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k a March Highlights and 2025 AoPS Online Class Information
jlacosta   0
Mar 2, 2025
March is the month for State MATHCOUNTS competitions! Kudos to everyone who participated in their local chapter competitions and best of luck to all going to State! Join us on March 11th for a Math Jam devoted to our favorite Chapter competition problems! Are you interested in training for MATHCOUNTS? Be sure to check out our AMC 8/MATHCOUNTS Basics and Advanced courses.

Are you ready to level up with Olympiad training? Registration is open with early bird pricing available for our WOOT programs: MathWOOT (Levels 1 and 2), CodeWOOT, PhysicsWOOT, and ChemWOOT. What is WOOT? WOOT stands for Worldwide Online Olympiad Training and is a 7-month high school math Olympiad preparation and testing program that brings together many of the best students from around the world to learn Olympiad problem solving skills. Classes begin in September!

Do you have plans this summer? There are so many options to fit your schedule and goals whether attending a summer camp or taking online classes, it can be a great break from the routine of the school year. Check out our summer courses at AoPS Online, or if you want a math or language arts class that doesn’t have homework, but is an enriching summer experience, our AoPS Virtual Campus summer camps may be just the ticket! We are expanding our locations for our AoPS Academies across the country with 15 locations so far and new campuses opening in Saratoga CA, Johns Creek GA, and the Upper West Side NY. Check out this page for summer camp information.

Be sure to mark your calendars for the following events:
[list][*]March 5th (Wednesday), 4:30pm PT/7:30pm ET, HCSSiM Math Jam 2025. Amber Verser, Assistant Director of the Hampshire College Summer Studies in Mathematics, will host an information session about HCSSiM, a summer program for high school students.
[*]March 6th (Thursday), 4:00pm PT/7:00pm ET, Free Webinar on Math Competitions from elementary through high school. Join us for an enlightening session that demystifies the world of math competitions and helps you make informed decisions about your contest journey.
[*]March 11th (Tuesday), 4:30pm PT/7:30pm ET, 2025 MATHCOUNTS Chapter Discussion MATH JAM. AoPS instructors will discuss some of their favorite problems from the MATHCOUNTS Chapter Competition. All are welcome!
[*]March 13th (Thursday), 4:00pm PT/7:00pm ET, Free Webinar about Summer Camps at the Virtual Campus. Transform your summer into an unforgettable learning adventure! From elementary through high school, we offer dynamic summer camps featuring topics in mathematics, language arts, and competition preparation - all designed to fit your schedule and ignite your passion for learning.[/list]
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0 replies
jlacosta
Mar 2, 2025
0 replies
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The Real Deal: Looking for Writers!
supercheetah11   2
N 2 hours ago by skronkmonster
Hello AoPS!

My name is James, and I am the editor of a math newsletter by and for kids titled "The Real Deal: A Complex Space for Kids to Discuss Math". I am looking for a few more writers willing to write an article about their favorite math problem for the coming, 6th edition of the newsletter (articles should be about 600-800 words). We have a growing readership (around 3K), and you can know that your writing will be shared with kids all over the world who also love math. If you're interested, please write me at therealdealmath@gmail.com. You can read previous issues of the newsletter at http://www.realdealmath.org.

Thank you!
2 replies
+1 w
supercheetah11
3 hours ago
skronkmonster
2 hours ago
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AMC 8 Help
krish6_9   31
N 3 hours ago by skronkmonster
Hey guys
im in new jersey a third grader who got 12 on amc 8. I want to make mop in high school and mathcounts nationals in 6th grade is that realistic how should I get better
31 replies
krish6_9
Mar 17, 2025
skronkmonster
3 hours ago
J
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Factoring Marathon
pican   1435
N 4 hours ago by valenbb
Hello guys,
I think we should start a factoring marathon. Post your solutions like this SWhatever, and your problems like this PWhatever. Please make your own problems, and I'll start off simple: P1
1435 replies
pican
Aug 4, 2015
valenbb
4 hours ago
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Mathcounts state iowa
iwillregretthisnamelater   10
N 4 hours ago by DDCN_2011
Ok I’m a 6th grader in Iowa who got 38 in chapter which was first, so what are the chances of me getting in nats? I should feel confident but I don’t. I have a week until states and I’m getting really anxious. What should I do? And also does the cdr count in Iowa? Because I heard that some states do cdr for fun or something and that it doesn’t count to final standings.
10 replies
iwillregretthisnamelater
Yesterday at 4:55 AM
DDCN_2011
4 hours ago
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No more topics!
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A twist on a classic
happypi31415   9
N Mar 19, 2025 by invisibleman
Rank from smallest to largest: $\sqrt[2]{2}$, $\sqrt[3]{3}$, and $\sqrt[5]{5}$.

Click to reveal hidden text
9 replies
happypi31415
Mar 17, 2025
invisibleman
Mar 19, 2025
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A twist on a classic
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Reveal topic tags
Exponents
comparison
MATHCOUNTS
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happypi31415
734 posts
happypi31415
#1 Mar 17, 2025, 3:01 PM
Y by
Rank from smallest to largest: $\sqrt[2]{2}$, $\sqrt[3]{3}$, and $\sqrt[5]{5}$.

Click to reveal hidden text
This post has been edited 4 times. Last edited by happypi31415, Mar 17, 2025, 3:06 PM
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sadas123
1066 posts
sadas123
#2 Mar 17, 2025, 3:09 PM
Y by
I finished all of the outside the box lol :D
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fruitmonster97
2395 posts
fruitmonster97
#3 Mar 17, 2025, 5:29 PM
Y by
put all of these to the 30th power: 2^15, 3^10, and 5^6. We have 3^2>2^3 so 3^10>2^15. also, 2^5>5^2, so 2^15>5^6. Thus, the order is $\boxed{\sqrt[5]{5},\sqrt[2]{2},\sqrt[3]{3}}$
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EaZ_Shadow
1109 posts
EaZ_Shadow
#4 Mar 17, 2025, 11:56 PM
Y by
happypi31415 wrote:
Rank from smallest to largest: $\sqrt[2]{2}$, $\sqrt[3]{3}$, and $\sqrt[5]{5}$.

Click to reveal hidden text

$\sqrt[n]{n}<\sqrt[n-1]{n-1}$ for $n\geq2$.
This post has been edited 1 time. Last edited by EaZ_Shadow, Mar 17, 2025, 11:56 PM
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krish6_9
19 posts
krish6_9
#5 Mar 18, 2025, 12:30 AM
Y by
|_| :) <- outside the box
there was a problem like this on high school math!
the one with 5 < one with 2 < one with 3 because 2 is weird.
This post has been edited 1 time. Last edited by krish6_9, Mar 18, 2025, 12:32 AM
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BS2012
928 posts
BS2012
#6 Mar 18, 2025, 12:37 AM
Y by
By basic derivatives, the function $f(x)=x^{\frac{1}{x}}$ changes from being increasing to decreasing at $x=e.$ Thus, it is true that $$f(n+1)<f(n)$$for $n>2.$
This post has been edited 1 time. Last edited by BS2012, Mar 18, 2025, 12:38 AM
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Amkan2022
1999 posts
Amkan2022
#7 Mar 18, 2025, 12:44 AM
Y by
Take to the $15$th power. We get
$3^5 = 243$
$5^3 = 125$
$125<128< 2^\frac{15}{2} \approx \sqrt{2^{10} \cdot 2^5} \approx \sqrt{1000 \cdot 32} \approx \sqrt{32000} < \sqrt{32400}= 180<243$
This post has been edited 5 times. Last edited by Amkan2022, Mar 18, 2025, 12:47 AM
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invisibleman
13 posts
invisibleman
#8 Mar 18, 2025, 7:15 AM
Y by
happypi31415 wrote:
Rank from smallest to largest: $\sqrt[2]{2}$, $\sqrt[3]{3}$, and $\sqrt[5]{5}$.

Click to reveal hidden text

I think the optimal solution is to write the numbers in fractional powers, then raise each to the power of 30 (because that's the common denominator), and then compare natural numbers! Am I right?
This post has been edited 1 time. Last edited by invisibleman, Mar 18, 2025, 11:35 AM
Reason: typo
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Charizard_637
87 posts
Charizard_637
#9 Mar 18, 2025, 1:49 PM
Y by
invisibleman wrote:
happypi31415 wrote:
Rank from smallest to largest: $\sqrt[2]{2}$, $\sqrt[3]{3}$, and $\sqrt[5]{5}$.

Click to reveal hidden text

I think the optimal solution is to write the numbers in fractional powers, then raise each to the power of 30 (because that's the common denominator), and then compare natural numbers! Am I right?

Very solid. You do get 32768, 59049, and 15625 in which case the answer is 5thrt(5), sqrt(2), and cbrt(3), but in competition this would be difficult to multiply out. If you try raising to the 15th you get 128sqrt(2) (keep in mind that the square root of 2 is about 1.4), 243, and 125. You can rank it the same way, because simple scanning tells that 128*1.4 < 243. It's much easier to multiply out if you don't already know perfect powers of small numbers.
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invisibleman
13 posts
invisibleman
#10 Mar 19, 2025, 5:30 AM
Y by
If you want to solve the problem without lengthy calculations, you can do so by working with mathematical analysis.
Consider the function f(x)=lnx/x, whose derivative is negative for x greather than e , so the function is decreasing. Now you can give values and compare the expressions.
This post has been edited 3 times. Last edited by invisibleman, Mar 19, 2025, 5:32 AM
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