- Posts: 3
- Joined: Nov 25, 2018
- Tue Jan 07, 2020 1:45 pm
#73112
Even with this and other threads, I can't convince myself than any of the answer choices are remotely correct, but more than that, am still convinced (A) and (C) are identical (and therefore neither can be correct), and (B) is better anyway.
I'm usually good at LR; in the last 51 timed PTs I've taken, I've averaged -1.15686 per LR section, to be pointlessly specific. But no amount of time or reading has convinced me on this one, and the nerves on test day make the possibility I get routinely tripped up much higher. So I'm trying to at least feel confident in the belief I am capable of understanding every LR question, given unlimited time.
Alright, thanks for coming to my TED talk, now here's my issue, and I'm hoping you can help me out:
Three quantities are required to calculate government revenue from a sales tax: (1) the rate of the tax, (2) the price that the tax is calculated from (the price of the good), and (3) the quantity sold of the good.
(A) gives you a very rough estimate of (1), i.e., it will answer whether the tax rate is greater, or else lesser, than the tax rate on the current goods. (C) gives you an equally rough estimate of (3), i.e., it is either lower, or else not lower than the current quantity sold.
Either of these in isolation, barring some predictive model about consumer behavior tells you absolutely nothing about the relative size of the tax revenue, and whether or not it is significant.
Let's say the quantity remains the same. Well, if the tax is negligible in size, the revenue raised will not be significant, and, for the quantity to remain the same, the tax is likely negligible in size.
Let's say the quantity decreases (the obvious alternative). Well, if the tax is large enough that the revenue is still "significant," then the government official is correct even though the answer seems to discredit his assertion.
For exactly the same reason, the answer to (A) is equally devoid of useful information. The rate is either higher, or lower, than another rate. But without knowing the quantity, we can't know if the revenue raised is significant. The answer choices are logically equivalent in that they each tell you a necessarily dependent part of the information needed to assess the proposal, let alone that they both leave out the third necessary component: the price of the good (since rates are rates).
So, the only one that could possibly actually reveal useful information is (B), because at least if the answer is "yes," then it is sure that the assertion is correct. If it is "no," then at least one of the essentially infinite possible outcomes that confirms the assertion has been ruled out, making it infinitesimally less likely that the assertion is true.
The only interpretation that could seemingly justify either (A) or (C) (and it's the same interpretation, because they're logically equivalent) is that, rather than a "yes" or "no" answer, you are given a specific number, in which case you could at least make some judgment if either number were especially unreasonable.
But under this assumption, B is still the better answer, and by an even larger margin. Because if you're given an actual number, you can be certain whether or not the assertion about the proposal is, in fact, correct.
There is one situation that justifies C that I have concocted out of desperation, but it involves making inferences about the world outside the stimulus, and that is: you could look up the content of the bill, and therefore, knowing the rate is automatically possible. But I fail to see any reason why you couldn't then argue you could use a predictive model based on knowing the rate (A) to calculate the likely quantity and again, get the same information, albeit very, very slightly less certainly, since the latter involves a prediction.
Edit: Actually, I should note, the answer to (A) can only tell you higher/not higher, while (C) can only tell you equal/not equal, which is actually worse. Neither can give you any of the three possibilities (higher/lower/same). But at least in (A), the numeric range of the possibilities is smaller.
Others have brought in economic theory, so you could argue luxury goods have elastic demand, or just appeal to the fact that this happened in real life and failed and is taught in every econ 101 class. But perhaps the proposal is enumerating mutually independent possibilities, so just jewels are taxed, and those don't involve domestic labor to mine, and only rich jewelers handle them once they reach the country in question, so the blue collar shipbuilder argument is moot then also. In fact, since luxury goods in general are mentioned, ones not even on the list might be taxed as well.
Irregardless of all of the above, the question seems to come down to which answer is (100 - ε)% wrong, and which one is 100% wrong.
I'm usually good at LR; in the last 51 timed PTs I've taken, I've averaged -1.15686 per LR section, to be pointlessly specific. But no amount of time or reading has convinced me on this one, and the nerves on test day make the possibility I get routinely tripped up much higher. So I'm trying to at least feel confident in the belief I am capable of understanding every LR question, given unlimited time.
Alright, thanks for coming to my TED talk, now here's my issue, and I'm hoping you can help me out:
Three quantities are required to calculate government revenue from a sales tax: (1) the rate of the tax, (2) the price that the tax is calculated from (the price of the good), and (3) the quantity sold of the good.
(A) gives you a very rough estimate of (1), i.e., it will answer whether the tax rate is greater, or else lesser, than the tax rate on the current goods. (C) gives you an equally rough estimate of (3), i.e., it is either lower, or else not lower than the current quantity sold.
Either of these in isolation, barring some predictive model about consumer behavior tells you absolutely nothing about the relative size of the tax revenue, and whether or not it is significant.
Let's say the quantity remains the same. Well, if the tax is negligible in size, the revenue raised will not be significant, and, for the quantity to remain the same, the tax is likely negligible in size.
Let's say the quantity decreases (the obvious alternative). Well, if the tax is large enough that the revenue is still "significant," then the government official is correct even though the answer seems to discredit his assertion.
For exactly the same reason, the answer to (A) is equally devoid of useful information. The rate is either higher, or lower, than another rate. But without knowing the quantity, we can't know if the revenue raised is significant. The answer choices are logically equivalent in that they each tell you a necessarily dependent part of the information needed to assess the proposal, let alone that they both leave out the third necessary component: the price of the good (since rates are rates).
So, the only one that could possibly actually reveal useful information is (B), because at least if the answer is "yes," then it is sure that the assertion is correct. If it is "no," then at least one of the essentially infinite possible outcomes that confirms the assertion has been ruled out, making it infinitesimally less likely that the assertion is true.
The only interpretation that could seemingly justify either (A) or (C) (and it's the same interpretation, because they're logically equivalent) is that, rather than a "yes" or "no" answer, you are given a specific number, in which case you could at least make some judgment if either number were especially unreasonable.
But under this assumption, B is still the better answer, and by an even larger margin. Because if you're given an actual number, you can be certain whether or not the assertion about the proposal is, in fact, correct.
There is one situation that justifies C that I have concocted out of desperation, but it involves making inferences about the world outside the stimulus, and that is: you could look up the content of the bill, and therefore, knowing the rate is automatically possible. But I fail to see any reason why you couldn't then argue you could use a predictive model based on knowing the rate (A) to calculate the likely quantity and again, get the same information, albeit very, very slightly less certainly, since the latter involves a prediction.
Edit: Actually, I should note, the answer to (A) can only tell you higher/not higher, while (C) can only tell you equal/not equal, which is actually worse. Neither can give you any of the three possibilities (higher/lower/same). But at least in (A), the numeric range of the possibilities is smaller.
Others have brought in economic theory, so you could argue luxury goods have elastic demand, or just appeal to the fact that this happened in real life and failed and is taught in every econ 101 class. But perhaps the proposal is enumerating mutually independent possibilities, so just jewels are taxed, and those don't involve domestic labor to mine, and only rich jewelers handle them once they reach the country in question, so the blue collar shipbuilder argument is moot then also. In fact, since luxury goods in general are mentioned, ones not even on the list might be taxed as well.
Irregardless of all of the above, the question seems to come down to which answer is (100 - ε)% wrong, and which one is 100% wrong.
