Self-study
Putting a tap in a healthy maple that has a trunk 12 or more inches in diameter will not harm the tree. ββββββ βββββββ βββ βββββββ βββ ββββββββ ββββββ βββ βββ ββ ββββββ βββ ββββββ βββββ ββββββ βββ βββββ ββββββ ββββββββ ββ ββββ βββ βββββ βββββββ βββββββ ββ βββ βββ ββββββ βββ βββ βββ βββ βββββββ βββββββββββββ ββ ββββββ
Objective: Must Be True Questions
Must Be True questions present a series of claims in the stimulus, then ask us to provide an additional claim that can be validly inferred (i.e. on the spectrum of support, our answer choice must be super-duperly supported).
So it’s highly beneficial to spend time up front wrapping your head around the stimulus – simplifying or diagramming grammatically-complex claims, splitting out combined claims into two or more separate claims, etc. – and the dream is to generate your own inference(s) to proactively seek out in the answer choices.
That’s not always practical (sometimes it’s just hard, and sometimes there are too many to track), in which case using process of elimination – measuring each answer choice against the stimulus to ask “does this follow?” – is completely fine. But process of elimination or no, you need a crystal clear understanding of the stimulus.
As you evaluate the answer choices, remember that in general, weak claims are more likely to be true than strong claims β even without context, it is more likely that some glubsters are flubsters than it is that all glubsters are flubsters.
Distilling The Premises
In this question, knowing when you can and cannot split up complex claims is quite important. Behold:
Sentence 1
If a maple is healthy and it’s big, tapping it won’t harm the maple.
(It turns out Sentence 1 is quite important, so hereβs the contrapositive for your convenience:)
If you harmed a maple by tapping it, it was either unhealthy or not big.
Sentence 2
Silver maples can be tapped.
Red maples can be tapped.
Manitoba maples can be tapped.
Sentence 3
Sugar maple best maple.
Sugar maple most sugar.
Notice how we didn’t split the first sentence up, but did split up the second. That’s because these claims have different logical structures. In Sentence 1, both terms in the sufficient condition (i.e. healthy & big) must be fulfilled to trigger the necessary condition (no harm). In Sentence 2, you don’t need to be a silver maple and and red maple and a Manitoba maple to be tapped – any of them can be tapped.
(It turns out Sentence 2 doesn’t matter at all in this question, but still.)
Anticipating the correct answer’s particular inference (or forming the broad idea that it’ll be related to Sentence 1) is somewhat reasonable here, but as long as you’ve boiled these claims down so you have them clear in your head (or on paper), you’ll be all right.
18.
If the statements above are βββββ βββββ βββ ββ βββ βββββββββ ββββ ββββ ββ βββββ
a
A maple whose βββββ ββ ββββ ββββ ββ ββββββ ββ ββββββββ ββ βββββββββ ββ ββ ββ ββββββ ββ ββββββββ
PART 1: WTF DOES (A) EVEN SAY?!?
On a cold read of (A), you might have parsed it this way, either in your head or in your formal diagram:
Hard-Mode English: If you Tapped a maple and you Harmed it, then if itβs Big, itβs Unhealthy.
Hard-Mode Logic: Tapped & Harmed β (Big β Unhealthy)
Thatβs rough to work with. But there are a few (albeit advanced) techniques to translate embedded conditionals like this one into forms that are much easier to comprehend. The linked lesson gives a thorough guide to all the moves youβre allowed to make. Here weβre just gonna use some of them and explain why they work.
First, you can get rid of the whole Tapped term by folding it into Harmed, because weβre never dealing with a situation in which the maple isnβt tapped. Weβre always tapping the maple. So βHarmedβ just means βHarmed-by-tappingβ now, okay?
Better-Mode English: If you Harmed a maple, then if itβs Big, itβs Unhealthy.
Better-Mode Logic: Harmed β (Big β Unhealthy)
Now youβre allowed to move βBigβ from the right side to the left and connect it with an βand,β like so:
Best-Mode English: If you Harmed a maple and itβs Big, then itβs Unhealthy.
Best-Mode Logic: Harmed & Big β Unhealthy
Why? Test it out by looking at the Better-Mode version again. Learning that something is Harmed triggers the big rule, and then learning itβs Big triggers the smaller rule, making the thing Unhealthy.
PART 2: WHY (A) MUST BE TRUE
So letβs work with that reading of (A): If you harm a big maple, it must be unhealthy.
As it happens, I own a maple tree. Itβs a big maple tree, and I would love to tap it to make some syrup, but I really donβt want to harm it because it was my grandmotherβs tree.
Well Sentence 1 says that if you check two boxes you 100% for sure will not harm the tree. The two boxes are big (oh nice my tree is big) and healthy (I have gotten bored and started skimming).
Soβ¦ my tree is good, right? Letβs go make some syrup!
But oh no! Turns out we harmed the tree. I thought we were 100% good if we checked the boxes, though! Why didnβt the no harm guarantee apply to my situation?
Well, it wasnβt the big box β my tree is big. So it must have been the healthy box.
My tree must be unhealthy, because otherwise the βno harm guaranteeβ would apply.
b
The healthiest maple βββββ βββ βββββββ βββββ ββββ βββ βββββββ βββββββ
There are some absolute vs. relative shenanigans afoot here. The stimulus does feature some relative claims (e.g. Sugar maple best maple), but the claims about health and size are absolute: a tree is either healthy or itβs not, itβs either 12in+ or itβs not. This pattern β attempting to draw relative inferences from absolute claims β is common in MBT and MSS wrong answer choices.
c
A maple tree ββββ βββ ββββ ββββββ ββββ βββββββ ββββ ββββββ ββββ
(C) might be a true claim in the real world, but that doesnβt make it a valid inference from our premises.
The concept of a lot of sap / a little sap never appears in the stimulus. The closest we get the claim about sugar maples β they have a lot of sugar in their sap.
You canβt draw a valid inference about a concept that never appears in the stimulus.
d
Putting a tap ββββ ββ βββββββββ βββββ ββββ ββββ ββ ββββ ββββ ββ ββββββ ββ ββββββββ ββββ ββββ βββ
This applies the inverse of Sentence 1, which is a nono.
Sentence 1: If a maple is healthy and itβs big, tapping it wonβt harm the maple.
(D): If a maple is unhealthy and itβs small, tapping it will harm the maple.
e
The maple trees ββββ ββββββββ ββββ βββ ββββββ βββββ βββ βββββ βββββββ
(E) might be a reasonable thing to think given the facts weβre presented. If the sugar maple really is the best maple, it would make sense that itβs the most used kind of maple.
But weβre lawyers, baby! Weβre not getting paid to be reasonable, weβre getting paid to be nitpicky! In a MBT question, the introduction of any assumption β no matter how reasonable β kills the answer choice. The assumption that good trees are commonly used, reasonable though it may be, makes (E)βs inference fall short of validity.