Last visit was: 18 Dec 2024, 08:27 It is currently 18 Dec 2024, 08:27

Close

GRE Prep 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 GRE 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.

Close

Request Expert Reply

Confirm Cancel
Verbal Expert
Joined: 18 Apr 2015
Posts: 30355
Own Kudos [?]: 36751 [21]
Given Kudos: 26080
Send PM
Most Helpful Community Reply
Retired Moderator
Joined: 10 Apr 2015
Posts: 6218
Own Kudos [?]: 12226 [8]
Given Kudos: 136
Send PM
avatar
Director
Director
Joined: 03 Sep 2017
Posts: 518
Own Kudos [?]: 707 [7]
Given Kudos: 0
Send PM
General Discussion
avatar
Intern
Intern
Joined: 17 Feb 2018
Posts: 31
Own Kudos [?]: 42 [0]
Given Kudos: 0
Send PM
Re: Trapezoid OPQR has one vertex at the origin. What is the ar [#permalink]
1
IlCreatore wrote:
To find coordinates of point P, I exploit the fact that the two basis of a trapezoid are parallel and thus since OR slope is (a-0)/(2a-0)=1/2, the slope of QP must be the same, i.e. (a-y)/(a-x) = 1/2, where (x,y) are the coordinates of P. Since P is on the x-axis, its x is equal to 0 and thanks to this information we can solve the equation (a-y)/a=1/2 that gives a value of y = a/2.

Given that should I use OP as height to compute the area? Because it does not seem to be perpendicular to the larger base. I also tried to think about dividing the figure in a triangle and a parallelogram but it doesn't work.

Any hint?


Draw a line between point P to line R. We get a triangle and a parallelogram.
Triangle has a base of a/2 and height of a. Area of triangle is (a^2)/4
Parallelogram has a base of a and a height of a/2. Area of parallelogram is (a^2)/2
combine triangle and parallelogram we get (3a^2)/4
avatar
Intern
Intern
Joined: 05 Oct 2017
Posts: 10
Own Kudos [?]: 9 [0]
Given Kudos: 0
Send PM
Re: Trapezoid OPQR has one vertex at the origin. What is the ar [#permalink]
2
just take the area of two triangle above and below trapezoid and subtract it from area of whole square

(area of whole square) 2a^2 - (area of triangle above trapezoid) a^2/4 - (are of triangle below trapezoid) a^2

2a^2 - a^2/4 - a^2 = 3a^2/4

IlCreatore wrote:
To find coordinates of point P, I exploit the fact that the two basis of a trapezoid are parallel and thus since OR slope is (a-0)/(2a-0)=1/2, the slope of QP must be the same, i.e. (a-y)/(a-x) = 1/2, where (x,y) are the coordinates of P. Since P is on the x-axis, its x is equal to 0 and thanks to this information we can solve the equation (a-y)/a=1/2 that gives a value of y = a/2.

Given that should I use OP as height to compute the area? Because it does not seem to be perpendicular to the larger base. I also tried to think about dividing the figure in a triangle and a parallelogram but it doesn't work.

Any hint?
avatar
Manager
Manager
Joined: 15 Feb 2018
Posts: 53
Own Kudos [?]: 34 [0]
Given Kudos: 0
Send PM
Re: Trapezoid OPQR has one vertex at the origin. What is the ar [#permalink]
How to get the area of the above triangle though? I don't know OP and therefore don't know the height.

achirarulz wrote:
just take the area of two triangle above and below trapezoid and subtract it from area of whole square

(area of whole square) 2a^2 - (area of triangle above trapezoid) a^2/4 - (are of triangle below trapezoid) a^2

2a^2 - a^2/4 - a^2 = 3a^2/4

IlCreatore wrote:
To find coordinates of point P, I exploit the fact that the two basis of a trapezoid are parallel and thus since OR slope is (a-0)/(2a-0)=1/2, the slope of QP must be the same, i.e. (a-y)/(a-x) = 1/2, where (x,y) are the coordinates of P. Since P is on the x-axis, its x is equal to 0 and thanks to this information we can solve the equation (a-y)/a=1/2 that gives a value of y = a/2.

Given that should I use OP as height to compute the area? Because it does not seem to be perpendicular to the larger base. I also tried to think about dividing the figure in a triangle and a parallelogram but it doesn't work.

Any hint?
avatar
Intern
Intern
Joined: 05 Oct 2017
Posts: 10
Own Kudos [?]: 9 [0]
Given Kudos: 0
Send PM
Re: Trapezoid OPQR has one vertex at the origin. What is the ar [#permalink]
2
To find coordinates of point P, I exploit the fact that the two basis of a trapezoid are parallel and thus since OR slope is (a-0)/(2a-0)=1/2, the slope of QP must be the same, i.e. (a-y)/(a-x) = 1/2, where (x,y) are the coordinates of P. Since P is on the x-axis, its x is equal to 0 and thanks to this information we can solve the equation (a-y)/a=1/2 that gives a value of y = a/2.


gremather wrote:
How to get the area of the above triangle though? I don't know OP and therefore don't know the height.

achirarulz wrote:
just take the area of two triangle above and below trapezoid and subtract it from area of whole square

(area of whole square) 2a^2 - (area of triangle above trapezoid) a^2/4 - (are of triangle below trapezoid) a^2

2a^2 - a^2/4 - a^2 = 3a^2/4

IlCreatore wrote:
To find coordinates of point P, I exploit the fact that the two basis of a trapezoid are parallel and thus since OR slope is (a-0)/(2a-0)=1/2, the slope of QP must be the same, i.e. (a-y)/(a-x) = 1/2, where (x,y) are the coordinates of P. Since P is on the x-axis, its x is equal to 0 and thanks to this information we can solve the equation (a-y)/a=1/2 that gives a value of y = a/2.

Given that should I use OP as height to compute the area? Because it does not seem to be perpendicular to the larger base. I also tried to think about dividing the figure in a triangle and a parallelogram but it doesn't work.

Any hint?
avatar
Intern
Intern
Joined: 14 Jun 2018
Posts: 36
Own Kudos [?]: 13 [0]
Given Kudos: 0
Send PM
Re: Trapezoid OPQR has one vertex at the origin. What is the ar [#permalink]
1
achirarulz wrote:
just take the area of two triangle above and below trapezoid and subtract it from area of whole square

(area of whole square) 2a^2 - (area of triangle above trapezoid) a^2/4 - (are of triangle below trapezoid) a^2

2a^2 - a^2/4 - a^2 = 3a^2/4

IlCreatore wrote:
To find coordinates of point P, I exploit the fact that the two basis of a trapezoid are parallel and thus since OR slope is (a-0)/(2a-0)=1/2, the slope of QP must be the same, i.e. (a-y)/(a-x) = 1/2, where (x,y) are the coordinates of P. Since P is on the x-axis, its x is equal to 0 and thanks to this information we can solve the equation (a-y)/a=1/2 that gives a value of y = a/2.

Given that should I use OP as height to compute the area? Because it does not seem to be perpendicular to the larger base. I also tried to think about dividing the figure in a triangle and a parallelogram but it doesn't work.

Any hint?


It's not square!

just take the area of two triangle above and below trapezoid and subtract it from area of whole square

(area of whole rectangle) 2a^2 - (area of triangle above trapezoid) a^2/4 - (are of triangle below trapezoid) a^2

2a^2 - a^2/4 - a^2 = 3a^2/4
avatar
Intern
Intern
Joined: 27 Jan 2019
Posts: 29
Own Kudos [?]: 55 [5]
Given Kudos: 0
Send PM
Re: Trapezoid OPQR has one vertex at the origin. What is the ar [#permalink]
5
We can solve this by using parallel lines.
Attachments

shot3.jpg
shot3.jpg [ 287.86 KiB | Viewed 10018 times ]

Manager
Manager
Joined: 20 Jun 2019
Posts: 181
Own Kudos [?]: 221 [0]
Given Kudos: 41
GRE 1: Q160 V161

GRE 2: Q165 V159
Send PM
Re: Trapezoid OPQR has one vertex at the origin. What is the ar [#permalink]
achirarulz wrote:
just take the area of two triangle above and below trapezoid and subtract it from area of whole square

(area of whole square) 2a^2 - (area of triangle above trapezoid) a^2/4 - (are of triangle below trapezoid) a^2

2a^2 - a^2/4 - a^2 = 3a^2/4

IlCreatore wrote:
To find coordinates of point P, I exploit the fact that the two basis of a trapezoid are parallel and thus since OR slope is (a-0)/(2a-0)=1/2, the slope of QP must be the same, i.e. (a-y)/(a-x) = 1/2, where (x,y) are the coordinates of P. Since P is on the x-axis, its x is equal to 0 and thanks to this information we can solve the equation (a-y)/a=1/2 that gives a value of y = a/2.

Given that should I use OP as height to compute the area? Because it does not seem to be perpendicular to the larger base. I also tried to think about dividing the figure in a triangle and a parallelogram but it doesn't work.

Any hint?


How do you calculate area of triangle above trapezoid?
avatar
Manager
Manager
Joined: 04 Apr 2020
Posts: 90
Own Kudos [?]: 83 [0]
Given Kudos: 0
Send PM
Re: Trapezoid OPQR has one vertex at the origin. What is the ar [#permalink]
1
pprakash786 wrote:
achirarulz wrote:
just take the area of two triangle above and below trapezoid and subtract it from area of whole square

(area of whole square) 2a^2 - (area of triangle above trapezoid) a^2/4 - (are of triangle below trapezoid) a^2

2a^2 - a^2/4 - a^2 = 3a^2/4

IlCreatore wrote:
To find coordinates of point P, I exploit the fact that the two basis of a trapezoid are parallel and thus since OR slope is (a-0)/(2a-0)=1/2, the slope of QP must be the same, i.e. (a-y)/(a-x) = 1/2, where (x,y) are the coordinates of P. Since P is on the x-axis, its x is equal to 0 and thanks to this information we can solve the equation (a-y)/a=1/2 that gives a value of y = a/2.

Given that should I use OP as height to compute the area? Because it does not seem to be perpendicular to the larger base. I also tried to think about dividing the figure in a triangle and a parallelogram but it doesn't work.

Any hint?




How do you calculate area of triangle above trapezoid?



After getting the length of OP (a/2), we know that the full length of the Y axis is a from (a,a) coordinate so the remaining length is a/2. This is one perpendicular side of the upper triangle. The other perpendicular side is a, from the (a,a) coordinate. So the area = a/2 * (a) = a^2/2.
Manager
Manager
Joined: 05 Aug 2020
Posts: 101
Own Kudos [?]: 245 [3]
Given Kudos: 14
Send PM
Re: Trapezoid OPQR has one vertex at the origin. What is the ar [#permalink]
2
1
Quote:
How do you calculate area of triangle above trapezoid?


All trapezoids have one pair of parallel sides, so we can deduce that the slope of the line from \(O\) to \(R\) has to have the same slope from \(P\) to \(Q\).

Since \(O\) is the origin, the slope of the line \(OR\) is:

\(\frac{a-0}{2a-0}\)

\(\frac{a}{2a}\)

\(\frac{1}{2}\)

This means that the slope of the line \(PQ\) has a slope of \(\frac{1}{2}\).

To find the area of the above triangle, we would need the base and its height. Looking at the figure, we know the height (the distance from the y-axis to \(Q\)) is \(a\). Now we need to find the base.

We can use the slope formula to find it, since we know that the slope from the \(P\) to point \(Q\) has to be \(\frac{1}{2}\).

Since the point \(P\) is on the y axis, let \(P\) = (0,\(y\)).

Using the slope formula we get:

\(\frac{y-a}{0-a} = \frac{1}{2}\)

\(2y - 2a = -a\)

\(2y = a\)

\(y = \frac{a}{2}\)

So Point \(P\) = (0,\(\frac{a}{2}\))

That must mean that the base of the triangle is \(\frac{a}{2}\).

So now we solve for the area of the above triangle:

\(\frac{1}{2}* a * \frac{a}{2}\) =

\(\frac{a^{2}}{4}\)

And there's the area of the above triangle.
avatar
Intern
Intern
Joined: 18 Apr 2020
Posts: 14
Own Kudos [?]: 29 [0]
Given Kudos: 0
Send PM
Re: Trapezoid OPQR has one vertex at the origin. What is the ar [#permalink]
1
Basically
Slope is = Rise/Run. For parallel lines it is same.

For line OR --> for the run 2a rise is a.
For line QP --> for a run of a i know the rise should be a/2 (half of run) but I have to reach to a rise of "a" therefore I must start from a/2 which is the point P.

Cheers
Manager
Manager
Joined: 26 Nov 2020
Posts: 110
Own Kudos [?]: 102 [0]
Given Kudos: 31
Send PM
Re: Trapezoid OPQR has one vertex at the origin. What is the ar [#permalink]
Good question ! fifan for suggesting a clever solution !!
User avatar
GRE Prep Club Legend
GRE Prep Club Legend
Joined: 07 Jan 2021
Posts: 5090
Own Kudos [?]: 76 [0]
Given Kudos: 0
Send PM
Re: Trapezoid OPQR has one vertex at the origin. What is the ar [#permalink]
Hello from the GRE Prep Club BumpBot!

Thanks to another GRE Prep Club member, I have just discovered this valuable topic, yet it had no discussion for over a year. I am now bumping it up - doing my job. I think you may find it valuable (esp those replies with Kudos).

Want to see all other topics I dig out? Follow me (click follow button on profile). You will receive a summary of all topics I bump in your profile area as well as via email.
Prep Club for GRE Bot
Re: Trapezoid OPQR has one vertex at the origin. What is the ar [#permalink]
Moderators:
GRE Instructor
88 posts
GRE Forum Moderator
37 posts
Moderator
1115 posts
GRE Instructor
234 posts

Powered by phpBB © phpBB Group | Emoji artwork provided by EmojiOne