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Re: In a right triangle PQR, X and Y are mid points of PQ and PR [#permalink]
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This question can be solved in 30 seconds just keeping in mind simple rules of geometry such as the triplets.

If the triangle has a 90° angle and one side is 6 and the other is 8 then PR must be 10. The triangle is a 90°,60°,30°

triplet: 3,4,5; 6,8,10...so forth

We do also know that x is exactly half away in PQ which means that PX is 3. Similarly, PY is 5. Now, it does not matter that point T is everywhere on the side QR. We do know the length of the two sides of the polygon inside the triangle.

The area is \(3 \times 5 = 15\)

the answer is A
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Re: In a right triangle PQR, X and Y are mid points of PQ and PR [#permalink]
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pranab01 wrote:
Carcass wrote:
This question can be solved in 30 seconds just keeping in mind simple rules of geometry such as the triplets.

If the triangle has a 90° angle and one side is 6 and the other is 8 then PR must be 10. The triangle is a 90°,60°,30°

triplet: 3,4,5; 6,8,10...so forth

We do also know that x is exactly half away in PQ which means that PX is 3. Similarly, PY is 5. Now, it does not matter that point T is everywhere on the side QR. We do know the length of the two sides of the polygon inside the triangle.

The area is \(3 \times 5 = 15\)

the answer is A



Great explanation :-D . Moreover, @fdundo can you please mention the source as well so that the questions can be segregated

Further, added few links in regards to quadrilateral.

https://www.wikihow.com/Find-the-Area-of-a-Quadrilateral

https://www.dummies.com/education/math/geometry/how-to-calculate-the-area-of-a-quadrilateral/
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Re: In a right triangle PQR, X and Y are mid points of PQ and PR [#permalink]
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can you please elaborate how you arrived at "The area is 3×5=15" ? how do we know it is a rectangle?


Carcass wrote:
This question can be solved in 30 seconds just keeping in mind simple rules of geometry such as the triplets.

If the triangle has a 90° angle and one side is 6 and the other is 8 then PR must be 10. The triangle is a 90°,60°,30°

triplet: 3,4,5; 6,8,10...so forth

We do also know that x is exactly half away in PQ which means that PX is 3. Similarly, PY is 5. Now, it does not matter that point T is everywhere on the side QR. We do know the length of the two sides of the polygon inside the triangle.

The area is \(3 \times 5 = 15\)

the answer is A
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Re: In a right triangle PQR, X and Y are mid points of PQ and PR [#permalink]
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PQ=6 and QR = 8
AND

PR = 10

PX is = 3 and PY=5

You know these two sides. \(3 \times 5 = 15\) regardless you do not know where is T. Actually is it a rectangle.

Regards
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Re: In a right triangle PQR, X and Y are mid points of PQ and PR [#permalink]
AREA=bh
15

A is greater than B
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Re: In a right triangle PQR, X and Y are mid points of PQ and PR [#permalink]
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How can angle QPR be 90 degree as PQR=90. Are you sure its A? I think the answer is D

I saw it as 3 cases :
Case 1 : Assuming T is the midpoint,
Area of PXTY = Area of PQR - [Area of XQT + Area of YTR ] = (1/2 * 6 * 8) - (1/2 * 3 * 4 * 2) = 12 units

Case 2 : T is at point Q, so cannot figure out area of triangle PQY

Case 3 : T is at point R, in which case
Area of PXTY = Area of triangle PQR - Area of triangle QXR = (1/2 * 6 * 8) - (1/2 * 3 * 8) = 12 units

Because of case 2, I thought answer is D
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Re: In a right triangle PQR, X and Y are mid points of PQ and PR [#permalink]
THANKS
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Re: In a right triangle PQR, X and Y are mid points of PQ and PR [#permalink]
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I struggle to understand how the quadrilateral is 3*5 = 15.

I got D as well.

Since \(T\) can be any point on \(QR\), we can push \(T\) all the way to R or all the way to \(Q\).

The area of \(PQR\) = 24.

If we push T all the way to \(Q\), the line \(PT\) collapses onto \(PR\). So we can bring the quadrilateral infinitely close to the line \(PR\), minimizing it's area to 0.

In that case, the quadrilateral's area is less than 12.

With the logic from above, we can maximize the area of the quadrilateral by having \(T\) be the midpoint of \(QR\). This

So \(QT\) = 4 and \(XQ\) = 3, which implies that \(XT\) = 5.

This leads to triangle the area of triangle \(QXT\) = 6.

Since \(PQR\) is a 3-4-5 triangle, we can deduce that \(PR\) = 10, or that \(PY\) = 5.

Notice how \(XT\) = 5, \(PY\) = 5, and \(PX\) = 3. This must mean that \(YT\) = 3.

\(TR\) = 4 , and so we have another 3-4-5 triangle in \(TYR\), whose area is 6.

The area of the quadrilateral is:

the area of triangle \(QPR\) - the area of triangle \(QXT\) - the area of triangle \(TYR\).
\(24 - 6 - 6 = 12\)

So if \(T\) is the midpoint of \(QR\), the area's are equal.


Since we have two different answers, the answer is D
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Re: In a right triangle PQR, X and Y are mid points of PQ and PR [#permalink]
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No matter how i look at it the answer is C.

For better understanding use Midpoint theorem where the line passing through the mid point of 2 sides is parallel to the third. XY || QR

Also XY = 0.5 * QR
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Re: In a right triangle PQR, X and Y are mid points of PQ and PR [#permalink]
Same here! Used midpoint theorem to assume C as the final answer.
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Re: In a right triangle PQR, X and Y are mid points of PQ and PR [#permalink]
Is midpoint theorem required knowledge for GRE math? I won't forget it now but just curious
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Re: In a right triangle PQR, X and Y are mid points of PQ and PR [#permalink]
pranab223 wrote:
pranab01 wrote:
Carcass wrote:
This question can be solved in 30 seconds just keeping in mind simple rules of geometry such as the triplets.

If the triangle has a 90° angle and one side is 6 and the other is 8 then PR must be 10. The triangle is a 90°,60°,30°

triplet: 3,4,5; 6,8,10...so forth

We do also know that x is exactly half away in PQ which means that PX is 3. Similarly, PY is 5. Now, it does not matter that point T is everywhere on the side QR. We do know the length of the two sides of the polygon inside the triangle.

The area is \(3 \times 5 = 15\)

the answer is A



Great explanation :-D . Moreover, fdundo can you please mention the source as well so that the questions can be segregated

Further, added few links in regards to quadrilateral.



Although I had used the same approach, I was not so sure whether I should have used area formula 3*5 because I was not so sure about what kind of quadrilateral it is. Can someone help?
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Re: In a right triangle PQR, X and Y are mid points of PQ and PR [#permalink]
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chacinluis wrote:
"The Midsegment Theorem states that the midsegment connecting the midpoints of two sides of a triangle is parallel to the third side of the triangle, and the length of this midsegment is half the length of the third side."




By Midsegment theorem XY is a line segment parallel to QR with length 4.
Since QR intersects PQ at a right angle, so does XY by corresponding angles, therefore angle PXY is a right angle.

Area of triangle PXY is (1/2)(4)(3)=6


Also the height of triangle XYT is 3 as seen from the image posted and XY is of length 4.
Therefore

Area of triangle XYT is (1/2)(4)(3)=6

Area of Quadrilateral PXTY= Area of triangle PXY + Area of triangle XYT = 6+6 = 12

Final Answer: C


That is absolutely correct, The answer must be C
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Re: In a right triangle PQR, X and Y are mid points of PQ and PR [#permalink]
Expert Reply
Updated the OA

Thank you guys
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Re: In a right triangle PQR, X and Y are mid points of PQ and PR [#permalink]
Among all the solution, Midsegment Theorem is good way to tackle this and related to this type of the question. If in any triangle, two mid point is joined, then it is parallel to the third side and it is exactly half. It seems this is very underrated concept, but can be used in various problem like this .
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Re: In a right triangle PQR, X and Y are mid points of PQ and PR [#permalink]
Umm, are questions based on Midsegment theorem asked ? Because this is an extremely easy problem if you know the theorem but I don't think if it is in the syllabus. Or is it absolutely rare like quintiles in stats ?
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Re: In a right triangle PQR, X and Y are mid points of PQ and PR [#permalink]
You have to admire how they drew the triangle. Y is in the wrong place, and T looks like exactly the midpoint. Perfect for throwing off your answer. Well done, GRE.
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