Teammate Selection
Select a 6th grade
teammate
1,000,000
Are You Smarter Than a
6th Grader?
500,000
300,000
175,000
100,000
Comparing and ordering fractions
1
Comparing and Ordering Fractions & Dec.
3
Add or subtract Mixed Numbers
Add or subtract Mixed Numbers
4
50,000
25,000
GCF & Prime Factorization
5
GCF & Prime Factorization
6
10,000
5,000
2,000
1,000
Estimating sums or differences
7
Converting between fractions and decimals
Save
Estimating sums or differences
9
Copy
Divisibility Rules
Peek
10
8
6th Grade Topic 1 Question
Order
the fractions from least to
greatest.
4 5 3 1
, , ,
7 9 8 2
6th Grade Topic 1 Answer
3 1 5 4
, , ,
8 2 9 7
6th Grade Topic 2 Question
Order
the fractions and decimals
from least to greatest.
3
1
, 0 .29 , , 0 .4
8
9
6th Grade Topic 2 Answer
1
3
, 0 .29 , , 0 .4
9
8
6th Grade Topic 3 Question
Add.
form.
Write the answer in simplest
4
2
9
2
4
9

6th Grade Topic 3 Answer
6
2
3
6th Grade Topic 4 Question
Subtract.
Write your answer in
simplest form.
6
11
12
2
5
12

6th Grade Topic 4 Answer
4
1
2
6th Grade Topic 5 Question
Find
the greatest common factor of
27, 90, 135, and 72.
6th Grade Topic 5 Answer
GCF
is 9.
6th Grade Topic 6 Question
Write
280.
the prime factorization of
6th Grade Topic 6 Answer
2 57
3
6th Grade Topic 7 Question
Estimate
the sum.
2
11
12


4
9

6
7
 about
6th Grade Topic 7 Answer
4
1
2
6th Grade Topic 8 Question
Estimate
the difference.
2
7
13

2
1
5
 about
6th Grade Topic 8 Answer
1
2
6th Grade Topic 9 Question
Question
Question
A: Convert 5
5
8
to a decimal.
B: Convert 3.68 to a
fraction and write the answer in

simplest form.
6th Grade Topic 9 Answer
Question
A: 5.625
Question
B:

3
68  4
100  4
 3
17
25
6th Grade Topic 10 Question
Create
a 5 digit number that is
divisible by 2, 3, 4, 6, and 9.
6th Grade Topic 10 Answer
Your answer must have the following:
5 digits
End in an even number
The digits must add up to a number divisible
by 9
The last two digits must form a number
divisible by 4
Million Dollar Question
Grade Level Topic 11
Type in the topic for the question
1,000,000 Question
Students
at a school dance formed equal
teams to play a game. When they formed
teams of 3,4,5,or 6, there was always one
person left out. What is the smallest
number of students who could have been at
the dance?
1,000,000 Answer
61
students.
The
least common multiple of the
numbers is 60. Since, 3, 4, 5, and 6
go into 60 evenly, and there was one
student leftover, there would be 61
students.
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I
am smarter
Than a
6th grader!