Same here every time I watch this movie... I've watched this movie so many times I know almost every singe line.... I've watched this movie 50 times at least
*for anyone who needs to use this for a monologue :)* Augustus Waters was the starcrossed love of my life. Ours was an epic love story, and I won’t be able to get more than a sentence out without disappearing into a puddle of tears. (beat) Like all real love stories - ours will die with us, as it should. you know I had kinda hoped that he’d be the one eulogizing me, because there’s really no one else…” (beat, composing herself) " yeah no, um, I'm not going to talk about our love story because I can't. so instead I will talk about math. I am not a mathematician, but I do know this: there are infinite numbers between 0 and 1. There’s .1 And .12 And .112 And an infinite collection of others. Of course, there is a bigger infinite set of numbers between 0 and 2, or between 0 and a million. Some infinities are simply bigger than other infinities. A writer we used to like taught us that. I want more numbers than I’m likely to get, and God, I want more numbers for Augustus Waters than he got. But, Gus, my love, I cannot tell you how thankful I am for our little infinity. You gave me a forever within the numbered days, and for that I am eternally grateful.
“Hello. My name is Hazel Grace Lancaster and Augustus Waters was the great starcrossed love of my life. Ours was an epic love story, and I probably won’t be able to get more than a sentence out without disappearing into a puddle of tears. Like all real love stories - ours will die with us, as it should. You know I kinda hoped that he’d be the one eulogizing me, ‘cause there’s really no one else…yeah, no. Uhm. I’m not gonna talk about our love story because I can’t so instead I’m gonna talk about math. I am not a mathematician, but I know this: there are infinite numbers between 0 and 1. There’s .1 And .12 And .112 And an infinite collection of others. Of course, there is a bigger infinite set of numbers between 0 and 2, or between 0 and a million. Some infinities are simply bigger than other infinities. A writer we used to like taught us that. You know I want more numbers than I’m likely to get, and God, Do I want more days for Augustus Waters than what he got. But, Gus, my love, I cannot tell you how thankful I am for our little infinity.“
And god do I want more days for Augustus Waters than what he got 😢 I cannot tell you how thankful I am for our little infinity These two lines make Hazel's speech so memorable and heartbreaking 😢
Red the book number of times..... watched the movie but still it makes me cry whenever I read I watch or I think of it...........it gives me a true experience of life love you ....#JHON GREEN. U r such a wonderful writer ...
Hazel's math doesn't seem entirely correct. Let A be the real interval (0, 1) and B be the real interval (0, 2). Hazel said B is "bigger" than A. It's true that B is a proper superset of A. But A and B are equinumerous. Proof: the function f from A to B where f(x) = 2x is a bijection. Reference: en.wikipedia.org/wiki/Cardinality#Definition_1:_|A|_=_|B|
@@spirou2012The numbers between 0 and 1 can be placed into one-to-one correspondence with the numbers between 0 and 2. In particular, if xx is between 0 and 1, then 2x2x is between 0 and 2, and this is a one-to-one mapping between the two sets. Furthermore, for any number yy between 0 and 2, we have y/2y/2 between 0 and 1, so it's a bijection - a one-to-one correspondence. You're right that you can also map the numbers from (0,1)(0,1) into a subset of the interval (0,2)(0,2), leaving room to map them also into the remaining subset, as you describe. (Send xx to xx, and also to x+1x+1). However, you could also do this in reverse: For any number yy on the interval (0,2)(0,2), send yy to y/4y/4, and you'll only use up half of the interval (0,1)(0,1). This goes to show that infinite sets are tricky to count. There are some useful theorems, such as this: If there is a one-to-one map (not necessarily a bijection) from set A to set B, and also a one-to-one map from set B to set A, then the two sets are the same cardinality (size), so you cannot say that she's wrong.
This is the scene where I started crying and I did not stop for the rest of the movie
Jerrica Blackcat you started here? i started the minuet he said he was in love with her 😂
saaame😭
Sameeee. I was not emotionally prepared for this movie. It happened to be on and I’m like hmm let me see. Oh man ...
Same here every time I watch this movie... I've watched this movie so many times I know almost every singe line.... I've watched this movie 50 times at least
*for anyone who needs to use this for a monologue :)*
Augustus Waters was the starcrossed love of my life. Ours was an epic love story, and I won’t be able to get more than a sentence out without disappearing into a puddle of tears. (beat) Like all real love stories - ours will die with us, as it should. you know I had kinda hoped that he’d be the one eulogizing me, because there’s really no one else…” (beat, composing herself) " yeah no, um, I'm not going to talk about our love story because I can't. so instead I will talk about math. I am not a mathematician, but I do know this: there are infinite numbers between 0 and 1. There’s .1 And .12 And .112 And an infinite collection of others. Of course, there is a bigger infinite set of numbers between 0 and 2, or between 0 and a million. Some infinities are simply bigger than other infinities. A writer we used to like taught us that. I want more numbers than I’m likely to get, and God, I want more numbers for Augustus Waters than he got. But, Gus, my love, I cannot tell you how thankful I am for our little infinity. You gave me a forever within the numbered days, and for that I am eternally grateful.
anthea villarba thanks so much
Thank you❤️
Thank you sm
THANK YOU ❤️
Omfg just what I needed!!!! Tysm❣❣❣
I just disappeared in a puddle of tears 😭😭😭
Watched this movie 3 times, still cry at this part.
2019 still here man
“Hello. My name is Hazel Grace Lancaster and Augustus Waters was the great starcrossed love of my life. Ours was an epic love story, and I probably won’t be able to get more than a sentence out without disappearing into a puddle of tears. Like all real love stories - ours will die with us, as it should. You know I kinda hoped that he’d be the one eulogizing me, ‘cause there’s really no one else…yeah, no. Uhm. I’m not gonna talk about our love story because I can’t so instead I’m gonna talk about math. I am not a mathematician, but I know this: there are infinite numbers between 0 and 1. There’s .1 And .12 And .112 And an infinite collection of others. Of course, there is a bigger infinite set of numbers between 0 and 2, or between 0 and a million. Some infinities are simply bigger than other infinities. A writer we used to like taught us that. You know I want more numbers than I’m likely to get, and God, Do I want more days for Augustus Waters than what he got. But, Gus, my love, I cannot tell you how thankful I am for our little infinity.“
Literally my favorite part of the movie!!!
the greatest speech in history
And god do I want more days for Augustus Waters than what he got 😢
I cannot tell you how thankful I am for our little infinity
These two lines make Hazel's speech so memorable and heartbreaking 😢
Red the book number of times..... watched the movie but still it makes me cry whenever I read I watch or I think of it...........it gives me a true experience of life love you ....#JHON GREEN. U r such a wonderful writer ...
This part has been forever in my heart
And for that,....I am eternally grateful.
And god.. do i want more days for agustus waters than what he got
I BURST OUT CRYING OKAY? THIS PART THO T_T
It is so sweet and I always cry on this it is not only valid for a boyfriend or girlfriend but also for parents and friends too
Love this movie.
2019 , still managing
Cried like 20 times in this movie!
idk why i’m watching this. i’m in the mood
Most emotional scene 😯😞
I cried when I read this in the book and again in the movie😭😭 the acting is just so amazing ♥️♥️😭😭😭
I am so glad I’m bad at math or this scene would tear me apart
Love love love
I seen this movie bout 3-4 times and always cry 😪
Could you post the scene in the car? I will be extremely thankful
What is the song to this scene ?
2020.
I almost cry in this scene but its just a film.So,shit! 😆
Hazel's math doesn't seem entirely correct.
Let A be the real interval (0, 1) and B be the real interval (0, 2).
Hazel said B is "bigger" than A.
It's true that B is a proper superset of A.
But A and B are equinumerous.
Proof: the function f from A to B where f(x) = 2x is a bijection.
Reference:
en.wikipedia.org/wiki/Cardinality#Definition_1:_|A|_=_|B|
Yep you're right
This scene is soo great. What a pity that the math is wrong, there are not more numbers between 0 and 1 then between 0 and 2 :(
She said the exact opposite 🙃
@@unratutox1543 Yes but it's still wring. There are not more numbers between 0 and 2 then between 0 and 1.
@@spirou2012The numbers between 0 and 1 can be placed into one-to-one correspondence with the numbers between 0 and 2. In particular, if xx is between 0 and 1, then 2x2x is between 0 and 2, and this is a one-to-one mapping between the two sets. Furthermore, for any number yy between 0 and 2, we have y/2y/2 between 0 and 1, so it's a bijection - a one-to-one correspondence.
You're right that you can also map the numbers from (0,1)(0,1) into a subset of the interval (0,2)(0,2), leaving room to map them also into the remaining subset, as you describe. (Send xx to xx, and also to x+1x+1). However, you could also do this in reverse: For any number yy on the interval (0,2)(0,2), send yy to y/4y/4, and you'll only use up half of the interval (0,1)(0,1).
This goes to show that infinite sets are tricky to count. There are some useful theorems, such as this: If there is a one-to-one map (not necessarily a bijection) from set A to set B, and also a one-to-one map from set B to set A, then the two sets are the same cardinality (size), so you cannot say that she's wrong.
@@unratutox1543 Well yes, she's said the opposite of what you say, that (0,2) has a "bigger" cardinal then (0,1). So she's wrong.