Last visit was: 23 Apr 2026, 08:49 It is currently 23 Apr 2026, 08:49
Home
Messages
Tests
Schools
Events
Close
GMAT Club Daily Prep
Thank you for using the timer - this advanced tool can estimate your performance and suggest more practice questions. We have subscribed you to Daily Prep Questions via email.

Customized
for You

we will pick new questions that match your level based on your Timer History

Track
Your Progress

every week, we’ll send you an estimated GMAT score based on your performance

Practice
Pays

we will pick new questions that match your level based on your Timer History
Not interested in getting valuable practice questions and articles delivered to your email? No problem, unsubscribe here.
Go to My Error Log Learn more
Close
Request Expert Reply
Confirm Cancel
Back to Forum
Create Topic
705-805 (Hard)|   Geometry|      
User avatar
Bunuel
User avatar
Math Expert
Joined: 02 Sep 2009
Last visit: 23 Apr 2026
Posts: 109,778
Own Kudos:
810,798
 [13]
Given Kudos: 105,853
Products:
GMAT Club Tests Forum Quiz
Expert
Expert reply
Active GMAT Club Expert! Tag them with @ followed by their username for a faster response.
Posts: 109,778
Kudos: 810,798
 [13]
The area of the circle above, with center O, is 144π . If angle OZY m 06 Jun 2017, 10:30
1
Kudos
Add Kudos
12
Bookmarks
Bookmark this Post
00:00
Start Timer
Pause Timer
Resume Timer
Show Answer
Hide
Show
History
A
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!

Difficulty:

85% (hard)

Question Stats:

53% (02:58) correct 47% (03:02) wrong based on 158 sessions

History

Date
Time
Result
Not Attempted Yet

The area of the circle above, with center O, is 144π. If angle OZY measures 30 degrees, what is the area of the shaded region?

A. \(48π−36\sqrt{3}\)

B. \(48π−18\sqrt{3}\)

C. \(54π−18\sqrt{3}\)

D. \(72π−18\sqrt{3}\)

E. \(72π−27\sqrt{3}\)


Show Spoiler
Attachment:
SegmentYZ.png
SegmentYZ.png [ 12.37 KiB | Viewed 6458 times ]
ShowHide Answer
Official Answer
A
User avatar
quantumliner
User avatar
Joined: 24 Apr 2016
Last visit: 26 Sep 2018
Posts: 240
Own Kudos:
804
 [1]
Given Kudos: 48
Posts: 240
Kudos: 804
 [1]
The area of the circle above, with center O, is 144π . If angle OZY m Updated on: 06 Jun 2017, 11:28
Originally posted by quantumliner on 06 Jun 2017, 10:55.
Last edited by quantumliner on 06 Jun 2017, 11:28, edited 3 times in total.
1
Kudos
Add Kudos
Bookmarks
Bookmark this Post
Answer is A. Please refer to the attached.
Attachments

Solution.PNG
Solution.PNG [ 22.14 KiB | Viewed 6048 times ]

avatar
mws3
avatar
Joined: 07 Sep 2015
Last visit: 27 Jul 2020
Posts: 10
Own Kudos:
4
 [2]
Given Kudos: 11
Location: United States
Schools: Wharton '22 (D) Stanford '22 (WL) HBS '22 (WL) Booth '22 (WL) Sloan '22 (A)
Schools: Wharton '22 (D) Stanford '22 (WL) HBS '22 (WL) Booth '22 (WL) Sloan '22 (A)
Posts: 10
Kudos: 4
 [2]
The area of the circle above, with center O, is 144π . If angle OZY m 06 Jun 2017, 11:19
1
Kudos
Add Kudos
Bookmarks
Bookmark this Post
quantumliner
Answer is B. Please refer to the attached.
Show more

You correctly subtracted the 240 degree area (which is not part of the triangle or the shaded region), however, you subtracted only half of the triangle. The triangle area to be subtracted is OYZ, and not OKZ, as you did.

Therefore, answer should be 48\(\pi\) - 36 \(\sqrt{3}\), answer A
User avatar
quantumliner
User avatar
Joined: 24 Apr 2016
Last visit: 26 Sep 2018
Posts: 240
Own Kudos:
804
Given Kudos: 48
Posts: 240
Kudos: 804
The area of the circle above, with center O, is 144π . If angle OZY m 06 Jun 2017, 11:26
Kudos
Add Kudos
Bookmarks
Bookmark this Post
wrsorg
quantumliner
Answer is B. Please refer to the attached.

You correctly subtracted the 240 degree area (which is not part of the triangle or the shaded region), however, you subtracted only half of the triangle. The triangle area to be subtracted is OYZ, and not OKZ, as you did.

Therefore, answer should be 48\(\pi\) - 36 \(\sqrt{3}\), answer A
Show more

Thanks for pointing out :-D
avatar
nishantt7
avatar
Joined: 05 May 2016
Last visit: 09 Feb 2021
Posts: 42
Own Kudos:
22
 [1]
Given Kudos: 150
Status:Preparing
Location: India
Concentration: International Business, Finance
Posts: 42
Kudos: 22
 [1]
The area of the circle above, with center O, is 144π . If angle OZY m 06 Jun 2017, 11:50
1
Kudos
Add Kudos
Bookmarks
Bookmark this Post
quantumliner
Answer is A. Please refer to the attached.
Show more


How can we do it in case we do not want to apply trigonometry?
User avatar
generis
User avatar
Senior SC Moderator
Joined: 22 May 2016
Last visit: 18 Jun 2022
Posts: 5,258
Own Kudos:
37,725
 [3]
Given Kudos: 9,464
Expert
Expert reply
Posts: 5,258
Kudos: 37,725
 [3]
The area of the circle above, with center O, is 144π . If angle OZY m 09 Jun 2017, 13:22
3
Kudos
Add Kudos
Bookmarks
Bookmark this Post
Bunuel

The area of the circle above, with center O, is 144π. If angle OZY measures 30 degrees, what is the area of the shaded region?

A. \(48π−36\sqrt{3}\)

B. \(48π−18\sqrt{3}\)

C. \(54π−18\sqrt{3}\)

D. \(72π−18\sqrt{3}\)

E. \(72π−27\sqrt{3}\)
Show more
Attachment:
bbbb.jpg
bbbb.jpg [ 38.67 KiB | Viewed 5911 times ]

Quote:
nishantt7
How can we do it in case we do not want to apply trigonometry?
Show more
nishantt7, that's a good question. I didn't use trigonometry. The process and the math aren't too hard; that said, explaining clearly makes both process and math look hard.

I'm going to preempt the peanut gallery because I've been bothered by this issue for a year and remained silent: yes, this explanation is lengthy and thorough. Yes, I could have written it in about five cryptic sentences. Yes, I expect a few of you will do exactly that. Last time I checked, however, the point of collective exchange of information in pursuit of learning was neither to show off nor to intimidate nor to condescend. A five-line answer might assist slightly those who already know the method. Given the peril of impenetrability in compressed details, however, such compression risks confusing those who don't know the method. Were I not already a teacher, and were I nervous about others' expertise and my relative lack thereof, I would be hesitant to post, perhaps even to ask questions. I have the impression that the degree of camaraderie among members on this forum has declined noticeably. That's a shame. Onward.

nishantt7, the area of the shaded portion equals the area of sector ZOY minus the area of triangle YOZ. That's not immediately apparent. Start sketching, and it will be.

Sketch the figure, then take these steps

1. Calculate radius from area, where \(A=\pi r^2\), \(144 \pi = r^2\), \(r = 12\)

2. Write in what you know. ∠OZY = 30, r = 12, so OX and OZ = 12

What now? The answer choices all contain \(\sqrt{3}\). GMAT loves to test special triangles. \(\sqrt{3}\) should alert you immediately that, in all likelihood, you are looking for or will need a 30-60-90 triangle. You already have a 30° angle; that should tip you off to draw a triangle of some kind.

3. Draw the triangle: Draw a line from center O to Y to create OY

Because OY is a radius, label it 12

OY = OZ = 12. Indicate that equality with hatch marks ||

You have an isosceles triangle with one angle of 30°. Angles opposite equal sides of isosceles triangle are equal. For ∠OYZ, write in 30, and indicate that ∠OYZ = ∠OZY

What is the measure of third angle ∠YOZ? 30 + 30 + ∠YOZ = 180, so ∠YOZ = 120. I noted it.

4. With two 30° angles, and a large angle of 120°, bisect the 120° angle to get two 30-60-90 triangles.

Draw a perpendicular bisector from center O to YZ to create AY. Now ∠YOA = ∠ZOA = 60

5. Find the area of triangle YOZ:

The two 30-60-90 triangles have side ratios \(x : x \sqrt{3} : 2x\)

OZ, the hypotenuse opposite the 90° angle, corresponds with 2x. Use that to figure out other two sides' length. OZ = 12. So OA = (1)x = 6, and AZ = x \(\sqrt{3}\) = 6\(\sqrt{3}\)

CAREFUL here. Either find the area of one 30-60-90 triangle and double, or note that YZ = (AZ) * 2 =\(12 \sqrt{3}\) (which is the base of triangle YOZ)

I chose former. Area of triangle AOZ = \((b * h)/2\), or \((6 * 6\sqrt{3}) / 2\) = \(18 \sqrt{3}\). Double it and area of triangle YOZ = \(36\sqrt{3}\)

6. Find area of sector ZOY

Its central angle is 120°. Sector area = \(\frac{120}{360} * 144\pi\) = \(48 \pi\)

7. Shaded area therefore equals \(48 \pi\) - \(36 \sqrt{3}\)

Show Spoiler
Answer A
Hope it helps.
User avatar
Fdambro294
User avatar
Joined: 10 Jul 2019
Last visit: 20 Aug 2025
Posts: 1,331
Own Kudos:
771
Given Kudos: 1,656
Posts: 1,331
Kudos: 771
The area of the circle above, with center O, is 144π . If angle OZY m 19 Nov 2020, 10:05
Kudos
Add Kudos
Bookmarks
Bookmark this Post
The upper half of the Circle has 1/2 the Total Area = 72(pi)

We can Subtract out the sector area measured by the Central Angle XOY, which is 2 times the Inscribed Angle at OZY of 30 degrees

(60)/(360) * Area of Circle = Sector Area XOY

(1/6) * (144 (pi)) = 24(pi)

Next, we can connect a radius from Point O to Point Y on the Circumference of the Circle.

This will create an Isosceles Triangle YOZ with the 2 equal sides = radius = 12

Concept: the Perpendicular Height drawn from the Vertex between the 2 Equal Sides of an Isosceles Triangle to the Non Equal Side is also————> Angle Bisector at the Vertex YOZ and a Perpendicular Bisector of the NON equal
Side YZ


Since Angle XOY = 60 degrees, Angle YOZ = 120 degrees.

Thus, the Height = Angle Bisector = Perpendicular Bisector = Median = Line of Symmetry for the Isosceles Triangle will Subdivide Isosceles Triangle YOZ into TWO 30-60-90 Right Triangles.

Using the Fact that the radius = hypotenuse of Each right Triangle = 12

The 2 Legs will be:

6 and 6 * sqrt(3)

2 * (1/2) * 6 * 6 * sqrt(3) = 36 * sqrt(3) = Area of Triangle YOZ


Shaded Area = (Half the Circle Area) - (Sector Area YOX) - (Area of Isosceles Triangle YOZ)

72(pi) - 24(pi) - 36 * sqrt(3) =

48(pi) - 36 * sqrt(3)

-A-

EDIT: wow, generis put up a much better explanation. See above post from 3 years ago.

Posted from my mobile device
User avatar
hazeljj
User avatar
Joined: 08 Jul 2023
Last visit: 06 Jan 2024
Posts: 16
Own Kudos:
8
Given Kudos: 47
Posts: 16
Kudos: 8
The area of the circle above, with center O, is 144π . If angle OZY m 03 Nov 2023, 18:10
Kudos
Add Kudos
Bookmarks
Bookmark this Post
I did a slightly different method, which I believe is more straightforward. Based on the properties of circles, when one length of a triangle inscribed within circle is the diameter, and the vertice is along the circumference of circle, the angle formed is 90. (Pardon for the wrong terms used if any, I do not have the technical vocab for the geometric properties)

Thus XZ is the hypothenuse of triangle XYZ. Knowing that r =12, XZ = 24, and XY = 12, YZ = 12sqrt3. Area of right triangle = 72sqrt 3.

Moving onto the segment formed after discounting equilateral triangle XOY, area = 1/6 * 144pi (we know it is equilateral because OX and OY = radius = 12 = XY) - area of equilateral triangle XOY

To find area of triangle XOY = 1/2 * 12 * 6sqrt 3 (using 30-60-90 triangle)

So area of segment = 24pi - 36sqrt3
Area of right triangle = 1/2 * 12 * 12sqrt3 = 72sqrt 3
Area of shaded = 72pi - 72sqrt3 - (24pi - 36sqrt3) = 48pi - 36sqrt 3 (A)
Moderators:
Bunuel
Math Expert
109778 posts
Krunaal
Tuck School Moderator
853 posts