If you're not in high school yet, then you probably don't understand any of this. I am art student want to know more about maths! compute the centre of generalized linear group GL(4,F). But there are ways infinity can be bigger than infinity. how much money would i have if I saved up 5,200 for 6 years? No, (infinity)^2 is the same as infinity. . With this definition, there is nothing (meaning: no real numbers) larger than infinity. Infinity is bigger than all the natural numbers (numbers like 1,2,3. . How do you think about the answers? Thanks everyone!!! The site may not work properly if you don't, If you do not update your browser, we suggest you visit, Press J to jump to the feed. Press question mark to learn the rest of the keyboard shortcuts. Heck, it's not even infinity times infinity. That's impossible. (Yes, I'm sad to say that ad with the guy in the suit sitting with the kids is lying to you.) Imagine there is a square and triangle which their sides are with infinite lengths, then the area of the square is bigger than the triangle ? Here’s an example: Split the integral in two. http://math.stackexchange.com/questions/1720666/concept-of-infinity-infinity-infinity. Only in this special construction is infinity treated "like a number." I know it's not very maths now, but still hope for answers ! can i regard infinity times infinity as a square with endless boundaries ? There is no such thing as a largest number, because you can always add 1 to that number and get something bigger. Assume, the better the target is, the longer the time to be spent on the target. What is larger than infinity? The sum of their squares is 145? Since the time of the ancient Greeks, the philosophical nature of infinity was the subject of many discussions among philosophers. p.s. There are two to the power of infinity of those, that is, 2 x 2 x 2… multiplied infinitely many times. Or Case one is just a straight vertical line ? Do you have a math question? However, in Cantor's aleph system, 2^(infinity) is larger than the original infinity in the sense that it has higher cardinality. There ARE ways to make 2 infinite numbers where one is clearly bigger than the other. The set of real numbers [infinite] has more elements than the set of integers [infinite]. If we use the notation a bit loosely, we could “simplify” the limit above as follows: This would suggest that the answer to the question in the title is “No”, but as will be apparent shortly, using infinity n… In this case, 2 * Infinity = Infinity. It depends on what you mean by "real". Still have questions? , 1/2, 145.9879845. . What does Infinity Minus Infinity Equal? and all the real numbers (numbers like 1.23456436435. . If you do, you arrive at all sorts of contradictions. Just like an triangle ?? But in this case you're dealing with "cardinality", the concept of mapping some infinite set to some other infinite set in for example a 1-to-1 correspondence. After all, any number subtracted by itself is equal to zero, however infinity is not a real (rational) number. I think the answer depends on which math class you're in. There are an infinite amount of decimal numbers you can write between 1 and 2 (1.1, 1.2, 1.975, 1.55326, etc.). So A and B are the same magnitude. When you're dealing with abstract concepts, it is possible to have an infinite amount of something. If the interpretation is true, according to everyones' answers, case 1 area is still the same as the accumulated bars' area ?? I am confused. It can be a helpful concept in mathematics, but you can't treat "infinity" as an actual number. When we work with comparing infinities, we think about mapping one to the next. Today we distinguish two basic kinds of infinities, cardinals and ordinals. . Case 2, There are many (infinite) bars from lower to higher as (infinite) time goes by, one next to one. If you're in high school, infinity isn't a number, just the idea of an uncountable amount of numbers. I think I made a mistake in the question, basing on my primary thought in my mind. It's true that in higher-level mathematics you get into concepts like "countable infinity", "non-countable infinity", "aleph-0", etc. Infinity is NOT a number. With limits, we can try to understand 2∞as follows: The infinity symbol is used twice here: first time to represent “as x grows”, and a second to time to represent “2xeventually permanently exceeds any specific bound”. One concept of infinity that most people would have encountered in a math class is the infinity of limits. Can you help others with their math questions? It is often denoted by the infinity symbol ∞.. Infinity represents something that is boundless or endless, or else something that is larger than any real or natural number. Get your answers by asking now. my twitter: @tweetsauce my instagram: electricpants Sources and links to learn more below! Before the 19th century no one had considered the possibility that there could be more than one infinity. Sorry for the too jumping questions here. If you're doing this (NB: the usual terms there are "plane" and "half-plane), then these areas are identical (in the sense that both have measure equal to the measure-theoretic infinity, and both have the same cardinality). New comments cannot be posted and votes cannot be cast. Infinity means a number still larger than whatever we can think of.

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