Answer: Price of bricks will increase and quantity will increase.
Explanation: Since Stone and bricks are substitutes to each other, a rise in the price of stone due to the new regulation will lead to a rise in the demand for bricks. Since bricks are now relatively cheaper as compared to stones after the price rise, people will use more bricks than stones. This will shift the demand for bricks to the right driving upwards the price for bricks and also increase the quantity of bricks being sold in the market.
Answer:
The assembly line efficiency is 4.17% (to 2 decimal places)
Explanation:
Efficiency is a measure of productivity that is used to determine how well a target is achieved, by finding the ratio of the actual output to the expected output. In this example, the number of units is the output of the assembly line, and the assembly line efficiency is calculated as follows:
Assembly line efficiency = (actual output) /(required output) × 100
actual output = 25 minutes
if 5 minutes = 1 unit
∴ 25 minutes = 1/5 × 25 = 5 units
∴ actual output = 5 units
required output = 120 units
∴ efficiency = 
= 4.17%
Answer:
PLAN A:
(120 * 0.39) + (40 * 0.19) + 20 = $74.40
PLAN B:
(120 * 0.49) + (40 * 0.14) + 20 = $84.40
PLAN C:
$20 + $75 = $95 ;
PLAN A is optimal from 0 to 192 minutes
PLAN C is optimal from 192 minutes onward ;
Explanation:
PLAN A :
Service charge = $20
Daytime = $0.39 per minute
Evening = $0.19 per minute
PLAN B :
Service charge = $20
Daytime = $0.49 per minute
Evening = $0.14 per minute
PLAN C :
Service charge = $20
225 minutes = $75
Minutes beyond 225 = $0.36 per minute
A.)
Determine the total charge under each plan for this case: 120 minutes of day calls and 40 minutes of evening calls in a month.
PLAN A:
(120 * 0.39) + (40 * 0.19) + 20 = $74.40
PLAN B:
(120 * 0.49) + (40 * 0.14) + 20 = $84.40
PLAN C:
$20 + $75 = $95
b. If the agent will use the service for daytime calls, over what range of call minutes will each plan be optimal?
PLAN A:
20 + 0.39D = 95
0.39D = 95 - 20
D = 75 / 0.39
D = 192.31
Answer: four year college
Explanation: online
Answer:
The answer is: $4,522
Explanation:
Since Stanford doesn't operate in the restaurant business and doesn't buy the restaurant, he cannot deduct any amount for investigation costs relating to the restaurant.
Stanford doesn't operate in the bakery business but he bought the bakery, so he can deduct up to $5,000 (before amortization) for investigation costs related to the bakery. But those $5,000 are reduced by every dollar he spent over $50,000, so he can only deduct $4,000 [= $5,000 - ($51,000 - $50,000)].
The remaining $47,000 (= $51,000 - $4,000) can be amortized over 180 months, which equals $261 per month (= $47,000 / 180 months).
Since he bought the restaurant in November, he can deduct two months: $261 per month x 2 months = $522
So his total deduction for investigation expenses is = $4,000 + $522 = $4,522
