What is Challenge: Definition and 942 Discussions

The Challenge (originally known as Road Rules: All Stars, followed by Real World/Road Rules Challenge and occasionally known as The Real World/Road Rules Challenge during this time), is a reality competition show on MTV that is spun off from two of the network's reality shows, The Real World and Road Rules. Originally featuring alumni from these two shows, casting for The Challenge has slowly expanded to include contestants who debuted on The Challenge itself, alumni from other MTV franchises including Are You the One?, Ex on the Beach (Brazil, UK and US), Geordie Shore and from other non-MTV shows. The contestants compete against one another in various extreme challenges to avoid elimination. The winners of the final challenge win the competition and share a large cash prize. The Challenge is currently hosted by T. J. Lavin.
The series premiered on June 1, 1998. The show was originally titled Road Rules: All Stars (in which notable Real World alumni participated in a Road Rules style road-trip). It was renamed Real World/Road Rules Challenge for the 2nd season, then later abridged to simply The Challenge by the show's 19th season.
Since the fourth season, each season has supplied the show with a unique subtitle, such as Rivals. Each season consists of a format and theme whereby the subtitle is derived. The show's most recent season, Double Agents, premiered on December 9, 2020. A new special limited-series, titled The Challenge: All Stars premiered on April 1, 2021 on the Paramount+ streaming service.

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  1. PAULLIM

    A window cleaner holding his platform up with a rope and pulley

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  2. H

    An Algorithm Challenge (finding the five fastest horses out of a large group)

    As a Bedouin schiek you own twenty-five horses. You want to find the three fastest. You have no clock or other device that measures time. Your racing field is wide enough that five horses can race unimpeded, so you can race five at a time and see how they place. You don't want to abuse your...
  3. PeaceMartian

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  4. raminee

    A Mapping and Recovering Combinations: A Challenge in Combination Theory

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  5. M

    Engineering Calculating a) and Baffled by b): A Math Challenge

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  6. O

    I Can chatgpt accurately calculate expected lengths in Pascal's triangle?

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  7. T

    NASA Could Mars have supported life? NASA challenge wants your help

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  8. DaveC426913

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  9. K

    I How would you have answered Richard Feynman's challenge?

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  10. fresh_42

    Challenge Math Challenge - December 2021

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  11. fresh_42

    Challenge Math Challenge - November 2021

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  12. fresh_42

    Challenge Math Challenge - October 2021

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  13. S

    2-D kinematics challenge problem help please

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  14. fresh_42

    Challenge Math Challenge - September 2021

    Summary: Gamma function. Combinatorics. Stochastic. Semisimple Modules. Topological Groups. Metric spaces. Logarithmic inequality. Stochastic. Primes. Approximation theory.1. (solved by @julian and @benorin ) Let ##f## be a function defined on ##(0,\infty)## such that ##f(x)>0## for all ##x>0.##...
  15. samalkhaiat

    A Is the Higgs Field Responsible for Microscopic Gravitational Effects?

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  16. fresh_42

    Challenge Math Challenge - August 2021

    Summary: countability, topological vector spaces, continuity of linear maps, polynomials, finite fields, function theory, calculus1. Let ##(X,\rho)## be a metric space, and suppose that there exists a sequence ##(f_i)_i## of real-valued continuous functions on ##X## with the property that a...
  17. li dan

    I Would this violate or challenge Newton's laws?

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  18. anemone

    MHB Can You Solve This Isosceles Triangle Challenge?

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  19. fresh_42

    Challenge Math Challenge - July 2021

    Summary:: Group Theory, Lie Algebras, Number Theory, Manifolds, Calculus, Topology, Differential Equations. 1. (solved by @Infrared ) Suppose that ##G## is a finite group such that for each subgroup ##H## of ##G## there exists a homomorphism ##\varphi \,:\, G \longrightarrow H## such that...
  20. R

    Physics 'challenge' type problems, High School (16-18) level

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  21. Twigg

    Challenge Experimental Physics Challenge, June 2021

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  22. fresh_42

    Challenge Math Challenge - June 2021

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  23. E

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  24. anemone

    MHB Sequence Challenge: Prove $a_{50}+b_{50}>20$

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  25. fresh_42

    Challenge Math Challenge - May 2021

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  26. anemone

    MHB Is this Trigonometric Expression a Constant Function of x?

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    Challenge Math Challenge - April 2021

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  28. anemone

    MHB What is the remainder when m+n is divided by 1000 in a trigonometric challenge?

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  29. fresh_42

    Challenge Math Challenge - March 2021

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  30. fresh_42

    Challenge Math Challenge - February 2021

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  31. anemone

    MHB Can You Prove this Trigonometric Inequality?

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  32. fresh_42

    Challenge Math Challenge - January 2021

    Summary: Linear Programming, Trigonometry, Calculus, PDE, Differential Matrix Equation, Function Theory, Linear Algebra, Irrationality, Group Theory, Ring Theory.1. (solved by @suremarc , 1 other solutions possible) Let ##A\in \mathbb{M}_{m,n}(\mathbb{R})## and ##b\in \mathbb{R}^m##. Then...
  33. anemone

    MHB New Year Challenge: Find Real Number Triples

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  34. Hacker Jack

    Do you consider writing this program a bit of a challenge?

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  35. anemone

    MHB Summation Challenge: Evaluate $\sum_{k=1}^{2014}\frac{1}{1-x_k}$

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  36. dara1998

    I What is the main challenge of high energy physics?

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  37. fresh_42

    Challenge Math Challenge - December 2020

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  38. anemone

    MHB Prove Triangle Inequality: $\sqrt{2}\sin A-2\sin B+\sin C=0$

    In a triangle $ABC$ with $\sqrt{2}\sin A-2\sin B+\sin C=0$, prove that $\dfrac{3}{\sin A}+\dfrac{\sqrt{2}}{\sin C}\ge 2(\sqrt{3}+1)$.
  39. anemone

    MHB Prove Divisibility: $(x-y)^2+(y-z)^2+(z-x)^2=xyz$ yields $x^3+y^3+z^3$

    Let $x,\,y,\,z$ be integers such that $(x-y)^2+(y-z)^2+(z-x)^2=xyz$, prove that $x^3+y^3+z^3$ is divisible by $x+y+z+6$.
  40. fresh_42

    Challenge Math Challenge - November 2020

    Summary: Diffusion Equation, Sequence Space, Banach Space, Linear Algebra, Quadratic Forms, Population Distribution, Sylow Subgroups, Lotka-Volterra, Ring Theory, Field Extension. 1. Let ##u(x,t)## satisfy the one dimensional diffusion equation ##u_t=Du_{xx}## in a space-time rectangle...
  41. H

    Solving an Electrical Engineering Challenge with a Tank of Electrolyte Liquid

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  42. anemone

    MHB Can You Meet the Sine Function Challenge?

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  43. anemone

    MHB Can you prove this inequality challenge?

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  44. fresh_42

    Challenge Math Challenge - October 2020

    Summary:: Functional Analysis, Algebras, Measure Theory, Differential Geometry, Calculus, Optimization, Algorithm, Integration. Lie Algebras. 1. (solved by @julian ) Let ##(a_n)\subseteq\mathbb{R}## be a sequence of real numbers such that ##a_n \leq n^{-3}## for all ##n\in \mathbb{N}.## Given...
  45. fresh_42

    Challenge Math Challenge - September 2020

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  46. anemone

    MHB Algebra Challenge: Proving $p,\,q,\,r,\,s,\,t$ Satisfy Equation

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  47. anemone

    MHB Challenge involving irrational number

    Let $x$ be an irrational number. Show that there are integers $m$ and $n$ such that $\dfrac{1}{2555}<mx+n<\dfrac{1}{2012}$.
  48. anemone

    MHB Can the polynomial equation $x^8-x^7+x^2-x+15=0$ have real roots?

    Prove that the polynomial equation $x^8-x^7+x^2-x+15=0$ has no real solution.
  49. anemone

    MHB Summation Challenge: Evaluate $\sum_{n=0}^\infty \frac{16n^2+20n+7}{(4n+2)!}$

    Evaluate $\displaystyle \sum_{n=0}^\infty \dfrac{16n^2+20n+7}{(4n+2)!}$.
  50. anemone

    MHB Continuous Function Integration Challenge

    Find all continuous functions $f:[1,\,8] \rightarrow \mathbb{R} $ such that $\displaystyle \int_1^2 f^2(t^3)dt + 2\int_1^2 f(t^3)dt=\dfrac{2}{3}\int_1^8 f(t)dt-\int_1^2 (t^2-1)^2 dt$
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