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655-705 (Hard)|   Geometry|      
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GMATinsight
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Find the Area of ∆ABC? 1) Two sides of the triangle have lengths 3 an 08 Jul 2020, 03:37
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E
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!

Difficulty:

55% (hard)

Question Stats:

53% (01:30) correct 47% (01:17) wrong based on 119 sessions

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Find the Area of ∆ABC?

1) Two sides of the triangle have lengths 3 and 5
2) Right ∆ABC has Perimeter ≤15

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E
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yashikaaggarwal
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Find the Area of ∆ABC? 1) Two sides of the triangle have lengths 3 an 08 Jul 2020, 03:52
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Statement 1: No information about triangle, whether its a right angle triangle, scalene or isosceles. So we can't use one formula to determine the area. (Insufficient)

Statement 2: Perimeter ≤ 15
The value of sides can vary with the perimeter so will the area. (Insufficient).

Statement 1&2: the third side can be (1,2,3,.....7) with the area of triangle differentiating. Hence Insufficient

IMO E

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Find the Area of ∆ABC? 1) Two sides of the triangle have lengths 3 an 08 Jul 2020, 03:58
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Explanation:

Find: Area of ∆ABC

Statement 1: Two sides of the triangle have lengths 3 and 5.
Still, we don't know 3rd or perimeter or whether a triangle is right or not .
Not Sufficient

Statement 2: Right ∆ABC has Perimeter ≤15
Still, we cannot say about area , as other factors not given.
Not Sufficient.

From 1 & 2,
Two side are 3,5 and Right ∆ABC has Perimeter ≤15
means 3rd side has to be 4 (only 4 can be possible)
we can find area now.
Sufficient.

IMO-C
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Find the Area of ∆ABC? 1) Two sides of the triangle have lengths 3 an 08 Jul 2020, 04:04
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For a triangle to be a right angled triangle, it needs to satisfy the Pythagorean Theorem. So the sum of the squares of the base and height should be equal to the square of the hypotenuse.

Numbers that satisfy the theorem are usually referred to as the pythagorean Triplets.

As far as the above question is concerned, the only triplet that satisfies the options is (3,4,5).

Statement 1: Just lengths of two sides is provided, with no information being provided for which side is which. Not sufficient.

Statement 2: It is provided that the triangle is a right angled triangle, hence the theorem mentioned above would apply. Also, perimeter would be less that 15. (3+4+5=11). But statement 2 by itself would be insufficient.

Both the statements, if used together are sufficient.

Hence, option C.

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Find the Area of ∆ABC? 1) Two sides of the triangle have lengths 3 an Updated on: 08 Jul 2020, 19:45
Originally posted by nkme2007 on 08 Jul 2020, 04:07.
Last edited by nkme2007 on 08 Jul 2020, 19:45, edited 1 time in total.
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Find the Area of ∆ABC?

1) Two sides of the triangle have lengths 3 and 5
2) Right ∆ABC has Perimeter ≤15

Show more

From Statement 1: third side s can be anything between 2 and 8. i.e.. 3,4,5,6 & 7 and any other real numbers be 2 and 8.

From Statement 2: third side s can be anything less than 7, though ABC is a right angle triangle

From Statements 1 and 2: third side can be any real number between 2 and 7.

Hence, OA: E
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Find the Area of ∆ABC? 1) Two sides of the triangle have lengths 3 an 08 Jul 2020, 04:11
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TanmayT
For a triangle to be a right angled triangle, it needs to satisfy the Pythagorean Theorem. So the sum of the squares of the base and height should be equal to the square of the hypotenuse.

Numbers that satisfy the theorem are usually referred to as the pythagorean Triplets.

As far as the above question is concerned, the only triplet that satisfies the options is (3,4,5).

Statement 1: Just lengths of two sides is provided, with no information being provided for which side is which. Not sufficient.

Statement 2: It is provided that the triangle is a right angled triangle, hence the theorem mentioned above would apply. Also, perimeter would be less that 15. (3+4+5=11). But statement 2 by itself would be insufficient.

Both the statements, if used together are sufficient.

Hence, option C.

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Hi, GMATinsight didn't mention anywhere that ABC needs to be a right angle triangle. So, the value of the third side can be anywhere between 2 and 7.
Hence, the area cannot be fixed.
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Find the Area of ∆ABC? 1) Two sides of the triangle have lengths 3 an 08 Jul 2020, 04:54
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nkme2007
TanmayT
For a triangle to be a right angled triangle, it needs to satisfy the Pythagorean Theorem. So the sum of the squares of the base and height should be equal to the square of the hypotenuse.

Numbers that satisfy the theorem are usually referred to as the pythagorean Triplets.

As far as the above question is concerned, the only triplet that satisfies the options is (3,4,5).

Statement 1: Just lengths of two sides is provided, with no information being provided for which side is which. Not sufficient.

Statement 2: It is provided that the triangle is a right angled triangle, hence the theorem mentioned above would apply. Also, perimeter would be less that 15. (3+4+5=11). But statement 2 by itself would be insufficient.

Both the statements, if used together are sufficient.

Hence, option C.

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Hi, GMATinsight didn't mention anywhere that ABC needs to be a right angle triangle. So, the value of the third side can be anywhere between 2 and 7.
Hence, the area cannot be fixed.
Show more

nkme2007

Second statement states that ∆ABC is a Right ∆ABC

I hope you noticed that. I am not endorsing any answer for this question as of now though :)
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Find the Area of ∆ABC? 1) Two sides of the triangle have lengths 3 an Updated on: 08 Jul 2020, 05:47
Originally posted by suchita2409 on 08 Jul 2020, 05:00.
Last edited by suchita2409 on 08 Jul 2020, 05:47, edited 1 time in total.
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Do not miss out taht stmt 2 says its right angled triangle.

The only right angled triangle with perimeter less than or equal to 15 is 3 4 5 triplet.

We can definitely find area based on this .

IMO C

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Find the Area of ∆ABC? 1) Two sides of the triangle have lengths 3 an 08 Jul 2020, 05:17
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Find the Area of ∆ABC?

1) Two sides of the triangle have lengths 3 and 5
2) Right ∆ABC has Perimeter ≤15

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1) Two sides of the triangle have lengths 3 and 5

No info about the third side

1 is not sufficient

2) Right ∆ABC has Perimeter ≤15

We know that the sides are in the ratio \(1:1:\sqrt2\) in a \(45-45-90\) right triangle and \(1:\sqrt3:2\) in a \(30-60-90\) right triangle

So it is possible for ABC to have side lengths \(1,1,\sqrt2\) and \(1,\sqrt3,2\) which means we can have multiple values for the area

2 is not sufficient

(1)+(2)

If the legs are \(3\) and \(5\), the area is \(\frac{15}{2}\)

If one leg is \(3\) and hypotenuse \(5\), the other leg is \(4\) and the area is \(6\)

(1)+(2) is not sufficient

Answer is (E)

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Find the Area of ∆ABC? 1) Two sides of the triangle have lengths 3 an 21 Feb 2021, 00:16
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Find the Area of ∆ABC?

1) Two sides of the triangle have lengths 3 and 5
Clearly insufficient. The last side could be anything. We also don't know what the base or height is.

2) Right ∆ABC has Perimeter ≤15
Clearly insufficient since there are multiple possible combinations for the side lengths. Even if we were able to figure out what that third side is (we can't), we still wouldn't know what the base or height is.
Insufficient.

Combined:
Same issue exists.
Insufficient.

E
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Find the Area of ∆ABC? 1) Two sides of the triangle have lengths 3 an 16 Feb 2023, 02:02
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why is C incorrect?

we can deduce from (2) that third side is 4 - and therefore in a right triangle, the legs would be 3 and 4 (given the 3-4-5 tripet). Please explain
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