Answer:
Bradford's estimated variable manufacturing overhead cost is $127,200
Explanation:
The cost function=$83,000+$12M
where M stands for machine hours required to produce the expected output in the month under review.
Each one-six unit case of Bradford's single product requires two machine hours,hence 5,300 cases would require 10,600 hours(5,300*2hrs).
Total estimated variable manufacturing overhead=cost per machine hour*expected number of machine hours
cost per machine hour is $12 as seen in the cost function
estimated variable manufacturing overhead=$12*10,600=$127,200
Answer:
Find attached complete part of the question.
The unrealized gains is $3500
Explanation:
Y stock has been disposed and its gains or losses are now realized, and it is not applicable to our computation now.
Unrealized gains or losses is the difference between purchase price of a stock and its current market price
Stock X=($43-$40)*1500=$4500 gains
Stock Z=($21-$22)*1000=-$1000 losses
So unrealized gains overall =$4500-$1000
unrealized gains =$3500
Note that the price of stock X has risen to $43 from initial $40 while that of company Z has fallen to$21 from the initial $22.
I
Answer:
$10,800 underapplied
Explanation:
Calculation for If overhead is applied based on machine hours, the overapplied/underapplied overhead is:
Overhead machine hours=[($1,044,000/24,000)×23,600]-1,037,400
Overhead machine hours=($43.50 x 23,600) - 1,037,400
Overhead machine hours=$1,026,600- 1,037,400
Overhead machine hours= $10,800 underapplied
Therefore If overhead is applied based on machine hours, the overapplied/underapplied overhead is:$10,800 underapplied
Answer:
$249,500
Explanation:
Calculation for the amount that Sheridan should report as its December 31 inventory
Using this formula
December 31 inventory=Goods costing+Goods purchased +Goods sold
December 31 inventory=$198,500+$25,000+$26,000
December 31 inventory=$249,500
Therefore the amount that Sheridan should report as its December 31 inventory will be $249,500
Answer:
65000$ remains available for complete operation losses.
Explanation:
$20,000 of the $25,000 loss is paid by the policy. The $15,000 loss is paid in full. Together these payments reduce the $100,000 aggregate limit to $65,000.
Calculation
100,0000-20,000-15,000 = 65,000 $.
