The most logical answer to me would be A, however I recommend you don’t go with my answer JUST YET because this is an educational guess. Take time to think about my answer. Sorry if it’s wrong
Answer:
Income elasticity of demand for snarfblatts is 1.
Explanation:
the consumer spends 20% of the income on snarfblatts, thus the percentage change in consumption of the snaerblatts is equal to the percentage in income, that is:
Elasticity = % change in demand of snarfblatts/% change in income
= 1
Therefore, Income elasticity of demand for snarfblatts is 1.
Answer:
The expected return that IMI can provide subject to Johnson's risk constraint is 8.5%
Explanation:
Capital Market Line (CML)
Expected return on the market portfolio, E(
) = 12 %
Standard deviation on the market portfolio, σ
= 20%
Risk-free rate, 
= 5%
E(
) = + [ E(
) - ] × ( σ
÷ σ)
= 0.05 + [ 0.12 - 0.05] × (0.10 ÷ 0.20)
= 8.5%
Answer:
Under the WTO agreement:_________
b. a dispute resolution mechanism allows countries to bring grievances to the WTO against countries that levy inappropriate trade discrimination measures.
Explanation:
The WTO (World Trade Organization) Agreement is an international legal framework covering about 63 agreements affecting trade in goods, services, intellectual property, standards, investment, and other issues with some impacts on world trade. The legal framework is a system of rules that supports open, fair, and undistorted trade competition, allowing tariffs and some protections.
Answer:
$50 billion
Explanation:
To find the change in aggregate expenditures, we need to find the change in consumption. For this, we will use the marginal propensity to consume formula:
MPC = ΔC/ΔY
Where:
MPC = Marginal propensity to consume
ΔC = Change in consumption
ΔY = Change in output (GDP)
We know that out MPC is 0.5, and our ΔY is $billion. We plug these amounts into the formula:
0.5 = ΔC / 100 billion
And we rearrange the equation to solve for ΔC
ΔC = $ 100 billion x 0.5
ΔC = $50 billion
So the change in consumption is $50 billion, which is also the change in aggregate expenditure.
