The ABC's dividend yield when the ABC reports dividends per share of $1.40 and net income for the year of $140,000. The current stock price is $14.00 is 10%.
<h3>What is yield?</h3>
The yield on a security is defined as the measurement of the ex-ante instrument to a safety holder in financing.
It is a cardinal part of the return on an investment, with some other being the change in the security's market price.
The formula of calculating the yield is:
According to the given information,
Dividend Per Share= $1.40,
Net Income= $1,40,000
Current Price= $14
Now, apply the formula in the given formula,
Therefore, ABC's dividend yield is 10%.
Learn more about yield, refer to:
brainly.com/question/2506978
#SPJ1
Answer:
First and foremost, to get any job, I would have to be sincere, transparent, honest, look in the eye, have a firm handshake, be assertive in my actions and dialogue. For getting that particular project, I would show my portfolio of prior jobs, showing the quality and identity of my work. I could give references to past employees and, if I was a freelancer at some point, could describe how I got those jobs, showing how good my professional network could be. I could as well, given this time and age, show my social media and tell about my newest courses, showing that I’m on par with the latest on the graphic design industry. Lastly, dressing properly, being kind and solicit can go a long way in getting a job.
Can totally vary. Normally, it can create 1,000 dollars up to 2,000 dollars if it's a good investment.
Answer:
The hotel should charge $201 per day in order to maximize profit
Explanation:
According to the given data we have the following:
The number of occupied rooms is 300-x, and x vacant rooms.
Hence, The revenue R(x) = (300-x) * ($80 + x), the number of occupiedrooms times the charge per room.
The cost C(x) = (300-x) * $22.
Therefore, The profit P(x) = R(x)-C(x) = (300-x) (58 + x) = 17400 + 242 x -x^2.
P'(x) = 242 - 2x.
Critical point: x= 121.
So Charge = $80 + x = $80 + $121 = $201
The hotel should charge $201 per day in order to maximize profit