Why is 361,654,729 awesome? Dive into this math mini spark and find out!
Spark your math thinking!
- Set up your math mini spark recording page: #50: Pandigital Numbers
- Check out this video about pandigital numbers.
3. Check out the 3 levels of the Pandigital Number Quiz at Transum. Pick the level that suits you. Keep playing your level until you earn a trophy. Add a screenshot of your trophy to your recording page.
Level 1 – Basic questions about pandigital numbers
Level 2 – More challenging questions about pandigital numbers
Level 3 – Excruciatingly difficult questions about pandigital numbers
4. Share your math mini spark recording page with your teacher/EY coordinator.
I learned that I have been doing Fibonacci when I was little kid.
Fibonacci numbers can be found in nature. For example: flower petals. It’s common to see a daisy with 13,21,34,55 or 81 petals.
I learned that all around nature ther are Fibonacci numbers everywhere like in the petals of flowers.
I like how they found pictures of flowers for every Fibonacci number.
Okay, so, I never knew about these “Fibonacci” numbers. I find it very interesting that you can add the two numbers before the third and the first to equal the third. The one thing is, is it only these numbers or is the line infinite?
I learned that fibbonacci numbers are numbers that start with 1, and 1. And you and them together and that makes two so then there would be 2 ( cause that’s the answer and then there would be a 3 and then a 5 8 13…… Ect.
I learned that a Fibonacci is a line of numbers which is being added up. Two numbers that are by each other are added and the next would be that answer. The numbers get bigger as the line continues. Ex: 3,5,8,13,21
I was so confused with these numbers before I was learning them.
I learned that the Fibonacci pattern is when you add the 2 numbers before it to get your next number.
I never understanded what a Fibonacci was, but hey now I do and they’re really simple now.
I learned that every Nov. 23 is Fibonacci day because it has the digits 1,1,2,3 which is the beginning of Fibonacci.
I never knew you can make spirals out of numbers! I showed my friends the pattern, and they thought it was awesome!
Fibonacci Numbers are really rad!
The Fibonacci pattern is where you add the 2numbers before you at the next numbers.
It goes like this 1+0=1 is so you plus the number you add with your answer so the next one would be 1+1=2 then 1+2=3 and 2+3=5 and it keeps on going on and on and on
I looked at the numbers and noticed that two numbers like 5 and 8 added and then 13 and 8 added and got the next number , 21 .
I learned how to make a mathematically perfect spiral as well as learning how Fibbonaci numbers appear in nature.
I learned that the bigger the pair of Fibonacci numbers the closer the approximation
I caught that. That is a cool problem.
The pattern goes 0,1,1,2,3,5,8,13,21,34,55,89,144,233,377,610,987,1597,2584,4181,6765,10946,17711,
28657,36368 and so on….
I did the Fibonacci sequence math minute and I wanted to share my thoughts about it. Well to start off I didn’t even no what the Fibonacci sequence was before I did this Math Minute Challange. I learned that the Fibonacci sequence is a series of numbers that have a unique pattern. You might be wondering what the pattern is, well it kind of looks like this: 0, 1, 1, 2, 3, 5,…..To find the next number in the sequence you simply just have to add the 2 numbers behind the unknown number so for example to find the next number in this sequence: 0,1,1,2,3,5, ? you just have to add the 2 numbers behind the question mark. So do 3+5=8, there for the next number in the Sequence in is 8.
I also learned a lot of other facts but this just the basic. Thanks for the oppurtunity
Fibonacci numbers are kind of tricky to understand, so I tried to get as many as I could after watching all of the videos and reading everything I could, and I got to 47 Fibonacci numbers!!
I leaned that Fibonacci numbers appear in nature all the time like pinecones, flowers and pineapples and the layers mostly add up to Fibonacci numbers.
The number of petals in a flower most often follows the Fibonacci sequence.