In presidential elections, voters often find that they do not agree with any single candidate in all issues that matter to them this is known as limited and bundled choice problem.
Option d
<u>Explanation:</u>
In presidential elections, the voter has to select the candidate who is going to have the power of selecting the public services and goods that has to be financed by the tax money given by the voters.
The limited and bundled choice issue reduces the economic efficiency as a politician selects the programs with either positive or negative net benefits. The choices are bundled in that the limited set of candidates would govern over a multiple issues, and the preferences of the voters may not be perfectly aligned with any candidate.
Answer:
It is increases by 0.155 times
Explanation:
As we know that
Current ratio = Current assets ÷ Current liabilities
where,
Current assets = Cash + account receivable + inventory
So in year 1, the current ratio is
= ($7,000 + $18,000 + $34,000) ÷ ($17,000)
= ($55,000) ÷ ($17,000)
= 3.47 times
And, in year 2 , the current ratio is
= ($4,000 + $14,000 + $40,000) ÷ ($16,000)
= ($58,000) ÷ ($16,000)
= 3.625 times
Therefore, it is increases by 0.155 times
Answer:
$28,533.5
Explanation:
Principal value (PV) = $275,000
Time = 20 years
Rate = 8.25%
Present Value = P ((1-(1+R)^-n) / r)
275,000 = P ((1- (1 + 0.0825)^-20) /.0825)
275,000 x .0825 = P (1-(1/1.0825)^20)
22687.5 = P ((1.0825^20 - 1) / (1.0825 ^20))
22687.50 = P (4.8816 - 1 / 4.8816)
22687.5 = P (3.886 / 4.8816)
22687.5 = p(0.7951)
P = 22687.5 / 0.7951
P = $28533.5
A. right to engage in polygamy.
i hope this helps
Answer:
the income is $1,330
Explanation:
The computation of the income is shown below;
Given that
U(x, y) = min{x, y2}
Price of x is $25
ANd, the prcie of Y is $15
So,
25X + 15Y = M
if Y = 7,
So,
At eqm, X = Y^2 = 49
Then ,
M = 25 × 49 + 15 × 7
= 1225 + 105
= 1330
Hence, the income is $1,330
The same should be relevant and considered too