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#23441
Complete Question Explanation

Assumption-#%. The correct answer choice is (D)

The argument is that since over half of smoke detectors are inoperative or without batteries, the fact that there has been a 15% increase in the number of homes with smoke detectors does not improve the likelihood of early house-fire detection.

The argument seems to imply that since there is currently at least a 50% disuse rate, a 15% increase cannot compensate. However, that only makes sense if we assume that, 10 years ago, there was a significantly lower disuse rate. For example, if 10 years ago the disuse rate was also around 50%, the 15% increase in the number of houses with smoke-detectors does change the likelihood of early detection. The question asks you to identify that assumption.

In attacking this question, consider the nature of the ideas in play. You have a discussion about percentages in the premises and conclusion of the stimulus, and then you are asked for an Assumption of the argument. Chances are extremely high that the assumption revolves around what's been happening with the percentages. Answer choices (B) and (C) are about actual numbers, and thus less likely here to be the assumption. (A) is about installation, and thus not all that likely to be correct. Answer choice (E) is about a comparison to water sprinklers, which the author didn't address and so this is unlikely to be an assumption. Thus, just from surveying the answers and thinking about what types of things the author has to be thinking, answer choice (D) is the most promising answer.

If you are looking for a full numerical confirmation of how the problem works, one of our instructors provided the following scenario:

  • Let's say we have 100 homes. 10 years ago, only 30 of them had smoke detectors; today, that number is 45:

    TOTAL # of houses: 100
    % of houses with detectors: 30% in 2002 vs. 45% in 2012
    # of houses with detectors: 30 vs. 45

    Because over half of them are inoperative, however, the author is concluding that detection of house fires today is no more likely than it was ten years ago (i.e., that the number of houses with operative detectors has not changed significantly over the years).

    This is a horrible argument, because we don't know how the ratio of operative vs. inoperative smoke detectors has changed over the last 10 years. If the proportion of inoperative detectors remained the same (let's say a little over 50% for both years), only 15 houses would have been safe ten years ago, vs. 23 houses today. Clearly, early detection of house fires would be more likely today than it was in the past, weakening the conclusion of the argument:

    Hypothetical 1:

    % of houses with inoperative detectors: 50%+ in 2002 and in 2012
    # of unsafe houses: 15 in 2002 vs. 23 in 2012
    # of safe houses: 15 in 2002 vs. 22 in 2012 (i.e. early detection is more likely today than before)

    For the conclusion to be valid, we need to rule out the possibility of the above-mentioned hypothetical. To do so, we need to assume that the proportion of inoperative detectors has actually increased, while the proportion of operative detectors decreased. That way, the number of "safe houses" can remain the same despite the increase in the total number of houses equipped with detectors. Here's a hypo that would satisfy the provisions in this argument:

    Hypothetical 2:

    % of houses with inoperative detectors: 50%+ in 2002 vs. 67% in 2012
    # of unsafe houses: 15 in 2002 vs. 30 in 3012
    # of safe houses: 15 in 2002 vs. 15 in 2012 (i.e. early detection is no more likely today than before)

    Bottom line is, unless the percentage of inoperative detectors increases, the number of "safe houses" is bound to increase with the increased number of detectors installed. This is why answer choice (D) states an assumption of the argument. If you negate (D), you'll end up with Hypo 1, which undermines the conclusion of the argument.


Answer choice (A): Homes can have multiple smoke detectors, so this 15% is not necessarily the same as the 15% in the stimulus. If 15% of domestic smoke detectors were installed less than 10 years ago, that could make early detection more likely, since the equipment would be newer and possibly in better repair. Also, adding multiple detectors could increase the probability of detection. Either that is the case, or the 15% corresponds to nothing more but the increase in homes with smoke detectors. This response could attack or restate the stimulus, depending on some suppositions, but cannot provide support.

Answer choice (B): This does not support the conclusion that the likelihood of early detection has not increased. Since the fire has to occur before it can be detected, you should not conclude that more fires means less detection. This response gives you no reason to suppose that the fires were undetected and became severe.

Answer choice (C): This choice could be damaging to the stimulus, so you should eliminate it. If some of the detectors are not battery operated, a significant proportion of detectors without batteries might still be operational.

Answer choice (D): This is the correct answer choice. For the argument's conclusion to follow, it must be true that 10 years ago the proportion of inoperative smoke-detectors was lower than it was at the time of this argument.

Answer choice (E): Since the stimulus was about early detection, not overall fire safety, this response is irrelevant, and incorrect.
 niketown3000
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#3743
Q13: The number of smoke detectors has increased, but the likelihood remains the same.

I do not understand the answer choices, or the gap in reasoning that is assumed here. Please explain, thanks!

-Niel (Sorry for posting so much, but you guys are so helpful)
 Nikki Siclunov
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#3747
This is a numbers/percentages Assumption question.

Let's say we have 100 homes. 10 years ago, only 30 of them had smoke detectors; today, that number is 45:

TOTAL # of houses: 100
% of houses with detectors: 30% in 2002 vs. 45% in 2012
# of houses with detectors: 30 vs. 45

Because over half of them are inoperative, however, the author is concluding that detection of house fires today is no more likely than it was ten years ago (i.e., that the number of houses with operative detectors has not changed significantly over the years).

This is a horrible argument, because we don't know how the ratio of operative vs. inoperative smoke detectors has changed over the last 10 years. If the proportion of inoperative detectors remained the same (let's say a little over 50% for both years), only 15 houses would have been safe ten years ago, vs. 23 houses today. Clearly, early detection of house fires would be more likely today than it was in the past, weakening the conclusion of the argument:

Hypothetical 1
:

% of houses with inoperative detectors: 50%+ in 2002 and in 2012
# of unsafe houses: 15 in 2002 vs. 23 in 2012
# of safe houses: 15 in 2002 vs. 22 in 2012 (i.e. early detection is more likely today than before)

For the conclusion to be valid, we need to rule out the possibility of the above-mentioned hypothetical. To do so, we need to assume that the proportion of inoperative detectors has actually increased, while the proportion of operative detectors decreased. That way, the number of "safe houses" can remain the same despite the increase in the total number of houses equipped with detectors. Here's a hypo that would satisfy the provisions in this argument:


Hypothetical 2
:

% of houses with inoperative detectors: 50%+ in 2002 vs. 67% in 2012
# of unsafe houses: 15 in 2002 vs. 30 in 3012
# of safe houses: 15 in 2002 vs. 15 in 2012 (i.e. early detection is no more likely today than before)

Bottom line is, unless the percentage of inoperative detectors increases, the number of "safe houses" is bound to increase with the increased number of detectors installed. This is why answer choice (D) states an assumption of the argument. If you negate (D), you'll end up with Hypo 1, which undermines the conclusion of the argument.

If this question seemed difficult, go back to Lesson 9 (Numbers/Percentages) and review the material in the homework section of the lesson.

Good luck!
 voodoochild
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#3979
I was able to arrive at the correct answer. However, how could it be possible, mathematically speaking, that over half of domestic sprinklers are out of order, but the likelihood hasn't changed?

For instance, in 2000 - Total sprinklers = 100; Good (in theory) = 45 and Bad =55
In 1990 - Total = 100; Good = 30 and Bad = 70;

1/2 of sprinklers in the year 2000 don't work. Therefore, the new number =22 (Say)

Therefore, Good =23 and Bad = 55+22 = 77;

Still the likelihood of detection is less and not equal because in 1990 we had 30 good sprinklers but now, say in 2000, we have only 23 sprinklers? How's that possible. Am I missing anything. Please help me.

Thanks
Voodoo
 Steve Stein
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#3987
Thanks for your question. Let's consider the facts that have been provided, and what's missing:

A decade ago, 30% of homes had detectors.

Today, 45% of homes have detectors.
The author concludes that fire detection is no better today, though, because most of today's detectors are inoperable.

So, what's missing? The author is complaining about the portion of today's detectors that are inoperable--but what about ten years ago? If hypothetically, none of those worked properly, then the author's conclusion (that we are no better off today) would fail. If a decade ago the detectors all worked properly, then that would of course support the author's conclusion.

Let me know whether that makes that one any clearer--thanks!

~Steve
 saygracealways
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#75110
Hi Powerscore,

I understand that (B) is incorrect because the # of fires in houses with smoke detectors is irrelevant to the early detection rate (%). However, would it be safe to eliminate this AC immediately just by looking at "number" in the answer choice and thinking that we can not make an assumption about any numbers since the stimulus contains information only on percentages/likelihood?

Thank you!
 nusheenaparvizi
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#75564
Hi,

I had the same question as saygracealways! Please let us know your thoughts, thanks!
 Adam Tyson
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#75655
I think that is a good reason to eliminate answer B, saygracealways and nusheenaparvizi! It's not about how many fires, but about the likelihood (a percentages idea) that we will detect them early. Well done!
 g_lawyered
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#86410
Hi PS,
This question really tripped me up because I missed the keyword of "over half" meaning over 50% in the conclusion. However, I was able to narrow down my contenders to answer choice B or D. The mathematical explanation above is too confusing to me so I'm trying to understand why the correct answer choice is correct using the Negation Technique. I dont understand how if we deny answer D that destroys the conclusion? Meaning to say "the proportion (meaning %) of domestic smoke detectors that are inoperative hasn't increased (Meaning have decreased) in the past 10 years. How does that affect the conclusion about the smoke detectors that are inoperative TODAY?
What am I missing here? :-?

Thanks
 g_lawyered
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#86411
To add to my previous post ^^.
If I recall correctly from the misconceptions from this lesson 9, knowing the TOTAL number of what's in stimulus is important in order to be able to conclude about a % or #. In this case, the argument is strictly about %. (it doesn't mention total number of smoke detectors). Does knowing the total number of smoke dectectors affect concluding about the % of smoke dectectors or not? I'm not sure if I'm understanding this concept correctly. Please help. :-?
Thanks

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