•Choose any double-digit number (from 10 to 99).•Choose any double-digit number (from 10 to 99).
•Subtract in succession each of the digits from thenumber you chose (e.g. for 37 subtract 7followed by 3).•Subtract in succession each of the digits from thenumber you chose (e.g. for 37 subtract 7followed by 3).
•Remember the outcome and do not reveal it toyour computer!•Remember the outcome and do not reveal it toyour computer!
•Ready to proceed?•Ready to proceed?
11
Euclid
10Fermat
9
Euler
8
Pascal
7
Gauss
6
Pythagoras
5
Noether
4
Wiles
3
Goldbach
2
Kovalevsky
1
Fibonacci
22
Galois
21
Thales
20
Goldbach
19
Fourier
18
Euler
17
Wiles
16
Thales
15
Möbius
14
Gauss
13
Galois
12
Gödel
33
Thales
32
Euclid
31
Noether
30
Pythagoras
29
Laplace
28
Thales
27
Euler
26
Goldbach
25
Noether
24
Fourier
23
Noether
44
Gauss
43
Goldbach
42
Möbius
41
Euler
40
Goldbach
39
Noether
38
Thales
37
Euclid
36
Euler
35
Thales
34
Pascal
55
Noether
54
Euler
53
Thales
52
Euclid
51
Thales
50
Pascal
49
Goldbach
48
Pythagoras
47
Thales
46
Gauss
45
Euler
66
Möbius
65
Laplace
64
Goldbach
63
Euler
62Noether
61
Thales
60
Fourier
59
Gauss
58
Wiles
57
Möbius
56
Goldbach
77
Pascal
76
Pythagoras
75
Galois
74
Wiles
73
Euclid
72
Euler
71
Gauss
70
Wiles
69
Laplace
68
Fibonacci
67
Thales
88
Euler
87
Fourier
86
Thales
85
Galois
84
Möbius
83
Pythagoras
82
Pascal
81
Euler
80
Möbius
79
Noether
78
Euclid
99
Thales
98
Euclid
97
Goldbach
96
Noether
95
Pascal
94
Laplace
93
Fourier
92
Wiles
91
Pythagoras
90
Euler
89
Gauss
Locate the cell with your number and read the name of the mathematician.Close your eyes and try to envision this mathematician. What do you knowabout him/her? What did he/she hypothesize or prove? When did he/she live?Locate the cell with your number and read the name of the mathematician.Close your eyes and try to envision this mathematician. What do you knowabout him/her? What did he/she hypothesize or prove? When did he/she live?
Ready to proceed?Ready to proceed?
Click here to read more about Leonhard Euler on Wikipedia
Among his many achievements stands out his solution of the Bridges of Königsbergproblem, thus laying out the foundations for graph theory.Among his many achievements stands out his solution of the Bridges of Königsbergproblem, thus laying out the foundations for graph theory.
Leonhard Euler (1707 – 1783)
Leonhard Euler (1707 – 1783)
•Choose any double-digit number (from 10 to 99).•Choose any double-digit number (from 10 to 99).
•Subtract in succession each of the digits from thenumber you chose (e.g. for 37 subtract 7followed by 3).•Subtract in succession each of the digits from thenumber you chose (e.g. for 37 subtract 7followed by 3).
•Remember the outcome and do not reveal it toyour computer!•Remember the outcome and do not reveal it toyour computer!
•Ready to proceed?•Ready to proceed?
Locate the cell with your number and read the name of the mathematician.Close your eyes and try to envision this mathematician. What do you knowabout him/her? What did he/she hypothesize or prove? When did he/she live?Locate the cell with your number and read the name of the mathematician.Close your eyes and try to envision this mathematician. What do you knowabout him/her? What did he/she hypothesize or prove? When did he/she live?
Ready to proceed?Ready to proceed?
11
Euclid
10
Euler
9
Gauss
8
Pascal
7
Euler
6
Pythagoras
5
Noether
4
Wiles
3
Goldbach
2
Kovalevsky
1
Fibonacci
22
Galois
21
Thales
20
Goldbach
19
Fourier
18
Gauss
17
Wiles
16
Fermat
15
Möbius
14
Euler
13
Galois
12
Gödel
33
Thales
32
Euclid
31
Noether
30
Pythagoras
29
Laplace
28
Thales
27
Gauss
26
Goldbach
25
Noether
24
Fourier
23
Noether
44
Euler
43
Goldbach
42
Möbius
41
Fermat
40
Goldbach
39
Noether
38
Thales
37
Euclid
36
Gauss
35
Thales
34
Pascal
55
Noether
54
Gauss
53
Thales
52
Euclid
51
Thales
50
Pascal
49
Goldbach
48
Pythagoras
47
Fermat
46
Euler
45
Gauss
66
Möbius
65
Laplace
64
Goldbach
63
Gauss
62Noether
61
Fermat
60
Fourier
59
Euler
58
Wiles
57
Möbius
56
Goldbach
77
Pascal
76
Pythagoras
75
Galois
74
Wiles
73
Euclid
72
Gauss
71
Euler
70
Wiles
69
Laplace
68
Fibonacci
67
Fermat
88
Fermat
87
Fourier
86
Thales
85
Galois
84
Möbius
83
Pythagoras
82
Pascal
81
Gauss
80
Möbius
79
Noether
78
Euclid
99
Thales
98
Euclid
97
Goldbach
96
Noether
95
Pascal
94
Laplace
93
Fourier
92
Wiles
91
Pythagoras
90
Fermat
89
Gauss
Carl Friedrich Gauss (1777 – 1855)
Carl Friedrich Gauss (1777 – 1855)
Click here to read more about Carl Friedrich Gauss on Wikipedia
Among his many achievements, Gauss is famous for formulating at a very youngage a system for calculating the sum of all members of an arithmetic sequence.Among his many achievements, Gauss is famous for formulating at a very youngage a system for calculating the sum of all members of an arithmetic sequence.
•Choose any double-digit number (from 10 to 99).•Choose any double-digit number (from 10 to 99).
•Subtract in succession each of the digits from thenumber you chose (e.g. for 37 subtract 7followed by 3).•Subtract in succession each of the digits from thenumber you chose (e.g. for 37 subtract 7followed by 3).
•Remember the outcome and do not reveal it toyour computer!•Remember the outcome and do not reveal it toyour computer!
•Ready to proceed?•Ready to proceed?
Locate the cell with your number and read the name of the mathematician.Close your eyes and try to envision this mathematician. What do you knowabout him/her? What did he/she hypothesize or prove? When did he/she live?Locate the cell with your number and read the name of the mathematician.Close your eyes and try to envision this mathematician. What do you knowabout him/her? What did he/she hypothesize or prove? When did he/she live?
Ready to proceed?Ready to proceed?
11
Euclid
10
Fermat
9
Pythagoras
8
Pascal
7
Gauss
6
Euler
5
Noether
4
Wiles
3
Goldbach
2
Kovalevsky
1
Fibonacci
22
Galois
21
Thales
20
Goldbach
19
Fourier
18
Pythagoras
17
Wiles
16
Fermat
15
Möbius
14
Gauss
13
Galois
12
Gödel
33
Thales
32
Euclid
31
Noether
30
Euler
29
Laplace
28
Thales
27
Pythagoras
26
Goldbach
25
Noether
24
Fourier
23
Noether
44
Gauss
43
Goldbach
42
Möbius
41
Fermat
40
Goldbach
39
Noether
38
Thales
37
Euclid
36
Pythagoras
35
Thales
34
Pascal
55
Noether
54
Pythagoras
53
Thales
52
Euclid
51
Thales
50
Pascal
49
Goldbach
48
Euler
47
Fermat
46
Gauss
45
Pythagoras
66
Möbius
65
Laplace
64
Goldbach
63
Pythagoras
62Noether
61
Fermat
60
Fourier
59
Gauss
58
Wiles
57
Möbius
56
Goldbach
77
Pascal
76
Euler
75
Galois
74
Wiles
73
Euclid
72
Pythagoras
71
Gauss
70
Wiles
69
Laplace
68
Fibonacci
67
Fermat
88
Fermat
87
Fourier
86
Thales
85
Galois
84
Möbius
83
Euler
82
Pascal
81
Pythagoras
80
Möbius
79
Noether
78
Euclid
99
Thales
98
Euclid
97
Goldbach
96
Noether
95
Pascal
94
Laplace
93
Fourier
92
Wiles
91
Euler
90
Fermat
89
Gauss
Pythagoras (c. 570 BC – c. 495 BC)
Pythagoras (c. 570 BC – c. 495 BC)
Click here to read more about Pythagoras on Wikipedia
Among his many achievements, Pythagoras is most famous for his theoremstating that in a right triangle, the sum of the squares of the two legs is equalto the square of the hypotenuse.Among his many achievements, Pythagoras is most famous for his theoremstating that in a right triangle, the sum of the squares of the two legs is equalto the square of the hypotenuse.
•Choose any double-digit number (from 10 to 99).•Choose any double-digit number (from 10 to 99).
•Subtract in succession each of the digits from thenumber you chose (e.g. for 37 subtract 7followed by 3).•Subtract in succession each of the digits from thenumber you chose (e.g. for 37 subtract 7followed by 3).
•Remember the outcome and do not reveal it toyour computer!•Remember the outcome and do not reveal it toyour computer!
•Ready to proceed?•Ready to proceed?
Locate the cell with your number and read the name of the mathematician.Close your eyes and try to envision this mathematician. What do you knowabout him/her? What did he/she hypothesize or prove? When did he/she live?Locate the cell with your number and read the name of the mathematician.Close your eyes and try to envision this mathematician. What do you knowabout him/her? What did he/she hypothesize or prove? When did he/she live?
Ready to proceed?Ready to proceed?
11
Euclid
10
Fermat
9
Goldbach
8
Pascal
7
Gauss
6
Pythagoras
5
Noether
4
Wiles
3
Euler
2
Kovalevsky
1
Fibonacci
22
Galois
21
Thales
20
Euler
19
Fourier
18
Goldbach
17
Wiles
16
Fermat
15
Möbius
14
Gauss
13
Galois
12
Gödel
33
Thales
32
Euclid
31
Noether
30
Pythagoras
29
Laplace
28
Thales
27
Goldbach
26
Euler
25
Noether
24
Fourier
23
Noether
44
Gauss
43
Euler
42
Möbius
41
Fermat
40
Euler
39
Noether
38
Thales
37
Euclid
36
Goldbach
35
Thales
34
Pascal
55
Noether
54
Goldbach
53
Thales
52
Euclid
51
Thales
50
Pascal
49
Euler
48
Pythagoras
47
Fermat
46
Gauss
45
Goldbach
66
Möbius
65
Laplace
64
Euler
63
Goldbach
62Noether
61
Fermat
60
Fourier
59
Gauss
58
Wiles
57
Möbius
56
Euler
77
Pascal
76
Pythagoras
75
Galois
74
Wiles
73
Euclid
72
Goldbach
71
Gauss
70
Wiles
69
Laplace
68
Fibonacci
67
Fermat
88
Fermat
87
Fourier
86
Thales
85
Galois
84
Möbius
83
Pythagoras
82
Pascal
81
Goldbach
80
Möbius
79
Noether
78
Euclid
99
Thales
98
Euclid
97
Euler
96
Noether
95
Pascal
94
Laplace
93
Fourier
92
Wiles
91
Pythagoras
90
Fermat
89
Gauss
Christian Goldbach (1690 – 1764)
Christian Goldbach (1690 – 1764)
Click here to read more about Christian Goldbach on Wikipedia
In this letter Goldbach introduces to Euler his conjecture that all even integersgreater than 2 can be expressed as the sum of two primes. To date, mathematicianswere neither able to prove this hypothesis nor provide a contradictory example.In this letter Goldbach introduces to Euler his conjecture that all even integersgreater than 2 can be expressed as the sum of two primes. To date, mathematicianswere neither able to prove this hypothesis nor provide a contradictory example.
•Choose any double-digit number (from 10 to 99).•Choose any double-digit number (from 10 to 99).
•Subtract in succession each of the digits from thenumber you chose (e.g. for 37 subtract 7followed by 3).•Subtract in succession each of the digits from thenumber you chose (e.g. for 37 subtract 7followed by 3).
•Remember the outcome and do not reveal it toyour computer!•Remember the outcome and do not reveal it toyour computer!
•Ready to proceed?•Ready to proceed?
Locate the cell with your number and read the name of the mathematician.Close your eyes and try to envision this mathematician. What do you knowabout him/her? What did he/she hypothesize or prove? When did he/she live?Locate the cell with your number and read the name of the mathematician.Close your eyes and try to envision this mathematician. What do you knowabout him/her? What did he/she hypothesize or prove? When did he/she live?
Ready to proceed?Ready to proceed?
11
Euclid
10
Fermat
9
Noether
8
Pascal
7
Gauss
6
Pythagoras
5
Euler
4
Wiles
3
Goldbach
2
Kovalevsky
1
Fibonacci
22
Galois
21
Thales
20
Goldbach
19
Fourier
18
Noether
17
Wiles
16
Fermat
15
Möbius
14
Gauss
13
Galois
12
Gödel
33
Thales
32
Euclid
31
Euler
30
Pythagoras
29
Laplace
28
Thales
27
Noether
26
Goldbach
25
Euler
24
Fourier
23
Noether
44
Gauss
43
Goldbach
42
Möbius
41
Fermat
40
Goldbach
39
Euler
38
Thales
37
Euclid
36
Noether
35
Thales
34
Pascal
55
Euler
54
Noether
53
Thales
52
Euclid
51
Thales
50
Pascal
49
Goldbach
48
Pythagoras
47
Fermat
46
Gauss
45
Noether
66
Möbius
65
Laplace
64
Goldbach
63
Noether
62
Euler
61
Fermat
60
Fourier
59
Gauss
58
Wiles
57
Möbius
56
Goldbach
77
Pascal
76
Pythagoras
75
Galois
74
Wiles
73
Euclid
72
Noether
71
Gauss
70
Wiles
69
Laplace
68
Fibonacci
67
Fermat
88
Fermat
87
Fourier
86
Thales
85
Galois
84
Möbius
83
Pythagoras
82
Pascal
81
Noether
80
Möbius
79
Euler
78
Euclid
99
Thales
98
Euclid
97
Goldbach
96
Euler
95
Pascal
94
Laplace
93
Fourier
92
Wiles
91
Pythagoras
90
Fermat
89
Gauss
Emmy Noether (1882 – 1935)
Emmy Noether (1882 – 1935)
Click here to read more about Emmy Noether on Wikipedia
Noether’s theorem demonstrates an association between symmetries in physicalsystems and the laws of conservation (e.g. electric charge conservation).Noether’s theorem demonstrates an association between symmetries in physicalsystems and the laws of conservation (e.g. electric charge conservation).
•Choose any double-digit number (from 10 to 99).•Choose any double-digit number (from 10 to 99).
•Subtract in succession each of the digits from thenumber you chose (e.g. for 37 subtract 7followed by 3).•Subtract in succession each of the digits from thenumber you chose (e.g. for 37 subtract 7followed by 3).
•Remember the outcome and do not reveal it toyour computer!•Remember the outcome and do not reveal it toyour computer!
•Ready to proceed?•Ready to proceed?
Locate the cell with your number and read the name of the mathematician.Close your eyes and try to envision this mathematician. What do you knowabout him/her? What did he/she hypothesize or prove? When did he/she live?Locate the cell with your number and read the name of the mathematician.Close your eyes and try to envision this mathematician. What do you knowabout him/her? What did he/she hypothesize or prove? When did he/she live?
Ready to proceed?Ready to proceed?
11
Euclid
10
Fermat
9
Wiles
8
Pascal
7
Gauss
6
Pythagoras
5
Noether
4
Euler
3
Goldbach
2
Kovalevsky
1
Fibonacci
22
Galois
21
Thales
20
Goldbach
19
Fourier
18
Wiles
17
Euler
16
Fermat
15
Möbius
14
Gauss
13
Galois
12
Gödel
33
Thales
32
Euclid
31
Noether
30
Pythagoras
29
Laplace
28
Thales
27
Wiles
26
Goldbach
25
Noether
24
Fourier
23
Noether
44
Gauss
43
Goldbach
42
Möbius
41
Fermat
40
Goldbach
39
Noether
38
Thales
37
Euclid
36
Wiles
35
Thales
34
Pascal
55
Noether
54
Wiles
53
Thales
52
Euclid
51
Thales
50
Pascal
49
Goldbach
48
Pythagoras
47
Fermat
46
Gauss
45
Wiles
66
Möbius
65
Laplace
64
Goldbach
63
Wiles
62
Noether
61
Fermat
60
Fourier
59
Gauss
58
Euler
57
Möbius
56
Goldbach
77
Pascal
76
Pythagoras
75
Galois
74
Euler
73
Euclid
72
Wiles
71
Gauss
70
Euler
69
Laplace
68
Fibonacci
67
Fermat
88
Fermat
87
Fourier
86
Thales
85
Galois
84
Möbius
83
Pythagoras
82
Pascal
81
Wiles
80
Möbius
79
Noether
78
Euclid
99
Thales
98
Euclid
97
Goldbach
96
Noether
95
Pascal
94
Laplace
93
Fourier
92
Euler
91
Pythagoras
90
Fermat
89
Gauss
Andrew Wiles (b. 1953)
Andrew Wiles (b. 1953)
Click here to read more about Andrew Wiles on Wikipedia
In 1995, over 350 years after it was first conjectured, Andrew Wiles managedto prove Fermat’s Last Theorem, according to which there exist no wholenumbers x, y, z that fulfill the equation xn + yn = zn for any n > 2.In 1995, over 350 years after it was first conjectured, Andrew Wiles managedto prove Fermat’s Last Theorem, according to which there exist no wholenumbers x, y, z that fulfill the equation xn + yn = zn for any n > 2.
•Choose any double-digit number (from 10 to 99).•Choose any double-digit number (from 10 to 99).
•Subtract in succession each of the digits from thenumber you chose (e.g. for 37 subtract 7followed by 3).•Subtract in succession each of the digits from thenumber you chose (e.g. for 37 subtract 7followed by 3).
•Remember the outcome and do not reveal it toyour computer!•Remember the outcome and do not reveal it toyour computer!
•Ready to proceed?•Ready to proceed?
Locate the cell with your number and read the name of the mathematician.Close your eyes and try to envision this mathematician. What do you knowabout him/her? What did he/she hypothesize or prove? When did he/she live?Locate the cell with your number and read the name of the mathematician.Close your eyes and try to envision this mathematician. What do you knowabout him/her? What did he/she hypothesize or prove? When did he/she live?
Ready to proceed?Ready to proceed?
11
Euclid
10
Euler
9
Fermat
8
Pascal
7
Gauss
6
Pythagoras
5
Noether
4
Wiles
3
Goldbach
2
Kovalevsky
1
Fibonacci
22
Galois
21
Thales
20
Goldbach
19
Fourier
18
Fermat
17
Wiles
16
Euler
15
Möbius
14
Gauss
13
Galois
12
Gödel
33
Thales
32
Euclid
31
Noether
30
Pythagoras
29
Laplace
28
Thales
27
Fermat
26
Goldbach
25
Noether
24
Fourier
23
Noether
44
Gauss
43
Goldbach
42
Möbius
41
Euler
40
Goldbach
39
Noether
38
Thales
37
Euclid
36
Fermat
35
Thales
34
Pascal
55
Noether
54
Fermat
53
Thales
52
Euclid
51
Thales
50
Pascal
49
Goldbach
48
Pythagoras
47
Euler
46
Gauss
45
Fermat
66
Möbius
65
Laplace
64
Goldbach
63
Fermat
62
Noether
61
Euler
60
Fourier
59
Gauss
58
Wiles
57
Möbius
56
Goldbach
77
Pascal
76
Pythagoras
75
Galois
74
Wiles
73
Euclid
72
Fermat
71
Gauss
70
Wiles
69
Laplace
68
Fibonacci
67
Euler
88
Euler
87
Fourier
86
Thales
85
Galois
84
Möbius
83
Pythagoras
82
Pascal
81
Fermat
80
Möbius
79
Noether
78
Euclid
99
Thales
98
Euclid
97
Goldbach
96
Noether
95
Pascal
94
Laplace
93
Fourier
92
Wiles
91
Pythagoras
90
Euler
89
Gauss
Pierre de Fermat (1601 – 1665)
Pierre de Fermat (1601 – 1665)
Click here to read more about Pierre de Fermat on Wikipedia
Fermat was a professional lawyer and an amateur mathematician. In 1637 hescribbled in the margin of a mathematics textbook a conjecture that is todayknown as Fermat’s Last Theorem. The proof came only 350 years later…Fermat was a professional lawyer and an amateur mathematician. In 1637 hescribbled in the margin of a mathematics textbook a conjecture that is todayknown as Fermat’s Last Theorem. The proof came only 350 years later…
•Choose any double-digit number (from 10 to 99).•Choose any double-digit number (from 10 to 99).
•Subtract in succession each of the digits from thenumber you chose (e.g. for 37 subtract 7followed by 3).•Subtract in succession each of the digits from thenumber you chose (e.g. for 37 subtract 7followed by 3).
•Remember the outcome and do not reveal it toyour computer!•Remember the outcome and do not reveal it toyour computer!
•Ready to proceed?•Ready to proceed?
Locate the cell with your number and read the name of the mathematician.Close your eyes and try to envision this mathematician. What do you knowabout him/her? What did he/she hypothesize or prove? When did he/she live?Locate the cell with your number and read the name of the mathematician.Close your eyes and try to envision this mathematician. What do you knowabout him/her? What did he/she hypothesize or prove? When did he/she live?
Ready to proceed?Ready to proceed?
11
Euclid
10
Fermat
9
Möbius
8
Pascal
7
Gauss
6
Pythagoras
5
Noether
4
Wiles
3
Goldbach
2
Kovalevsky
1
Fibonacci
22
Galois
21
Thales
20
Goldbach
19
Fourier
18
Möbius
17
Wiles
16
Euler
15
Euler
14
Gauss
13
Galois
12
Gödel
33
Thales
32
Euclid
31
Noether
30
Pythagoras
29
Laplace
28
Thales
27
Möbius
26
Goldbach
25
Noether
24
Fourier
23
Noether
44
Gauss
43
Goldbach
42
Möbius
41
Euler
40
Goldbach
39
Noether
38
Thales
37
Euclid
36
Möbius
35
Thales
34
Pascal
55
Noether
54
Möbius
53
Thales
52
Euclid
51
Thales
50
Pascal
49
Goldbach
48
Pythagoras
47
Euler
46
Gauss
45
Möbius
66
Euler
65
Laplace
64
Goldbach
63
Möbius
62
Noether
61
Euler
60
Fourier
59
Gauss
58
Wiles
57
Euler
56
Goldbach
77
Pascal
76
Pythagoras
75
Galois
74
Wiles
73
Euclid
72
Möbius
71
Gauss
70
Wiles
69
Laplace
68
Fibonacci
67
Euler
88
Euler
87
Fourier
86
Thales
85
Galois
84
Möbius
83
Pythagoras
82
Pascal
81
Möbius
80
Euler
79
Noether
78
Euclid
99
Thales
98
Euclid
97
Goldbach
96
Noether
95
Pascal
94
Laplace
93
Fourier
92
Wiles
91
Pythagoras
90
Euler
89
Gauss
August Ferdinand Möbius (1790 – 1868)
August Ferdinand Möbius (1790 – 1868)
Click here to read more about August Ferdinand Möbius on Wikipedia
Möbius is most famous for the strip he had designed and is now named after him.Due to its twisted shape, the Möbius strip is unique for having only one surfaceand one edge.Möbius is most famous for the strip he had designed and is now named after him.Due to its twisted shape, the Möbius strip is unique for having only one surfaceand one edge.
•Choose any double-digit number (from 10 to 99).•Choose any double-digit number (from 10 to 99).
•Subtract in succession each of the digits from thenumber you chose (e.g. for 37 subtract 7followed by 3).•Subtract in succession each of the digits from thenumber you chose (e.g. for 37 subtract 7followed by 3).
•Remember the outcome and do not reveal it toyour computer!•Remember the outcome and do not reveal it toyour computer!
•Ready to proceed?•Ready to proceed?
Locate the cell with your number and read the name of the mathematician.Close your eyes and try to envision this mathematician. What do you knowabout him/her? What did he/she hypothesize or prove? When did he/she live?Locate the cell with your number and read the name of the mathematician.Close your eyes and try to envision this mathematician. What do you knowabout him/her? What did he/she hypothesize or prove? When did he/she live?
Ready to proceed?Ready to proceed?
11
Euclid
10
Fermat
9
Thales
8
Pascal
7
Gauss
6
Pythagoras
5
Noether
4
Wiles
3
Goldbach
2
Kovalevsky
1
Fibonacci
22
Galois
21
Euler
20
Goldbach
19
Fourier
18
Thales
17
Wiles
16
Euler
15
Möbius
14
Gauss
13
Galois
12
Gödel
33
Euler
32
Euclid
31
Noether
30
Pythagoras
29
Laplace
28
Euler
27
Thales
26
Goldbach
25
Noether
24
Fourier
23
Noether
44
Gauss
43
Goldbach
42
Möbius
41
Euler
40
Goldbach
39
Noether
38
Euler
37
Euclid
36
Thales
35
Euler
34
Pascal
55
Noether
54
Thales
53
Euler
52
Euclid
51
Euler
50
Pascal
49
Goldbach
48
Pythagoras
47
Euler
46
Gauss
45
Thales
66
Möbius
65
Laplace
64
Goldbach
63
Thales
62
Noether
61
Euler
60
Fourier
59
Gauss
58
Wiles
57
Möbius
56
Goldbach
77
Pascal
76
Pythagoras
75
Galois
74
Wiles
73
Euclid
72
Thales
71
Gauss
70
Wiles
69
Laplace
68
Fibonacci
67
Euler
88
Euler
87
Fourier
86
Euler
85
Galois
84
Möbius
83
Pythagoras
82
Pascal
81
Thales
80
Möbius
79
Noether
78
Euclid
99
Thales
98
Euclid
97
Goldbach
96
Noether
95
Pascal
94
Laplace
93
Fourier
92
Wiles
91
Pythagoras
90
Euler
89
Gauss
Thales of Miletus (c. 624 BC – c. 546 BC)
Thales of Miletus (c. 624 BC – c. 546 BC)
Click here to read more about Thales on Wikipedia
Among other achievements, Thales came up with the theorem which bears hisname: any triangle whose three vertices lie on the circumference of a circle andone of its sides is the diameter of that circle is a right triangle. In addition, Thalesproved that the angles of any triangle sum up to 180º.Among other achievements, Thales came up with the theorem which bears hisname: any triangle whose three vertices lie on the circumference of a circle andone of its sides is the diameter of that circle is a right triangle. In addition, Thalesproved that the angles of any triangle sum up to 180º.
•Choose any double-digit number (from 10 to 99).•Choose any double-digit number (from 10 to 99).
•Subtract in succession each of the digits from thenumber you chose (e.g. for 37 subtract 7followed by 3).•Subtract in succession each of the digits from thenumber you chose (e.g. for 37 subtract 7followed by 3).
•Remember the outcome and do not reveal it toyour computer!•Remember the outcome and do not reveal it toyour computer!
•Ready to proceed?•Ready to proceed?
Locate the cell with your number and read the name of the mathematician.Close your eyes and try to envision this mathematician. What do you knowabout him/her? What did he/she hypothesize or prove? When did he/she live?Locate the cell with your number and read the name of the mathematician.Close your eyes and try to envision this mathematician. What do you knowabout him/her? What did he/she hypothesize or prove? When did he/she live?
Ready to proceed?Ready to proceed?
11
Euclid
10
Fermat
9
Pascal
8
Euler
7
Gauss
6
Pythagoras
5
Noether
4
Wiles
3
Goldbach
2
Kovalevsky
1
Fibonacci
22
Galois
21
Thales
20
Goldbach
19
Fourier
18
Pascal
17
Wiles
16
Thales
15
Möbius
14
Gauss
13
Galois
12
Gödel
33
Thales
32
Euclid
31
Noether
30
Pythagoras
29
Laplace
28
Thales
27
Pascal
26
Goldbach
25
Noether
24
Fourier
23
Noether
44
Gauss
43
Goldbach
42
Möbius
41
Euler
40
Goldbach
39
Noether
38
Thales
37
Euclid
36
Pascal
35
Thales
34
Euler
55
Noether
54
Pascal
53
Thales
52
Euclid
51
Thales
50
Euler
49
Goldbach
48
Pythagoras
47
Thales
46
Gauss
45
Pascal
66
Möbius
65
Laplace
64
Goldbach
63
Pascal
62
Noether
61
Thales
60
Fourier
59
Gauss
58
Wiles
57
Möbius
56
Goldbach
77
Euler
76
Pythagoras
75
Galois
74
Wiles
73
Euclid
72
Pascal
71
Gauss
70
Wiles
69
Laplace
68
Fibonacci
67
Thales
88
Euler
87
Fourier
86
Thales
85
Galois
84
Möbius
83
Pythagoras
82
Euler
81
Pascal
80
Möbius
79
Noether
78
Euclid
99
Thales
98
Euclid
97
Goldbach
96
Noether
95
Euler
94
Laplace
93
Fourier
92
Wiles
91
Pythagoras
90
Euler
89
Gauss
Blaise Pascal (1623 – 1662)
Blaise Pascal (1623 – 1662)
Click here to read more about Blaise Pascal on Wikipedia
Among other achievements, Pascal is famous for the triangle which today bearshis name. While he wasn’t the first to describe Pascal’s Triangle, Pascal was thefirst to realize its value in performing calculations in the field of combinatorics.Among other achievements, Pascal is famous for the triangle which today bearshis name. While he wasn’t the first to describe Pascal’s Triangle, Pascal was thefirst to realize its value in performing calculations in the field of combinatorics.
•Choose any double-digit number (from 10 to 99).•Choose any double-digit number (from 10 to 99).
•Subtract in succession each of the digits from thenumber you chose (e.g. for 37 subtract 7followed by 3).•Subtract in succession each of the digits from thenumber you chose (e.g. for 37 subtract 7followed by 3).
•Remember the outcome and do not reveal it toyour computer!•Remember the outcome and do not reveal it toyour computer!
•Ready to proceed?•Ready to proceed?
All pictures taken from Wikipedia.