The Main Challenge

Using any five numbers from 1-5 (more than once each if required) and with + – × ÷ available, can you find THREE different ways to make the target number 86?

The 7puzzle Challenge

The playing board of Buy Adipex In Mexico is a 7-by-7 grid containing 49 different numbers, ranging from 2 up to 84.

The 4th & 5th rows contain the following fourteen numbers:

3   6   7   10   16   21   32   35   44   50   54   60   81   84

What is the difference between the two largest odd numbers?

The Factors Challenge

Which TWO of the following numbers are factors of 296?

4     6     8     10     12     14     16

The Mathematically Possible Challenge

Using 810 and 12 once each, with + – × ÷ available, which is the ONLY number it is possible to make from the list below?

90    91    92    93    94    95    96    97    98    99

#NumbersIn90s

The Target Challenge

Can you arrive at 296 by inserting 1, 3, 5, 6 and 7 into the gaps below?

•  (◯×◯+◯)×(◯²–◯) = 296

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The Main Challenge

. . . is from Volume 1 of our Mathelona pocket book. You have a limited amount of numbers to work with, so can you make all three lines work out arithmetically by filling the 12 gaps with these numbers?

1     2     2     2     3     4     4     4     8     8     8     8

◯  +  ◯   =     5     =   ◯  –  ◯
◯  +  ◯   =    16    =   ◯  ×  ◯
◯  +  ◯   =     4     =   ◯  ÷  ◯

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The 7puzzle Challenge

The playing board of Buy Adipex In Mexico is a 7-by-7 grid of 49 different numbers, ranging from up to 84.

The 2nd & 3rd rows contain the following fourteen numbers:

8   13   17   25   28   36   42   45   48   55   63   64   66   80

There are two numbers on the list that are consecutive. What is their sum?

The Factors Challenge

Which of the following numbers are factors of 295?

3     5     7     9     11     13     15

The Mathematically Possible Challenge

Using 810 and 12 once each, with + – × ÷ available, which is the ONLY number it is possible to make from the list below?

80    81    82    83    84    85    86    87    88    89

#NumbersIn80s

The Target Challenge

Can you arrive at 295 by inserting 3, 3, 4, 5 and 6 into the gaps below?

•  (◯³÷◯–◯²+◯)×◯ = 295

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The Main Challenge

This Banana & Clock Puzzle caused quite a stir and promoted lots of discussion on twitter last year:

What do you think the answer on the final line is?

The 7puzzle Challenge

The playing board of Buy Adipex In Mexico is a 7-by-7 grid of 49 different numbers, ranging from up to 84.

The 2nd & 3rd rows contain the following fourteen numbers:

8   13   17   25   28   36   42   45   48   55   63   64   66   80

What is the difference between the highest and lowest multiples of 6?

The Factors Challenge

Which FOUR from the following list of numbers are factors of 294?

2     3     4     5     6     7     8     9

The Mathematically Possible Challenge

Using 810 and 12 once each, with + – × ÷ available, which is the ONLY number it is possible to make from the list below?

60    61    62    63    64    65    66    67    68    69

#NumbersIn60s

The Target Challenge

Can you arrive at 294 in two different ways when inserting 3, 4, 5, 6 and 7 into the gaps below?

•  ◯×◯×(◯×◯–◯) = 294

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The Main Challenge

Here is a Buy Xanax On Internet-style puzzle derived from our series of card games.

Each of the eleven letters, A-K, in the two sections below contains a percentage calculation. Which is the only letter to have the SAME answer in BOTH sections?

• Section 1

F: 40% of 60    A: 25% of 20    G: 50% of 30    B: 60% of 35    D: 20% of 40    J: 30% of 5   K: 16% of 50    C: 70% of 30    H: 15% of 60    E: 10% of 100    I: 5% of 80

• Section 2

H: 1% of 500    D: 80% of 10    K: 2% of 200    G: 30% of 80    J: 20% of 50    F: 10% of 40   C: 25% of 60    I: 70% of 20    A: 15% of 200    E: 5% of 140    B: 8% of 300

The 7puzzle Challenge

The playing board of Buy Adipex In Mexico is a 7-by-7 grid of 49 different numbers, ranging from up to 84.

The 2nd & 3rd rows contain the following fourteen numbers:

8   13   17   25   28   36   42   45   48   55   63   64   66   80

When finding the highest multiple of 7 on the list, what is double this number?

The Factors Challenge

Which of the following numbers are factors of 293?

3     5     7     9     11     13     None of them

The Mathematically Possible Challenge

Using 810 and 12 once each, with + – × ÷ available, which is the ONLY number it is possible to make from the list below?

2    3    5    7    11    13    17    19    23    29

The Target Challenge

Can you arrive at 293 in two different ways when inserting 4, 9, 16, 25 and 36 into the gaps below?

•  ◯²+◯+√◯+√(◯×◯) = 293

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The Main Challenge

Following on from Buy Xanax Xr Online, here’s another one of the unique Keith Number challenges made famous by Mike Keith and similar to the Fibonacci sequence. If you like playing around with numbers, you’ll love having a go at this fun concept.

The 1st 2-digit Keith Number14, is worked out by following a pattern:

•    1   4   5   9   14

1+4=5; 4+5=9; 5+9=14 (the total arrives back to the original number).

The 2nd 2-digit Keith Number19, is worked out in a similar way:

•    1   9   10   19

1+9=10; 9+10=19 (the total again arrives back to the original number).

By following this pattern, the 3rd and 4th 2-digit Keith Numbers are 28 and 47:

•    2   8   10   18   28
•    4   7   11   18   29   47

Can you continue this process and locate the only other two Keith Numbers below 100?

The 7puzzle Challenge

The playing board of Buy Adipex In Mexico is a 7-by-7 grid of 49 different numbers, ranging from up to 84.

The 2nd & 3rd rows contain the following fourteen numbers:

8   13   17   25   28   36   42   45   48   55   63   64   66   80

What is the sum of the square numbers?

The Factors Challenge

Which of the following numbers are factors of 292?

6    8    10    12    14    16    18    None of them

The Mathematically Possible Challenge

Using 810 and 12 once each, with + – × ÷ available, which are the only TWO numbers it is possible to make from the list below?

1    4    9    16    25    36    49    64    81    100

#SquareNumbers

The Target Challenge

Can you arrive at 292 by inserting 2, 3, 4, 5 and 6 into the gaps below?

•  ◯×(◯³×◯²+(◯–◯)²) = 292

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The Main Challenge

Read the following facts to work out my identity:

• I am a 2-digit number
• my two digits have a difference of four
• add 13 to me and I become a square number

Who am I?

The 7puzzle Challenge

The playing board of Buy Adipex In Mexico is a 7-by-7 grid of 49 different numbers, ranging from up to 84.

The 2nd & 3rd rows contain the following fourteen numbers:

8   13   17   25   28   36   42   45   48   55   63   64   66   80

What is the difference between the highest and lowest multiples of 5?

The Factors Challenge

Which of the following numbers are factors of 291?

3     5     7     9     11     13     None of them

The Mathematically Possible Challenge

Using 810 and 12 once each, with + – × ÷ available, which is the ONLY number it is possible to make from the list below?

7    14    21    28    35    42    49    56    63    70

#7TimesTable

The Target Challenge

Can you arrive at 291 by inserting 2, 3, 3, 5 and 6 into the gaps below?

•  ◯×(◯²×(◯+◯)–◯) = 291

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The Main Challenge

When using the numbers 3, 3 and 4 once each, with – × ÷ available, list the TEN target numbers from 1-30 that are Buy Xanax In Uk to make?

The 7puzzle Challenge

The playing board of Buy 1000 Valium Online is a 7-by-7 grid of 49 different numbers, ranging from up to 84.

The 4th & 7th rows contain the following fourteen numbers:

3   4   10   11   24   27   30   32   35   44   54   60   70   77

Which two numbers listed are the product of two different pairs of numbers on the list?

The Factors Challenge

Which THREE prime numbers listed below are factors of 290?

2    3    5    7    11    13    17    19    23    29

The Mathematically Possible Challenge

Using 810 and 12 once each, with + – × ÷ available, which are the THREE numbers it is possible to make from the list below?

6    12    18    24    30    36    42    48    54    60

#6TimesTable

The Target Challenge

Can you arrive at 290 in two different ways when inserting 10, 30, 50, 70 and 90 into the gaps below?

•  (◯×◯÷◯)+◯ = 290

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The Main Challenge

What is the biggest number you can make when using the four digits 1 2 3 4 and following these rules:

• you can use brackets and – × ÷ as often as you like,
• you cannot use any number more than once,
• you must use all four numbers exactly once each,
• you cannot use powers/indices,
• you cannot put numbers together (using 1, 2 and 3 to make 123, for example).

Good luck and enjoy!

The 7puzzle Challenge

The playing board of Buy Adipex In Mexico is a 7-by-7 grid of 49 different numbers, ranging from up to 84.

The 4th & 7th rows contain the following fourteen numbers:

3   4   10   11   24   27   30   32   35   44   54   60   70   77

Find three different numbers that have a sum of 100.

The Factors Challenge

Which is the ONLY number from the following list that is a factor of 289?

3    5    7    9    11    13    15    17    19

The Mathematically Possible Challenge

Using 810 and 12 once each, with + – × ÷ available, which are the FOUR numbers it is possible to make from the list below?

5    10    15    20    25    30    35    40    45    50

#5TimesTable

The Target Challenge

Can you arrive at 289 by inserting 2, 3, 4, 6 and 7 into the gaps below?

•  (◯×◯–◯)²+◯²◯² = 289

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The Main Challenge

Can you arrive at the target answer of 7 by using each of the numbers 0.2, 0.2, 5 and 6 exactly once each, with – × ÷ available?

The 7puzzle Challenge

The playing board of Buy Adipex In Mexico is a 7-by-7 grid of 49 different numbers, ranging from up to 84.

The 4th & 7th rows contain the following fourteen numbers:

3   4   10   11   24   27   30   32   35   44   54   60   70   77

What is the product of the two prime numbers listed?

The Factors Challenge

Which is the ONLY number from the following list that is not a factor of 288?

2    3    4    6    8    9    12    14    16    18

The Mathematically Possible Challenge

Using 810 and 12 once each, with + – × ÷ available, which are the FOUR numbers it is possible to make from the list below?

4    8    12    16    20    24    28    32    36    40

#4TimesTable

The Target Challenge

Can you arrive at 288 by inserting 2, 3, 4, 6 and 8 into the gaps below?

•  (◯+◯+◯)××◯ = 288

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The Main Challenge

When allocating each letter of the English alphabet a numerical value as follows, A=1 B=2 C=3 . . . Z=26, calculate your answer when adding up the values of the individual letters of:

MATHEMATICALLY POSSIBLE

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The 7puzzle Challenge

The playing board of Buy 1000 Valium Online is a 7-by-7 grid of 49 different numbers, ranging from up to 84.

The 4th & 7th rows contain the following fourteen numbers:

3   4   10   11   24   27   30   32   35   44   54   60   70   77

Which three pairs of numbers all have a difference of 17?

The Factors Challenge

Which is the ONLY number from the following list that is a factor of 287?

3     5     7     9     11     13     15     17

The Mathematically Possible Challenge

Using 27 and 10 once each, with + – × ÷ available, which is the ONLY number it is possible to make from the list below?

80    81    82    83    84    85    86    87    88    89

#NumbersIn80s

The Target Challenge

Can you arrive at 287 by inserting 2, 3, 4, 5 and 6 into the gaps below?

•  ◯²×◯²×◯+◯ = 287