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| − | What is the unit digit of <math>1434^{1434}</math>?
| + | {{duplicate|[[2024 AMC 10A Problems/Problem 15|2024 AMC 10A #15]] and [[2024 AMC 12A Problems/Problem 9|2024 AMC 12A #9]]}} |
| − | | + | ==Problem== |
| − | ==Solution
| + | Let <math>M</math> be the greatest integer such that both <math>M+1213</math> and <math>M+3773</math> are perfect squares. What is the units digit of <math>M</math>? |
| − | Since 1434 ends in a 4, all we need to know is the units digit of powers of 4
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| − | 4^1 = 4
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| − | 4^2 = 16
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| − | 4^3 = 64
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| − | 4^4 = 256
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| − | As you can see every ever power of 4 has a units digit of 6 and every odd power of 4 has a units digit of 4. As 1434 is even 1434^1434 has a units digit of 6
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| − | mogging caseoh skibidi (toilet) rizz on ohio paging baby gronk paging fanum tax ur mom e
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| − | sus rbo xooks xoinks xonkers
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| − | | |
| − | ==Solution 9==
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| − | By the Ohio theorem, the answer is clearly not 6969420, or 42069. We can apply the Skibidi Slicers theorem to then, get the answer of <math>\boxed{\text{Baby Gronk - Livvy Dunne}}</math>
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| | + | <math>\textbf{(A) }1\qquad\textbf{(B) }2\qquad\textbf{(C) }3\qquad\textbf{(D) }6\qquad\textbf{(E) }8</math> |
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| | ==Solution 1== | | ==Solution 1== |
| − | Sigma ohio inequality states that <math>b\text{Sigma}^{a}\leq \sqrt{\text{Ohio}^{ab} \text{Mogging caseoh}} \leq +10000b \text{aura}</math>
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| − | <math>\forall a,b \in \mathbb{SIGMA}</math>
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| − | <math>\boxed{\textbf{(D)}+\infty \text{ aura}}</math>
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| − |
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| − | ==Solution -1434==
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| − | Using the brainrot theorem, we can see that the spheres are forming an exponential function, so we divide by the rizzler, and then multiply it by ohio. So the answer is <math>\boxed{D, 1434}</math>
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| − |
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| − | ==Solution 5==
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| − | ?????????? wtf bro <math>\textbf{(D)}</math> skibidi toilet will be mine
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| − |
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| − | ==Solution 6==
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| − | we do the thing (compose the gyatt theorem into the rizzler function) and it works, then apply fanum tax and tensor product <math>\otimes</math> with the mythical Ohio Grassman to yield
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| − | <math>\boxed{\textbf{(D)}\frac{1}{0}}</math>
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| − |
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| − | ==Solution CHESS==
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| − | Are you kidding ??? What the **** are you talking about man ? You are a biggest looser i ever seen in my life ! You was doing PIPI in your pampers when i was beating players much more stronger then you! You are not proffesional, because proffesionals knew how to lose and congratulate opponents, you are like a girl crying after i beat you! Be brave, be honest to yourself and stop this trush talkings!!! Everybody know that i am very good blitz player, i can win anyone in the world in single game! And "w"esley "s"o is nobody for me, just a player who are crying every single time when loosing, ( remember what you say about Firouzja ) !!! Stop playing with my name, i deserve to have a good name during whole my chess carrier, I am Officially inviting you to OTB blitz match with the Prize fund! Both of us will invest 5000<math> and winner takes it all!
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| − | I suggest all other people who's intrested in this situation, just take a look at my results in 2016 and 2017 Blitz World championships, and that should be enough... No need to listen for every crying babe, Tigran Petrosyan is always play Fair ! And if someone will continue Officially talk about me like that, we will meet in Court! God bless with true! True will never die ! Liers will kicked off...
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| − | ==Solution 732==
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| − | because skibidi toilet will be mine now, we use the Fanum Formula to find that the area of triangle OHI with O as its right angle has area 1434^2. From here, we plug it into the Rizzler Remainder Rule to find that the perimeter of pentagon SIGMA can equal none of the answer choices but </math>\boxed{{(Z)} Gyatt}<math>
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| − |
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| − | ==Solution 1434==
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| − | May I have your attention, please?
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| − | May I have your attention, please?
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| − | Will the real Slim Shady please stand up?
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| − |
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| − | I repeat
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| − |
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| − | Will the real Slim Shady please stand up?
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| − |
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| − | We're gonna have a problem here
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| − |
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| − |
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| − | Y'all act like you never seen a white person before
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| − |
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| − | Jaws all on the floor like Pam, like Tommy just burst in the door
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| − |
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| − | And started whoopin' her *ss worse than before
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| − |
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| − | They first were divorced, throwin' her over furniture (Agh)
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| − |
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| − | It's the return of the"Oh, wait, no way, you're kidding
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| − |
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| − | He didn't just say what I think he did, did he?"
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| − |
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| − | And Dr. Dre said
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| − | Nothing, you idiots, Dr. Dre's dead, he's locked in my basement (Ha-ha)
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| − |
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| − | Feminist women love Eminem
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| − |
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| − | "Chicka-chicka-chicka, Slim Shady,I'm sick of him
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| − |
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| − | Look at him, walkin' around, grabbin' his you-know-what
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| − |
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| − | Flippin' the you-know-who", "Yeah, but he's so cute though"
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| − |
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| − | Yeah, I probably got a couple of screws up in my head loose
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| − |
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| − | But no worse than what's goin' on in your parents' bedrooms
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| − |
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| − | Sometimes I wanna get on TV and just let loose
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| − |
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| − | But can't, but it's cool for Tom Green to hump a dead moose
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| − |
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| − | "My bum is on your lips, my bum is on your lips"
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| − |
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| − | And if I'm lucky, you might just give it a little kiss
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| − |
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| − | And that's the message that we deliver to little kids
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| − |
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| − | And expect them not to know what a woman's clitoris is
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| − |
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| − | Of course, they're gonna know what intercourse is
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| − |
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| − | By the time they hit fourth gradethey've got the Discovery Channel, don't they?
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| − |
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| − | We ain't nothin' but mammals
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| − |
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| − | Well, some of us cannibals who cut other people open like cantaloupes
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| − |
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| − | But if we can hump dead animals and antelopes
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| − |
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| − | Then there's no reason that a man and another man can't elope
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| − |
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| − | But if you feel like I feel, I got the antidote
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| − |
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| − | Women, wave your pantyhose, sing the chorus, and it goes
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| − |
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| − | See Eminem Live
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| − |
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| − | Get tickets as low as </math>99
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| − |
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| − | You might also like
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| − |
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| − | Without Me
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| − |
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| − | Eminem
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| − |
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| − | Habits
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| − |
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| − | Eminem & White Gold
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| − |
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| − | But Daddy I Love Him
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| − |
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| − | Taylor Swift
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| − |
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| − |
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| − | I'm Slim Shady, yes, I'm the real Shady
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| − |
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| − | All you other Slim Shadys are just imitating
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| − |
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| − | So won't the real Slim Shady please stand up
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| − |
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| − | Please stand up, please stand up?
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| − |
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| − | 'Cause I'm Slim Shady, yes, I'm the real Shady
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| − |
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| − | All you other Slim Shadys are just imitating
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| − |
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| − | So won't the real Slim Shady please stand up
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| − |
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| − | Please stand up, please stand up?
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| − |
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| − |
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| − | Will Smith don't gotta cuss in his raps to sell records (Nope)
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| − |
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| − | Well, I do, so f**k him, and f**k you too
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| − |
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| − | You think I give a damn about a Grammy?
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| − |
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| − | Half of you critics can't even stomach me, let alone stand me
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| − |
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| − | "But Slim, what if you win? Wouldn't it be weird?"
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| − |
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| − | Why? So you guys could just lie to get me here?
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| − |
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| − | So you can sit me here next to Britney Spears?
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| − |
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| − | Yo, shit, Christina Aguilera better switch me chairs
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| − |
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| − | So I can sit next to Carson Daly and Fred Durst
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| − |
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| − | And hear 'em argue over who she gave head to first
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| − |
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| − | Little b**ch put me on blast on MTV
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| − |
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| − | "Yeah, he's cute, but I think he's married to Kim, hee-hee"
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| − |
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| − | I should download her audio on MP3
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| − |
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| − | And show the whole world how you gave Eminem VD (Agh)
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| − |
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| − | I'm sick of you little girl and boy groups, all you do is annoy me
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| − |
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| − | So I have been sent here to destroy you
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| − |
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| − | And there's a million of us just like me
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| − |
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| − | Who cuss like me, who just don't give a f**k like me
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| − |
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| − | Who dress like me, walk, talk and act like me
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| − |
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| − | And just might be the next best thing, but not quite me
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| − |
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| − |
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| − | 'Cause I'm Slim Shady, yes, I'm the real Shady
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| − |
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| − | All you other Slim Shadys are just imitating
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| − |
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| − | So won't the real Slim Shady please stand up
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| − |
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| − | Please stand up, please stand up?
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| − |
| |
| − | 'Cause I'm Slim Shady, yes, I'm the real Shady
| |
| − |
| |
| − | All you other Slim Shadys are just imitating
| |
| − |
| |
| − | So won't the real Slim Shady please stand up
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| − |
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| − | Please stand up, please stand up?
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| − |
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| − |
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| − | I'm like a head trip to listen to
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| − |
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| − | 'Cause I'm only givin' you things you joke about with your friends inside your livin' room
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| − |
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| − | The only difference is I got the balls to say it in front of y'all
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| − |
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| − | And I don't gotta be false or sugarcoat it at all
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| − |
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| − | I just get on the mic and spit it
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| − |
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| − | And whether you like to admit it (Err), I just s**t it
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| − |
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| − | Better than ninety percent of you rappers out can
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| − |
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| − | Then you wonder, "How can kids eat up these albums like Valiums?"
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| − |
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| − | It's funny, 'cause at the rate I'm goin', when I'm thirty
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| − |
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| − | I'll be the only person in the nursin' home flirting
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| − |
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| − | Pinchin' nurse's *sses when I'm jacking off with Jergens
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| − |
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| − | And I'm jerking, but this whole bag of Viagra isn't working
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| − |
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| − | And every single person is a Slim Shady lurkin'
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| − |
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| − | He could be working at Burger King, spittin' on your onion rings (Ch, puh)
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| − |
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| − | Or in the parkin' lot, circling, screaming, "I don't give a f**k!"
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| − |
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| − | With his windows down and his system up
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| − |
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| − | So will the real Shady please stand up
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| − |
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| − | And put one of those fingers on each hand up?
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| − |
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| − | And be proud to be out of your mind and out of control
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| − |
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| − | And one more time, loud as you can, how does it go?
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| | | | |
| | + | Let <math>M+1213=P^2</math> and <math>M+3773=Q^2</math> for some positive integers <math>P</math> and <math>Q.</math> We subtract the first equation from the second, then apply the difference of squares: <cmath>(Q+P)(Q-P)=2560.</cmath> Note that <math>Q+P</math> and <math>Q-P</math> have the same parity, and <math>Q+P>Q-P.</math> |
| | | | |
| − | I'm Slim Shady, yes, I'm the real Shady
| + | We wish to maximize both <math>P</math> and <math>Q,</math> so we maximize <math>Q+P</math> and minimize <math>Q-P.</math> It follows that |
| | + | <cmath>\begin{align*} |
| | + | Q+P&=1280, \\ |
| | + | Q-P&=2, |
| | + | \end{align*}</cmath> |
| | + | from which <math>(P,Q)=(639,641).</math> |
| | | | |
| − | All you other Slim Shadys are just imitating
| + | Finally, we get <math>M=P^2-1213=Q^2-3773\equiv1-3\equiv8\pmod{10},</math> so the units digit of <math>M</math> is <math>\boxed{\textbf{(E) }8}.</math> |
| | | | |
| − | So won't the real Slim Shady please stand up
| + | ~MRENTHUSIASM ~Tacos_are_yummy_1 |
| | | | |
| − | Please stand up, please stand up?
| + | ==Solution 2== |
| | | | |
| − | 'Cause I'm Slim Shady, yes, I'm the real Shady
| + | Ideally, we would like for the two squares to be as close as possible. The best case is that they are consecutive squares (no square numbers in between them); however, since <math>M+1213</math> and <math>M+3773</math> (and thus their squares) have the same parity, they cannot be consecutive squares (which are always opposite parities). The best we can do is that <math>M+1213</math> and <math>M+3773</math> have one square in between them. |
| | | | |
| − | All you other Slim Shadys are just imitating
| + | Let the square between <math>M+1213</math> and <math>M+3773</math> be <math>x^2</math>. So, we have <math>M+1213 = (x-1)^2</math> and <math>M+3773 = (x+1)^2</math>. Subtracting the two, we have <math>(M+3773)-(M+1213) = (x+1)^2 - (x-1)^2</math>, which yields <math>2560 = 4x</math>, which leads to <math>x = 640</math>. Therefore, the two squares are <math>639^2</math> and <math>641^2</math>, which both have units digit <math>1</math>. Since both <math>1213</math> and <math>3773</math> have units digit <math>3</math>, <math>M</math> will have units digit <math>\boxed{\textbf{(E) }8}</math>. |
| | | | |
| − | So won't the real Slim Shady please stand up
| + | ~i_am_suk_at_math_2 (parity argument editing by Technodoggo) |
| | | | |
| − | Please stand up, please stand up?
| + | ==Solution 3== |
| | + | Let <math>M+1213=N^2</math> <math>\Rightarrow M+3773=(N+a)^2</math> |
| | | | |
| − | 'Cause I'm Slim Shady, yes, I'm the real Shady
| + | It is obvious that <math>a\neq1</math> by parity |
| | | | |
| − | All you other Slim Shadys are just imitating
| + | Thus, the minimum value of <math>a</math> is 2 |
| | + | Which gives us, |
| | + | <cmath>(N+a)^2-N^2=M+3773-(M+1213)</cmath> |
| | + | <cmath>4N+4=2560</cmath> |
| | + | <cmath>N=639</cmath> |
| | + | Plugging this back in, |
| | + | <cmath>M=N^2-1213 \space \mod \space 10</cmath> |
| | + | <cmath>M=8 \space \mod \space 10</cmath> |
| | + | Hence the answer <math>\boxed{\textbf{(E) }8}</math>. |
| | | | |
| − | So won't the real Slim Shady please stand up
| + | ~lptoggled |
| | | | |
| − | Please stand up, please stand up?
| + | - trevian1(minor edit) |
| | | | |
| − | 'Cause I'm Slim Shady, yes, I'm the real Shady
| + | ==Solution 4== |
| | | | |
| − | All you other Slim Shadys are just imitating
| + | Let <math>M+1213=n^2</math> and <math>M+3773=(n+1)^2</math> for some positive integer <math>n</math>. We do this because, in order to maximize <math>M</math>, the perfect squares need to be as close to each other as possible. We find that this configuration doesn't work, as when we subtract the equations, we have <math>2n+1=2560</math>; impossible. Then we try <math>M+3773=(n+2)^2</math>. Now we would have <math>4n+4=2560</math> which indeed works! <math>n=639</math>. |
| | | | |
| − | So won't the real Slim Shady please stand up
| + | Finally, we get <math>M=n^2-1213</math> so the units digit of <math>M</math> is <math>11-3=\boxed{\textbf{(E) }8}.</math> |
| | | | |
| − | Please stand up, please stand up?
| + | ~xHypotenuse |
| | | | |
| | + | ==Video Solution(Fast! About ⚡️ 3 min solve! ⚡️)== |
| | + | https://youtu.be/l3VrUsZkv8I |
| | | | |
| − | Ha-ha
| + | ~MC |
| | + | == Video Solution (⚡️ 4 min solve ⚡️)== |
| | | | |
| − | I guess there's a Slim Shady in all of us
| + | https://youtu.be/YgJ23mepN0Q |
| | | | |
| − | F**k it, let's all stand up
| + | <i>~Education, the Study of Everything</i> |
| | | | |
| − | ==Solution 14341434== | + | == Video Solution by Pi Academy == |
| − | 7:30 in the night
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| − | Ooo
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| − | Ooo
| |
| | | | |
| − | Skibidi toilet will be mine, yuh
| + | https://youtu.be/ABkKz0gS1MU?si=ZQBgDMRaJmMPSSMM |
| − | Ohio town, yeah
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| − | Diamonds to mine
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| − | I'm on that big sigma grind
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| − | Worried 'bout impostors
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| − | I'm way too sus, yeah
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| − | For sigma trust
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| | | | |
| − | Skibidi toilet will be mine, yuh
| + | == Video Solution 1 by Power Solve == |
| − | Ohio gyatt, rizz
| + | https://youtu.be/FvZVn0h3Yk4 |
| − | Rizzlers on my mind
| |
| | | | |
| − | Skibidi toilet will be mine, yeah
| + | ==Video Solution by SpreadTheMathLove== |
| − | When you're not around me
| + | https://youtu.be/CmIPAvwtWLA?si=ZCv3ypdDmCaV-aX3 |
| − | With sigmas on my mind
| |
| | | | |
| | + | ==Video Solution by Dr. David== |
| | + | https://youtu.be/XLoetj5obYE |
| | | | |
| − | Skibidi toilet will be mine, yuh
| + | ==See also== |
| − | Ohio gyatt, rizz
| + | {{AMC10 box|year=2024|ab=A|num-b=14|num-a=16}} |
| − | Rizzlers on my mind
| + | {{AMC12 box|year=2024|ab=A|num-b=8|num-a=10}} |
| − | Skibidi toilet will be mine
| + | {{MAA Notice}} |
- The following problem is from both the 2024 AMC 10A #15 and 2024 AMC 12A #9, so both problems redirect to this page.
Problem
Let 
be the greatest integer such that both 
and 
are perfect squares. What is the units digit of ?
Solution 1
Let 
and 
for some positive integers 
and 
We subtract the first equation from the second, then apply the difference of squares: ![\[(Q+P)(Q-P)=2560.\]](//latex.artofproblemsolving.com/8/0/8/808b886dfcc0c467f633a6e01b1d195b732cd4df.png)
Note that 
and 
have the same parity, and 
We wish to maximize both and 
so we maximize and minimize 
It follows that
from which 
Finally, we get 
so the units digit of is 
~MRENTHUSIASM ~Tacos_are_yummy_1
Solution 2
Ideally, we would like for the two squares to be as close as possible. The best case is that they are consecutive squares (no square numbers in between them); however, since and (and thus their squares) have the same parity, they cannot be consecutive squares (which are always opposite parities). The best we can do is that and have one square in between them.
Let the square between and be 
. So, we have 
and 
. Subtracting the two, we have 
, which yields 
, which leads to 
. Therefore, the two squares are 
and 
, which both have units digit 
. Since both 
and 
have units digit 
, will have units digit 
.
~i_am_suk_at_math_2 (parity argument editing by Technodoggo)
Solution 3
Let 
It is obvious that 
by parity
Thus, the minimum value of 
is 2
Which gives us,
![\[(N+a)^2-N^2=M+3773-(M+1213)\]](//latex.artofproblemsolving.com/2/2/7/2270b4c5eecaac125c469883e8a259bf9dc80eb7.png)
![\[4N+4=2560\]](//latex.artofproblemsolving.com/e/7/5/e755afe2cfc903583d925e6b9612901fb1a6b910.png)
![\[N=639\]](//latex.artofproblemsolving.com/e/d/8/ed8236f3d26551913a654f50511bba37d179700e.png)
Plugging this back in,
![\[M=N^2-1213 \space \mod \space 10\]](//latex.artofproblemsolving.com/b/6/c/b6c3904cbd111031276094111e3b1bac18821cc3.png)
![\[M=8 \space \mod \space 10\]](//latex.artofproblemsolving.com/3/f/e/3fea7eeed3647a49fdd175a64198fcd1dbc5fff0.png)
Hence the answer .
~lptoggled
- trevian1(minor edit)
Solution 4
Let 
and 
for some positive integer 
. We do this because, in order to maximize , the perfect squares need to be as close to each other as possible. We find that this configuration doesn't work, as when we subtract the equations, we have 
; impossible. Then we try 
. Now we would have 
which indeed works! 
.
Finally, we get 
so the units digit of is 
~xHypotenuse
Video Solution(Fast! About ⚡️ 3 min solve! ⚡️)
https://youtu.be/l3VrUsZkv8I
~MC
Video Solution (⚡️ 4 min solve ⚡️)
https://youtu.be/YgJ23mepN0Q
~Education, the Study of Everything
Video Solution by Pi Academy
https://youtu.be/ABkKz0gS1MU?si=ZQBgDMRaJmMPSSMM
Video Solution 1 by Power Solve
https://youtu.be/FvZVn0h3Yk4
Video Solution by SpreadTheMathLove
https://youtu.be/CmIPAvwtWLA?si=ZCv3ypdDmCaV-aX3
Video Solution by Dr. David
https://youtu.be/XLoetj5obYE
See also
These problems are copyrighted © by the Mathematical Association of America, as part of the American Mathematics Competitions. 
be the greatest integer such that both 
and 
are perfect squares. What is the units digit of 
and 
for some positive integers 
and 
We subtract the first equation from the second, then apply the difference of squares: ![\[(Q+P)(Q-P)=2560.\]](http://latex.artofproblemsolving.com/8/0/8/808b886dfcc0c467f633a6e01b1d195b732cd4df.png)
Note that 
and 
have the same parity, and 
so we maximize 
It follows that
from which 
so the units digit of 
. So, we have 
and 
. Subtracting the two, we have 
, which yields 
, which leads to 
. Therefore, the two squares are 
and 
, which both have units digit 
. Since both 
and 
have units digit 
, 
.
by parity
is 2
Which gives us,
![\[(N+a)^2-N^2=M+3773-(M+1213)\]](http://latex.artofproblemsolving.com/2/2/7/2270b4c5eecaac125c469883e8a259bf9dc80eb7.png)
![\[4N+4=2560\]](http://latex.artofproblemsolving.com/e/7/5/e755afe2cfc903583d925e6b9612901fb1a6b910.png)
![\[N=639\]](http://latex.artofproblemsolving.com/e/d/8/ed8236f3d26551913a654f50511bba37d179700e.png)
Plugging this back in,
![\[M=N^2-1213 \space \mod \space 10\]](http://latex.artofproblemsolving.com/b/6/c/b6c3904cbd111031276094111e3b1bac18821cc3.png)
![\[M=8 \space \mod \space 10\]](http://latex.artofproblemsolving.com/3/f/e/3fea7eeed3647a49fdd175a64198fcd1dbc5fff0.png)
Hence the answer 
and 
for some positive integer 
. We do this because, in order to maximize 
; impossible. Then we try 
. Now we would have 
which indeed works! 
.
so the units digit of 
