Answer:
Per unit cost will be $197.5
Explanation:
We have given number of units produced = 800
Direct material cost added in January = $74000
And conversion cost added in January = $84000
So total cost = $74000+$84000 = $158000
We have to find the per unit cost of product produced
So per unit cost is given by total cost divided by total number of units produced
So per unit cost
Answer:
2. the inventory acquired on April 23 with the products sold
Explanation:
Tyson Corporation
<em>As the company uses FIFO it would associate the sales with the inventory bought earliest. FIFO means first in first out the materials bought first would be sold first . The materials bought later would be sold later. In this situation the April 23 inventory is the first purchase so it would be associated with the products sold first in July.
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So option 2 is the best option indicating the first purchase sold first.
Answer: The answer is given below
Explanation:
a. . Private saving
Private saving=Y+TR-C-T
= $11t + $1t - $8t - $3t
= $12 trillion - $11 trillion
= $1 trillion
b. Public saving
Public Saving= T-G-TR
Since G is not given, we can use:
I = public saving + private saving
$2t = public savings + $1t
Public saving= $2 trillion - $1 trillion
Public savings = $1 trillion
c. Goverment purchases
Since public savings = T - G - TR
$1t = $3t - G - $1t
G = $3t - $1t - $1t
G = $3 trillion - $2 trillion
G = $1 trillion
d. The goverment budget deficit or budget surplus.
There is a budget surplus of $1 trillion which has been calculated in the public savings.
Answer:
D. Interpretation: The zeros are where the daily profit is $0.00
zeros: x = 3.586 and x = 6.414
Explanation:
We have been given the following daily profit function;
where y is the profit (in hundreds of dollars) of a taco food truck
and x the price of a taco (in dollars)
The zeros of this profit function can be obtained by solving for x in the following equation;
These will simply be the x-intercepts of the profit function. That is the points where the profit function crosses or intersects the x-axis.
Therefore, an interpretation of the zeros of this function would be;
The zeros are where the daily profit is $0.00
These zeros can be evaluated graphically. We first obtain the graph of the profit function as shown in the attachment below;
We then determine the x values where the graph crosses the x-axis. These values will represent the zeros of our profit function. From the graph, these points are;
x = 3.586 and x = 6.414
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