Sunday, December 22, 2024 Text is available under the CC BY-SA 3.0 licence.

Daniel Radcliffe

« All quotes from this author
 

(about Math) Too many little numbers on one page!

 
Daniel Radcliffe

» Daniel Radcliffe - all quotes »



Tags: Daniel Radcliffe Quotes, Authors starting by R


Similar quotes

 

Markets are fundamentally volatile. No way around it. Your prolem is not in the math. There is no math to get you out of having to experience uncertainty.

 
Ed Seykota
 

There are people who say “I'll never need this math -- these trig identities from 10th grade or 11th grade.” Or maybe you never learned them. Here's the catch: whether or not you ever use the math that you learned in school, the act of having learned the math established a wiring in your brain that didn't exist before, and it's the wiring in your brain that makes you the problem solver.

 
Neil deGrasse Tyson
 

My algebra was relatively poor. I found it very difficult to use equations that substituted numbers — to which I had a synesthetic and emotional response — for letters, to which I had none. It was because of this that I decided not to continue math at Advanced level, but chose to study history, French and German instead.

 
Daniel Tammet
 

Pythagoras, as everyone knows, said that "all things are numbers." This statement, interpreted in a modern way, is logical nonsense, but what he meant was not exactly nonsense. He discovered the importance of numbers in music and the connection which he established between music and arithmetic survives in the mathematical terms "harmonic mean" and "harmonic progression." He thought of numbers as shapes, as they appear on dice or playing cards. We still speak of squares or cubes of numbers, which are terms that we owe to him. He also spoke of oblong numbers, triangular numbers, pyramidal numbers, and so on. These were the numbers of pebbles (or as we would more naturally say, shot) required to make the shapes in question.

 
Pythagoras
 

The transfinite numbers are in a certain sense themselves new irrationalities and in fact in my opinion the best method of defining the finite irrational numbers is wholly dissimilar to, and I might even say in principle the same as, my method described above of introducing transfinite numbers. One can say unconditionally: the transfinite numbers stand or fall with the finite irrational numbers; they are like each other in their innermost being; for the former like the latter are definite delimited forms or modifications of the actual infinite.

 
Georg Cantor
© 2009–2013Quotes Privacy Policy | Contact