ABC Car Company wants to manufacture a new car known as Model X, and it is trying to determine how many cars it needs to sell in order to make an annual profit of $30,500,000. The annual fixed costs for Model X total $50,200,000. In addition, each Model X car has an average cost of $5,000 per vehicle to manufacture. If the Company forecasts it will sell 20,000 Model X cars this year, at what price must the Company sell the car to achieve the desired annual profit?
A. $4,035
B. $4,036
C. $9,035
D. $16,140
E. $36,140
OA is C
I have an official solution, it has a very long explanation, and i also did exactly the same way. Can you please tell any shorter approach ?
profit = revenue - expenses
30,500,000 = 20,000s - (5,000(20,000) + 50,200,000)
Thanks
5-Day Free Trial
5-day free, full-access trial TTP
Available with Beat the GMAT members only code
MORE DETAILS
ABC Car Company wants to manufacture a new car known a
This topic has expert replies
GMAT/MBA Expert
-
Jay@ManhattanReview
- GMAT Instructor
- Posts: 3008
- Joined: Mon Aug 22, 2016 6:19 am
- Location: Grand Central / New York
- Thanked: 470 times
- Followed by:34 members
I think the official solution is an efficient one. Yes, you will have to deal with many 0s, but's okay; many of them would cancel. Let's see how.vinni.k wrote:ABC Car Company wants to manufacture a new car known as Model X, and it is trying to determine how many cars it needs to sell in order to make an annual profit of $30,500,000. The annual fixed costs for Model X total $50,200,000. In addition, each Model X car has an average cost of $5,000 per vehicle to manufacture. If the Company forecasts it will sell 20,000 Model X cars this year, at what price must the Company sell the car to achieve the desired annual profit?
A. $4,035
B. $4,036
C. $9,035
D. $16,140
E. $36,140
OA is C
I have an official solution, it has a very long explanation, and i also did exactly the same way. Can you please tell any shorter approach ?
profit = revenue - expenses
30,500,000 = 20,000s - (5,000(20,000) + 50,200,000)
Thanks
We have
30,500,000 = 20,000s - (5,000(20,000) + 50,200,000)
We can cancel four 0s from the LHS and the RHS
Thus, we get 3050 = 2s - (5000(2) + 5020)
3050 = 2s - (10000 + 5020)
3050 = 2s - 15020
2s = 15020 + 3050 = 18070
=> s = $9035
The correct answer: C
Hope this helps!
-Jay
Download free ebook: Manhattan Review GMAT Quantitative Question Bank Guide
_________________
Manhattan Review GMAT Prep
Locations: New York | Vienna | Kuala Lumpur | Sydney | and many more...
Schedule your free consultation with an experienced GMAT Prep Advisor! Click here.
GMAT/MBA Expert
-
[email protected]
- Elite Legendary Member
- Posts: 10392
- Joined: Sun Jun 23, 2013 6:38 pm
- Location: Palo Alto, CA
- Thanked: 2867 times
- Followed by:511 members
- GMAT Score:800
Hi vinni.k,
The answer choices are 'spread out' enough that you can use estimation to answer this question (although you will still have to be careful to keep track of the digits involved).
Our 'goal' is to have a PROFIT of approximately $30,000,000. We know that there are FIXED COSTS of approximately $50,000,000, so with just these two values, we would need REVENUE of approximately:
$30,000,000 + $50,000,000 = $80,000,000
However, we also have to consider the manufacturing COST per vehicle ($5,000 per vehicle for 20,000 vehicles). That would be:
($5,000)(20,000) = $100,000,000
Thus, we need TOTAL REVENUE to be:
$80,000,000 + $100,000,000 = $180,000,000
To hit that total, the price that we sell each car for would have to be approximately:
$180,000,000/20,000 =
$180,000/20 =
$9,000 approximately
Final Answer: C
GMAT assassins aren't born, they're made,
Rich
The answer choices are 'spread out' enough that you can use estimation to answer this question (although you will still have to be careful to keep track of the digits involved).
Our 'goal' is to have a PROFIT of approximately $30,000,000. We know that there are FIXED COSTS of approximately $50,000,000, so with just these two values, we would need REVENUE of approximately:
$30,000,000 + $50,000,000 = $80,000,000
However, we also have to consider the manufacturing COST per vehicle ($5,000 per vehicle for 20,000 vehicles). That would be:
($5,000)(20,000) = $100,000,000
Thus, we need TOTAL REVENUE to be:
$80,000,000 + $100,000,000 = $180,000,000
To hit that total, the price that we sell each car for would have to be approximately:
$180,000,000/20,000 =
$180,000/20 =
$9,000 approximately
Final Answer: C
GMAT assassins aren't born, they're made,
Rich
GMAT/MBA Expert
-
Scott@TargetTestPrep
- GMAT Instructor
- Posts: 7240
- Joined: Sat Apr 25, 2015 10:56 am
- Location: Los Angeles, CA
- Thanked: 43 times
- Followed by:29 members
Let x = the selling price of a Model X car. Since revenue - cost = profit, we have:vinni.k wrote: ↑Fri Oct 13, 2017 12:16 pmABC Car Company wants to manufacture a new car known as Model X, and it is trying to determine how many cars it needs to sell in order to make an annual profit of $30,500,000. The annual fixed costs for Model X total $50,200,000. In addition, each Model X car has an average cost of $5,000 per vehicle to manufacture. If the Company forecasts it will sell 20,000 Model X cars this year, at what price must the Company sell the car to achieve the desired annual profit?
A. $4,035
B. $4,036
C. $9,035
D. $16,140
E. $36,140
OA is C
I have an official solution, it has a very long explanation, and i also did exactly the same way. Can you please tell any shorter approach ?
profit = revenue - expenses
30,500,000 = 20,000s - (5,000(20,000) + 50,200,000)
Thanks
20,000x - [20,000(5,000) + 50,200,000] = 30,500,000
20,000x - 150,200,000 = 30,500,000
20,000x = 180,700,000
x = 9,035
Answer: C
Scott Woodbury-Stewart
Founder and CEO
[email protected]
See why Target Test Prep is rated 5 out of 5 stars on BEAT the GMAT. Read our reviews
