the cash flows occur at the beginning of the period. When we calculate the present value of these cash flows, it is understood that the present value of annuity due is greater than the present value of ordinary annuity.
The formulas for the present value of both ordinary annuity and annuity due are attached.
In the formula, R is the annuity payment or cash flow and i is the relevant interest rate and n is the number of years or periods.
PV of annuity ordinary = 11300 * [ (1 - (1+0.1)^-21) / 0.1 ]
PV of ordinary annuity = $97730.24548 rounded off to $97730.25
PV of annuity due = 11300 * [ (1 - (1+0.1)^-21) / 0.1 ] * (1+0.1)
PV of annuity due = $107503.27
Difference = 107503.27 - 97730.25
Difference = $9773.02
