I think it’s A sorry if wrong
Answer:
Increase the aggregate demand. This means, that the total demand for goods and services within a particular market will increase
Explanation:
The future expectations of an improving economy increase the aggregate demand. This means, that the total demand for goods and services within a particular market will increase as there is more trust in the market.
The rise in the income is another important factor for the aggregate demand to increase. With improving expectations the consumers will think that they income will improve and therefore their consumption levels.
Bonds payable that are <u>long-term obligations</u> are typically recorded on the balance sheet.
<h3><u>How do long-term liabilities work?</u></h3>
Long-term liabilities are debts owed by a business that won't be paid off for at least a year. To give a clearer picture of a company's present liquidity and its capacity to meet its obligations as they come due, the current part of long-term debt is broken out separately from other debt.
Long-term liabilities are also referred to as noncurrent liabilities or long-term debt. The balance sheet's part that may include debentures, loans, deferred tax liabilities, and pension obligations is where long-term liabilities are stated following more immediate liabilities.
Liabilities that are greater than one year in duration or that are not due within the next 12 months are referred to as long-term liabilities. The time it takes a business to convert its inventory into cash is known as its operational cycle.
Learn more about long-term liabilities with the help of the given link:
brainly.com/question/17283456
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Answer:
Price of the bond is $1,215.57
Explanation:
Price of the bond is actually the present value of all cash flows of the bond. Price of the bond is calculated by following formula:
Price of the Bond = C x [ ( 1 - ( 1 + r )^-n ) / r ] + [ F / ( 1 + r )^n ]
Price of the Bond = $110 x [ ( 1 - ( 1 + 7% )^-7 ) / 7% ] + [ $1,000 / ( 1 + 7% )^7 ]
Price of the Bond = $592.82 + $622.75
Price of the Bond = $1,215.57
