User contributions for Wikiadmin

18 February 2022

• 03:1203:12, 18 February 2022 diff hist +20‎ Main Page ‎ →‎Physical and social conditions
• 03:1103:11, 18 February 2022 diff hist +111‎ Main Page ‎ →‎Physical and social conditions
• 03:0703:07, 18 February 2022 diff hist +36‎ Main Page ‎ →‎Physical and social conditions
• 03:0603:06, 18 February 2022 diff hist +560‎ Main Page ‎No edit summary
• 02:1102:11, 18 February 2022 diff hist +2,476‎ N Conditions for differentiability for a single variable ‎ Created page with "For a function to be differentiable it has to be continuous. However, being continuous does not imply in differentiability. The graphical way to explain this is to show a function that is continuous but not smooth. The easiest example is <math>f(x) = |x|</math>. At the origin the function is continuous because both sided limits converge to zero. But the tangent line there cannot be defined because if we try to use the tangent line idea we have a problem: a division by ze..."
• 02:1002:10, 18 February 2022 diff hist +40‎ Calculus theory ‎No edit summary
• 01:2801:28, 18 February 2022 diff hist +6‎ Updates ‎No edit summary
• 01:2701:27, 18 February 2022 diff hist +33‎ Calculus theory ‎No edit summary
• 01:1901:19, 18 February 2022 diff hist 0‎ Defining the derivative ‎ →‎The derivative
• 01:1501:15, 18 February 2022 diff hist +2,282‎ Defining the derivative ‎ →‎The derivative
• 00:2200:22, 18 February 2022 diff hist +81‎ Mistakes regarding english ‎No edit summary

17 February 2022

• 17:4217:42, 17 February 2022 diff hist +1,219‎ Defining the derivative ‎ →‎The derivative
• 16:5516:55, 17 February 2022 diff hist −1‎ Mistakes regarding derivatives ‎No edit summary
• 16:5416:54, 17 February 2022 diff hist +264‎ Mistakes regarding derivatives ‎No edit summary
• 16:2716:27, 17 February 2022 diff hist −2‎ Limits at or with infinity ‎No edit summary
• 16:1516:15, 17 February 2022 diff hist +46‎ Limits at or with infinity ‎No edit summary
• 16:0716:07, 17 February 2022 diff hist −70‎ Limits at or with infinity ‎No edit summary
• 14:4214:42, 17 February 2022 diff hist +12‎ Limits at or with infinity ‎No edit summary
• 03:4103:41, 17 February 2022 diff hist +8‎ Calculus theory ‎No edit summary
• 03:4103:41, 17 February 2022 diff hist 0‎ m Limits at or with infinity ‎ 0kelvin moved page Limits at infinity to Limits at or with infinity without leaving a redirect
• 03:2803:28, 17 February 2022 diff hist +203‎ Limits at or with infinity ‎No edit summary
• 03:2503:25, 17 February 2022 diff hist +563‎ Limits at or with infinity ‎No edit summary
• 01:5201:52, 17 February 2022 diff hist +2‎ Linear vs. Non-linear relationships ‎ →‎Non-linear relationships
• 01:4801:48, 17 February 2022 diff hist −94‎ Linear vs. Non-linear relationships ‎ →‎Non-linear relationships
• 01:4001:40, 17 February 2022 diff hist +30‎ Linear vs. Non-linear relationships ‎ →‎Non-linear relationships
• 01:3901:39, 17 February 2022 diff hist +454‎ Linear vs. Non-linear relationships ‎ →‎Non-linear relationships
• 00:3800:38, 17 February 2022 diff hist +63‎ Limits at or with infinity ‎No edit summary

16 February 2022

• 23:2023:20, 16 February 2022 diff hist +2‎ Updates ‎No edit summary
• 23:1223:12, 16 February 2022 diff hist +20‎ Limits at or with infinity ‎No edit summary
• 22:5822:58, 16 February 2022 diff hist +1,494‎ Limits at or with infinity ‎No edit summary
• 22:4322:43, 16 February 2022 diff hist 0‎ File:Limit infinity2.png ‎ 0kelvin uploaded a new version of File:Limit infinity2.png current
• 22:4122:41, 16 February 2022 diff hist 0‎ N File:Limit infinity2.png ‎No edit summary
• 18:1918:19, 16 February 2022 diff hist +1,552‎ Limits at or with infinity ‎No edit summary
• 18:0518:05, 16 February 2022 diff hist 0‎ N File:Limit infinity.png ‎No edit summary current
• 03:5803:58, 16 February 2022 diff hist +978‎ Limits at or with infinity ‎No edit summary

15 February 2022

• 22:5622:56, 15 February 2022 diff hist +373‎ Limits at or with infinity ‎No edit summary
• 22:5322:53, 15 February 2022 diff hist +518‎ N Limits at or with infinity ‎ Created page with "<math>\lim_{x \ \to \ \infty} x^2 = \infty</math> because the function can grow indefinitely. <math>\lim_{x \ \to \ \infty} \frac{1}{x} = 0</math> because we are dividing a number by something very large, or in infinitely many small parts. Is there a rigorous way to prove that our intuition is correct in both cases? Yes, there is. This idea is pretty abstract because the whole concept is ''"there is a number that is very large, then we can add one and make it even larger..."
• 22:5222:52, 15 February 2022 diff hist +18‎ Updates ‎No edit summary
• 22:2722:27, 15 February 2022 diff hist +26‎ Calculus theory ‎No edit summary
• 22:2122:21, 15 February 2022 diff hist +2‎ Updates ‎No edit summary
• 22:1922:19, 15 February 2022 diff hist +1,916‎ Properties of limits ‎ →‎Proofs of the properties
• 21:5721:57, 15 February 2022 diff hist +34‎ Updates ‎No edit summary
• 20:4320:43, 15 February 2022 diff hist +18‎ Updates ‎No edit summary
• 17:5517:55, 15 February 2022 diff hist +29‎ Updates ‎No edit summary
• 17:5017:50, 15 February 2022 diff hist +18‎ Main Page ‎No edit summary
• 16:5616:56, 15 February 2022 diff hist +40‎ Updates ‎No edit summary
• 15:5415:54, 15 February 2022 diff hist −1‎ Linear vs. Non-linear relationships ‎ →‎Non-linear relationships
• 15:5215:52, 15 February 2022 diff hist +92‎ Linear vs. Non-linear relationships ‎ →‎Non-linear relationships
• 15:3515:35, 15 February 2022 diff hist +212‎ Linear vs. Non-linear relationships ‎No edit summary
• 15:3115:31, 15 February 2022 diff hist +72‎ Mistakes regarding english ‎No edit summary