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Bunuel
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A sum of $270,000 from a certain estate was divided among four childre 17 Apr 2017, 01:24
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75% (01:26) correct 25% (01:10) wrong based on 126 sessions

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A sum of $270,000 from a certain estate was divided among four children. How much of the estate did the oldest child receive?

(1) The two younger children together received half of the estate.
(2) The oldest and the youngest of the children together received $175,000.
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A sum of $270,000 from a certain estate was divided among four childre 17 Apr 2017, 02:33
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Option E

270,000$ to be divided among 4 children : A, B, C & D [Oldest to youngest order].
How much A got?

I: C + D = 135,000
i.e., A + B = 135,000. Insufficient.

II: A + D = 175,000
i.e., B + C = 95,000. Insufficient.

I + II:
C + D = 135,000
A + B = 135,000
A + D = 175,000
B + C = 95,000
Insufficient.
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A sum of $270,000 from a certain estate was divided among four childre 19 Jun 2017, 08:25
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Hi Bunuel is it safe to say the option is not c because it doesn't state the in the first stem, the estate was divided equally?
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A sum of $270,000 from a certain estate was divided among four childre 19 Jun 2017, 08:47
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kanaav
A sum of $270,000 from a certain estate was divided among four children. How much of the estate did the oldest child receive?

(1) The two younger children together received half of the estate.
(2) The oldest and the youngest of the children together received $175,000.

Hi Bunuel is it safe to say the option is not c because it doesn't state the in the first stem, the estate was divided equally?
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This is not the only reason. If we knew that the estate was divided equally, then we would not need the statements to answer the question.

When combined we have:

a + b + c + d = 270 (from the stem) (the order is from oldest to youngest)
c + d = 135 (from the first statement)
a + d = 175 (from the second statement)

We want the value of a, which we cannot get from the equation above.
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A sum of $270,000 from a certain estate was divided among four childre 19 Jun 2017, 09:00
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Statement 1. The older two children received the other half (1/2 * 270000 = 135000 combined) but we don't know how that was divided between those two. So Insufficient.

Statement 2. Sum total of eldest and youngest is 175000, but again we don't know how that 175000 has been divided between them. So Insufficient.

Combining the two statements: Youngest and second youngest together have 135000, but out of this how much youngest one has we don't know. So we cannot answer the share of youngest and eldest out of the 175000 that they have together.

Insufficient still. Hence E answer
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A sum of $270,000 from a certain estate was divided among four childre 06 Jul 2017, 17:53
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Bunuel
A sum of $270,000 from a certain estate was divided among four children. How much of the estate did the oldest child receive?

(1) The two younger children together received half of the estate.
(2) The oldest and the youngest of the children together received $175,000.
Show more

We can let a = the amount received by the oldest child, b = the amount received by the second oldest, c = the amount received by the third oldest, and d = the amount received by the fourth oldest. Since the total was 270,000, we have:

a + b + c + d = 270,000

We need to determine the value of a.

Statement One Alone:

The two younger children together received half of the estate.

Since the two younger children received half of the estate, c + d = 135,000. However, we still cannot determine the value of a. Statement one alone is not sufficient.

Statement Two Alone:

The oldest and the youngest of the children together received $175,000.

Since the oldest and the youngest of the children together received $175,000, a + d = 175,000. However, we still cannot determine a.

Statements One and Two Together:

We have the following three equations:

a + b + c + d = 270,000

c + d = 135,000

a + d = 175,000

However, without any further information on b, we cannot determine a.

Answer: E
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A sum of $270,000 from a certain estate was divided among four childre 07 Feb 2026, 05:50
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