Pretty much saving up money. if you can save up enough you can treat yourself later in life
Answer: heavy promotion and low (exclusive) availability
Explanation:
The wrong combination is high promotion and low availability, because when a product is highly promoted it would lead to high interest in that product from the consumers, this would lead to a high demand for that product from customers. And this high demand needs to be met with high supply, which is not the case here, therefore scarcity would set in.
Answer:
=$ 80, 200.00
Explanation:
selling price : $ 330,000.00
Commission 6 %:
Commissions paid = 6/100 x $ 330,000.00
=$19,800.00
Closing costs =: $ 5000.00
Mortgage paid : $ 225,000
Total payouts: $19,800 + $50,00+ $225,000
=$ 249, 800.00
Rusty Expects: $ 330,000.00- $ 249,800.00
=$ 80, 200.00
Answer:
c. Common Stock $50,000 and Paid-in Capital in Excess of Par Value $20,000.
Explanation:
The journal entry for issuance of the common stock for cash is shown below:
Cash A/c Dr $70,000
To Common stock $50,000 (5,000 shares × $10)
To Additional paid in capital A/c - Common stock A/c $20,000
(Being the common stock is issued for cash)
While recording this entry it increased the assets so the cash account is debited while at the same time it also increased the common stock for $50,000 and the additional paid in capital in excess of par value i.e $20,000 so both these account are credited
Answer:
The answer is option D
Explanation:
The bond can be issued at par, at a discount or at a premium depending on the coupon rate and the market interest. The price of the bond which pays semi annual coupon can be calculated using the formula of bond price. The formula to calculate the price of the bond is attached.
First we need to determine the semi annual coupon payment, periods and YTM.
Semi annual coupon payments = 2000000 * 0.1 * 6/12 = 100000
Semi annual periods = 5 * 2 = 10
Semi annual YTM = 0.08 * 6/12 = 0.04
Bond Price = 100000 * [(1 - (1+0.04)^-10) / 0.04] + 2000000 / (1+0.04)^10
Bond Price = $2162217.916
The price of the bond is thus $2162290 approx. The difference in answers is due to rounding off.
