Number Info for

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Count the number of tens:

2 tens

Add up Ten-Groups

Ten-Groups = 10 + 10

Ten-Groups = 20

Count the number of ones:

5 ones

Add this to the ones for our total:

25 = 0 Hundreds + 20 Tens + 5 ones

25 = 0 + 20 + 5

Show numerical properties of 25

25

Draw this point on a number line:

Word Notation for 25

twenty five

Write the number 25 in expanded notation form:

Decompose 25

Express in powers of 10

Each digit in the whole number represents a power of 10:

Take the whole number portion on the left side of the decimal

Build Expanded Notation with powers of 10

Expanded Notation of 25 = (2 x 10¹) + (5 x 10⁰)

Expanded Notation of 25 = (2 x 10) + (5 x 1)

Prove this is the correct notation:

25 = 20 + 5

25 = 25 <---- Correct!

Tally Marks for 25

Make blocks of 5

Tally Marks Definition:

1 tally mark = |

2 tally marks = ||

3 tally marks = |||

4 tally marks = ||||

5 tally marks = | | | |

5 blocks of 5 and 0 left over

5 = | | | |

10 = | | | |

15 = | | | |

20 = | | | |

25 = | | | |

Tallies for 25

| | | | | | | | | | | | | | | | | | | |

Ordinal for 25

Define an ordinal number

A position in a list

25th

Digit and Reduced Digit Sum for 25

Calculate the digit sum of 25

Calculate the reduced digit sum of 25

Add up 2 digits of 25:

Digit Sum → 2 + 5 = 7

Since our digit sum ≤ 9:
we have our reduced digit sum

Digit Sum → 2 + 5 = 7

Digit Product for 25:

Calculate the digit product of 25

Digit Product = Value when you multiply
all the digits of a number together.

We multiply the 2 digits of 25 together

Digit product of 25 = 2 * 5

Digit product of 25 = 10

Opposite of 25

Opposite of 25 = -(25)

Opposite of = -25

Place Value for 25

Place value describes each digit

Whole Number Position 2: 25

2 is our tens digit

This means we have 2 sets of tens

Whole Number Position 1: 25

5 is our ones digit

This means we have 5 sets of ones

2 is our tens digit
5 is our ones digit

Natural Logarithm of 25

When e^y = x and e = 2.718281828459
We have Ln(x) = log_e(x) = y

Evaluate x = 25

Ln(25) = log_e(25) = 3.2188758248682

Is 25 divisible by:

2,3,4,5,6,7,8,9,10,11

Divisibililty Check for 2

Last digit ends in 0,2,4,6,8

The last digit of 25 is 5

Since 5 is not equal to 0,2,4,6,8:
then 25 is not divisible by 2

Divisibililty Check for 3

Sum of the digits is divisible by 3

The sum of the digits for 25 is 2 + 5 = 7

Since 7 is not divisible by 3:
Then 25 is not divisible by 3

Divisibililty Check for 4

Take the last two digits
Are they divisible by 4?

The last 2 digits of 25 are 25

Since 25 is not divisible by 4:
Then 25 is not divisible by 4

Divisibililty Check for 5

Number ends with a 0 or 5

The last digit of 25 is 5

Since 5 is equal to 0 or 5:
Then 25 is divisible by 5

Divisibililty Check for 6

Divisible by both 2 and 3

Since 25 is not divisible by 2 and 3:
Then 25 is not divisible by 6

Divisibililty Check for 7

Multiply each respective digit by 1,3,2,6,4,5
Work backwards
Repeat as necessary

5(1) + 2(3) = 12

Since 12 is not divisible by 7:
Then 25 is not divisible by 7

Divisibililty Check for 8

Take the last three digits
Are they divisible by 8

The last 2 digits of 25 are 25

Since 25 is not divisible by 8:
Then 25 is not divisible by 8

Divisibililty Check for 9

Sum of digits divisible by 9

The sum of the digits for 25 is 2 + 5 = 7

Since 7 is not divisible by 9:
Then 25 is not divisible by 9

Divisibililty Check for 10

Ends with a 0

The last digit of 25 is 5

Since 5 is not equal to 0:
Then 25 is not divisible by 10

Divisibililty Check for 11

Σ odd digits - Σ even digits = 0
or 25 is a multiple of 11

Sum the odd digits:

25

2

Odd Sum = 2

Sum the even digits:

25

5

Even Sum = 5

Take the difference:

Δ = Odd Sum - Even Sum

Δ = 2 - 5

Δ = -3

Divisibility Check:

Because Δ / 11 = 2.2727272727273:
Then 25 is NOT divisible by 11

Divisibility Final Answer

25 is divisible by
(5)

Final Answer