Answer:
$14890 is the correct option because if any parent adopts a child in 2022 there is a federal adoption tax credit of up to $14,890 per child.
<h3>Claiming the Federal Adoption Tax Credit for 2022</h3>
A federal adoption tax credit of up to $14,890 per child is available for adoptions that are finalized in 2022. The adoption tax credit for 2022 is not transferable.
Parents who wish to receive the credit must:
have adopted a child who is not a stepchild - The child must be less than 18 or incapable of caring for themselves due to physical or mental impairment.
abide by the income restrictions - How much of the credit parents can claim depends on their income. Families earning less than $214,520 in modified adjusted gross income in 2022 are eligible for the full credit. People who earn between $223,410 and $263,410 can receive a partial credit; people who earn more than $263,410 cannot.
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Those who try to benefit from a carry trade are hoping to borrow money at a low interest rate so that they can invest in something that will provide a higher return. People commonly do this between different foreign exchange markets to make the most on their return from investing in different country currencies.
Answer:
If you considered that outstanding shares are equal that total shares, then: market capitalization is $1.085 billions; market value added is $477.5 millions and the market-ti-book ratio is 1.78.
Explanation:
To get these numbers we calculate as follow: market capitalization = number of shares multiply by the price per share (75$ x 14.5 million); marked value added = market capitalization - (total assets - liabilities) [1.085 Bn - (1 Bn - 390 m)] ; and market-to-book ratio = market capitalization / book value (1.085bn/610m)
Answer:
12.00%
Explanation:
As per the given question the solution of standard deviation of a portfolio is provided below:-
Standard deviation of a portfolio = √(Standard deviation of Product 1)^2 × (Weight 1)^2 + Standard deviation of Product 2)^2 × (Weight 2)^2 + 2 × Standard deviation of product 1 × Standard deviation of product 2 × Weight 1 × Weight 2 × Correlation
= √(0.165^2 × 0.6^2) + (0.068^2 × 0.4^2) + (2 × 0.6 × 0.4 × 0.165 × 0.068 × 0.7)
= √0.009801 + 0.0007398 + 0.00376992
= √0.01431076
= 0.119628592
or
= 12.00%
So, we have calculated the standard deviation of a portfolio by using the above formula.
