Total = Principal * (1 + rate)^years
Total = 50,000 * (1.034)^10
<span><span><span>Total = 50,000 * 1.3970288911
</span>
</span>
</span>
Total =
<span>
<span>
<span>
69,851.44</span></span></span>
We are to solve for the price per unit. Let "x" be the price per unit.
The given values are the following:
Variable Cost = 1250,000 *x
Fixed Cost = $780,000
Net Profit = $650,000
Variable cost per unit = $19.85
The solution is shown below:
$650,000 = 1,250,000*x - $780,000 - $1,250,000*$19.85
x = $26, 242, 500 / 1,250,000 units
x = $20.994
The price per unit is $20.99 and the answer is letter "D".
Answer:
A) (1/ cos(x) − 1) sin(x)
Step-by-step explanation:
Given the function
f(x) = tan(x) - sin(x)
According to the trigonometry identity, tan(x) = sin(x)/cos(x)
Substituting this into the original equation, we will have;
f(x) = sin(x)/cos(x) - sin(x)
Since sin(x) is common at the numerator, we will factor it out to have;
f(x) = sin(x){1/cos(x)-1}
Therefore the first option (1/ cos(x) − 1) sin(x) is the best algorithm for evaluating the function since we could generate the function (1/ cos(x) − 1) sin(x) using the function f(x) = tan(x) - sin(x).
That will depend, you have to ask yourself first how many kilobytes one picture is. Let's just say that the size of one picture is 100 kb (which is the average size of a picture) Then first you multiply 100 kb with the number of pictures which is 43. Now you have a total used up memory of 4300 kb. After that, you minus the used up memory which is 4300 kb, to the total available space which is 32,834.5 and you will get an available space of 28534.5 kb. After that, you divide the remaining available space with the size of each picture. So this will be 28534.5 divided by 100. You will get 285. You can still take 285 pictures.
Answer:
Step-by-step explanation:
The average age of 18 girls is 12.
<u>Total age of girls:</u>
The average age of 15 boys is 17
<u>Total age of boys:</u>
<u>Total age of children:</u>
<u>Total number of children:</u>
<u>Average age of children:</u>
- 471 / 33 = 14.3 (rounded)