1.3 names and addition
description
Transcript of 1.3 names and addition
Names of Numbers
For conveniences, we name some of the larger units in our decimal (base 10) system as shown.
Names of Numbers
1’s10’s100’s1,000’s10,000’s
ones tens hundredthousandten–thousand
100,000’s1,000,000’s
hundred–thousandmillion
For conveniences, we name some of the larger units in our decimal (base 10) system as shown.
Names of Numbers
1’s10’s100’s1,000’s10,000’s
ones tens hundredthousandten–thousand
100,000’s1,000,000’s
hundred–thousandmillion
1,000,000 = one million (six 0’s)1,000 = one thousand (three 0’s)
1,000,000,000 = one billion1,000,000,000,000 = one trillion
(nine 0’s) (twelve 0’s)
For conveniences, we name some of the larger units in our decimal (base 10) system as shown.
Names of Numbers
1’s10’s100’s1,000’s10,000’s
ones tens hundredthousandten–thousand
100,000’s1,000,000’s
hundred–thousandmillion
1,000,000 = one million (six 0’s)1,000 = one thousand (three 0’s)
1,000,000,000 = one billion1,000,000,000,000 = one trillion
(nine 0’s) (twelve 0’s)
Hence 3,054,208 is
For conveniences, we name some of the larger units in our decimal (base 10) system as shown.
Names of Numbers
1’s10’s100’s1,000’s10,000’s
ones tens hundredthousandten–thousand
100,000’s1,000,000’s
hundred–thousandmillion
1,000,000 = one million1,000,000,000 = one billion1,000,000,000,000 = one trillion
(six 0’s) (nine 0’s) (twelve 0’s)
1,000 = one thousand
Hence 3,054,208 is “three million
(three 0’s)
For conveniences, we name some of the larger units in our decimal (base 10) system as shown.
Names of Numbers
1’s10’s100’s1,000’s10,000’s
ones tens hundredthousandten–thousand
100,000’s1,000,000’s
hundred–thousandmillion
1,000,000 = one million1,000,000,000 = one billion1,000,000,000,000 = one trillion
(six 0’s) (nine 0’s) (twelve 0’s)
1,000 = one thousand
Hence 3,054,208 is “three million fifty four thousand
(three 0’s)
For conveniences, we name some of the larger units in our decimal (base 10) system as shown.
Names of Numbers
1’s10’s100’s1,000’s10,000’s
ones tens hundredthousandten–thousand
100,000’s1,000,000’s
hundred–thousandmillion
1,000,000 = one million1,000,000,000 = one billion1,000,000,000,000 = one trillion
(six 0’s) (nine 0’s) (twelve 0’s)
1,000 = one thousand
Hence 3,054,208 is “three million fifty four thousand two hundred and eight.”
(three 0’s)
For conveniences, we name some of the larger units in our decimal (base 10) system as shown.
Names of Numbers
1’s10’s100’s1,000’s10,000’s
ones tens hundredthousandten–thousand
100,000’s1,000,000’s
hundred–thousandmillion
1,000,000 = one million1,000,000,000 = one billion1,000,000,000,000 = one trillion
(six 0’s) (nine 0’s) (twelve 0’s)
1,000 = one thousand
Hence 3,054,208 is “three million fifty four thousand two hundred and eight.”
(three 0’s)
The number 40 is 10 times as much as 4 since the 0 shifted the 4 to a higher value slot.
For conveniences, we name some of the larger units in our decimal (base 10) system as shown.
Names of Numbers
1’s10’s100’s1,000’s10,000’s
ones tens hundredthousandten–thousand
100,000’s1,000,000’s
hundred–thousandmillion
1,000,000 = one million1,000,000,000 = one billion1,000,000,000,000 = one trillion
(six 0’s) (nine 0’s) (twelve 0’s)
1,000 = one thousand
Hence 3,054,208 is “three million fifty four thousand two hundred and eight.”
(three 0’s)
The number 40 is 10 times as much as 4 since the 0 shifted the 4 to a higher value slot. But the number 04 is the same as 4 since the 0 to the left indicating an empty slot so it’s valueless.
AdditionTo “add” means to combine two quantities A and B.
The digit–sum table (Wikipedia)
AdditionTo “add” means to combine two quantities A and B.
The digit–sum table (Wikipedia)
All the following words mean to “add”: total, sum, combine, increase by, count up, aggregate, augmented by, tally, etc..
AdditionTo “add” means to combine two quantities A and B.
The digit–sum table (Wikipedia)
AdditionTo “add” means to combine two quantities A and B.
The digit–sum table (Wikipedia)
All the following words mean to “add”: total, sum, combine, increase by, count up, aggregate, augmented by, tally, etc..
AdditionTo “add” means to combine two quantities A and B.
The digit–sum table (Wikipedia)
The combined result is called the sum or the total of A and B.
All the following words mean to “add”: total, sum, combine, increase by, count up, aggregate, augmented by, tally, etc..
AdditionTo “add” means to combine two quantities A and B.
The digit–sum table (Wikipedia)
The combined result is called the sum or the total of A and B.
All the following words mean to “add”: total, sum, combine, increase by, count up, aggregate, augmented by, tally, etc..
A, B are called the addends and the sum is often denoted as S i.e. A + B = S (Sum).
AdditionTo “add” means to combine two quantities A and B.
The digit–sum table (Wikipedia)
To add two numbers,
Example A. Add 8,978 + 657
The combined result is called the sum or the total of A and B.
All the following words mean to “add”: total, sum, combine, increase by, count up, aggregate, augmented by, tally, etc..
A, B are called the addends and the sum is often denoted as S i.e. A + B = S (Sum).
AdditionTo “add” means to combine two quantities A and B.
The digit–sum table (Wikipedia)
To add two numbers,
Example A. Add 8,978 + 657
8,978657+
The combined result is called the sum or the total of A and B.
All the following words mean to “add”: total, sum, combine, increase by, count up, aggregate, augmented by, tally, etc..
A, B are called the addends and the sum is often denoted as S i.e. A + B = S (Sum).
1. line up the numbers vertically to match the place values,
AdditionTo “add” means to combine two quantities A and B.
The digit–sum table (Wikipedia)
To add two numbers,
Example A. Add 8,978 + 657
8,978657+
2. add the digits from right to left and “carry” when necessary.
The combined result is called the sum or the total of A and B.
All the following words mean to “add”: total, sum, combine, increase by, count up, aggregate, augmented by, tally, etc..
A, B are called the addends and the sum is often denoted as S i.e. A + B = S (Sum).
1. line up the numbers vertically to match the place values,
AdditionTo “add” means to combine two quantities A and B.
The digit–sum table (Wikipedia)
To add two numbers,
Example A. Add 8,978 + 657
8,978657+
1
5
2. add the digits from right to left and “carry” when necessary.
The combined result is called the sum or the total of A and B.
All the following words mean to “add”: total, sum, combine, increase by, count up, aggregate, augmented by, tally, etc..
A, B are called the addends and the sum is often denoted as S i.e. A + B = S (Sum).
1. line up the numbers vertically to match the place values,
AdditionTo “add” means to combine two quantities A and B.
The digit–sum table (Wikipedia)
To add two numbers,
Example A. Add 8,978 + 657
8,978657+
1
53
1
2. add the digits from right to left and “carry” when necessary.
The combined result is called the sum or the total of A and B.
All the following words mean to “add”: total, sum, combine, increase by, count up, aggregate, augmented by, tally, etc..
A, B are called the addends and the sum is often denoted as S i.e. A + B = S (Sum).
1. line up the numbers vertically to match the place values,
AdditionTo “add” means to combine two quantities A and B.
The digit–sum table (Wikipedia)
To add two numbers,
Example A. Add 8,978 + 657
8,978657+
1
53
1
6
1
2. add the digits from right to left and “carry” when necessary.
The combined result is called the sum or the total of A and B.
All the following words mean to “add”: total, sum, combine, increase by, count up, aggregate, augmented by, tally, etc..
A, B are called the addends and the sum is often denoted as S i.e. A + B = S (Sum).
1. line up the numbers vertically to match the place values,
AdditionTo “add” means to combine two quantities A and B.
The digit–sum table (Wikipedia)
To add two numbers,
Example A. Add 8,978 + 657
8,978657+
1
53
1
6
1
9,So the sum is 9,635.
2. add the digits from right to left and “carry” when necessary.
The combined result is called the sum or the total of A and B.
All the following words mean to “add”: total, sum, combine, increase by, count up, aggregate, augmented by, tally, etc..
A, B are called the addends and the sum is often denoted as S i.e. A + B = S (Sum).
1. line up the numbers vertically to match the place values,
Visually, the Mayan numerals reveal many basic addition relations that Arabic numerals do not.
Addition
Visually, the Mayan numerals reveal many basic addition relations that Arabic numerals do not.
Addition
vs
Visually, the Mayan numerals reveal many basic addition relations that Arabic numerals do not.
Addition
6=5+1, 7=5+2, 8=5+3 and 9=5+4
vs
The Mayan symbols visually show us that
Visually, the Mayan numerals reveal many basic addition relations that Arabic numerals do not.
Addition
6=5+1, 7=5+2, 8=5+3 and 9=5+4
vs
The Mayan symbols visually show us that so it’s easier to “see” and memorize adding digits with Mayan symbols:
Visually, the Mayan numerals reveal many basic addition relations that Arabic numerals do not.
Addition
6=5+1, 7=5+2, 8=5+3 and 9=5+4
vs
The Mayan symbols visually show us that
5 + 5 = 10
+ =
so it’s easier to “see” and memorize adding digits with Mayan symbols:
Visually, the Mayan numerals reveal many basic addition relations that Arabic numerals do not.
Addition
6=5+1, 7=5+2, 8=5+3 and 9=5+4
5 + 6 = 5 + 5 + 1= 11
+ =
vs
The Mayan symbols visually show us that so it’s easier to “see” and memorize adding digits with Mayan symbols:
5 + 5 = 10
+ =
Visually, the Mayan numerals reveal many basic addition relations that Arabic numerals do not.
Addition
6=5+1, 7=5+2, 8=5+3 and 9=5+4
5 + 6 = 5 + 5 + 1= 11
+ = + =
vs
The Mayan symbols visually show us that
5 + 7 = 5 + 5 + 2= 12
so it’s easier to “see” and memorize adding digits with Mayan symbols:
5 + 5 = 10
+ =
Visually, the Mayan numerals reveal many basic addition relations that Arabic numerals do not.
Addition
6=5+1, 7=5+2, 8=5+3 and 9=5+4
5 + 6 = 5 + 5 + 1= 11
5 + 8 = 5 + 5 + 3= 13
+ = + = + = + =
vs
The Mayan symbols visually show us that
5 + 7 = 5 + 5 + 2= 12
5 + 9 = 5 + 5 + 4= 14
so it’s easier to “see” and memorize adding digits with Mayan symbols:
5 + 5 = 10
+ =
Visually, the Mayan numerals reveal many basic addition relations that Arabic numerals do not.
Addition
6=5+1, 7=5+2, 8=5+3 and 9=5+4
5 + 6 = 5 + 5 + 1= 11
5 + 8 = 5 + 5 + 3= 13
+ = + = + = + =
vs
The Mayan symbols visually show us that
5 + 7 = 5 + 5 + 2= 12
5 + 9 = 5 + 5 + 4= 14
6 + 6 = 5 + 5 + 2= 12
6 + 8 = 5 + 5 + 4= 14
+ = + = + = + =6 + 7 = 5 + 5 + 3= 13
6 + 9 = 5 + 5 + 5= 15
so it’s easier to “see” and memorize adding digits with Mayan symbols:
5 + 5 = 10
+ =
Visually, the Mayan numerals reveal many basic addition relations that Arabic numerals do not.
Addition
6=5+1, 7=5+2, 8=5+3 and 9=5+4
5 + 6 = 5 + 5 + 1= 11
5 + 8 = 5 + 5 + 3= 13
+ = + = + = + =
vs
The Mayan symbols visually show us that
5 + 7 = 5 + 5 + 2= 12
5 + 9 = 5 + 5 + 4= 14
6 + 6 = 5 + 5 + 2= 12
6 + 8 = 5 + 5 + 4= 14
+ = + = + = + =6 + 7 = 5 + 5 + 3= 13
6 + 9 = 5 + 5 + 5= 15
Tables for the addition of 7, 8 and 9 are on the next slide.
so it’s easier to “see” and memorize adding digits with Mayan symbols:
5 + 5 = 10
+ =
Addition
7 + 7 = 5 + 5 + 2 + 2= 14
7 + 9 = 5 + 5 + 2 + 4= 16
+ = + = + =
7 + 8 = 5 + 5 + 2 + 3= 15
8 + 8 = 5 + 5 + 3 + 3= 16
+ += =
8 + 9 = 5 + 5 + 3 + 4= 17
+ =
9 + 9 = 5 + 5 + 4 + 4= 18
(The Mayan addition table of 7,8 and 9)
Addition
7 + 7 = 5 + 5 + 2 + 2= 14
7 + 9 = 5 + 5 + 2 + 4= 16
+ = + = + =
7 + 8 = 5 + 5 + 2 + 3= 15
8 + 8 = 5 + 5 + 3 + 3= 16
(The Mayan addition table of 7,8 and 9)
+ += =
8 + 9 = 5 + 5 + 3 + 4= 17
+ =
9 + 9 = 5 + 5 + 4 + 4= 18
Note the pattern of adding 9 with another nonzero digit. To get the answer, we reduce the digit by 1 and carry.
9 + 1 = 10
9 + 2 = 11
9 + 3 = 12
9 + 4 = 13
9 + 5 = 14
9 + 6 = 15
9 + 7 = 16
9 + 8 = 17
9 + 9 = 18
Addition
+
Addition
+
Addition
+ +
Addition
+=
+
If we are to add two apples to a pile of three apples, the outcome is the same as adding three apples to the pile of two apples.
Addition
+=
+
In general, if A and B are two numbers, then A + B = B + A. and we say that “addition is commutative.”
If we are to add two apples to a pile of three apples, the outcome is the same as adding three apples to the pile of two apples.
Addition
+=
+
In general, if A and B are two numbers, then A + B = B + A. and we say that “addition is commutative.”
If we are to add two apples to a pile of three apples, the outcome is the same as adding three apples to the pile of two apples.
Addition
+=
+
+ +
In general, if A and B are two numbers, then A + B = B + A. and we say that “addition is commutative.”
If we are to add two apples to a pile of three apples, the outcome is the same as adding three apples to the pile of two apples.
Addition
+=
+
+ +
In general, if A and B are two numbers, then A + B = B + A. and we say that “addition is commutative.”
If we are to add two apples to a pile of three apples, the outcome is the same as adding three apples to the pile of two apples.
Addition
+=
+
+ + ++
In general, if A and B are two numbers, then A + B = B + A. and we say that “addition is commutative.”
If we are to add two apples to a pile of three apples, the outcome is the same as adding three apples to the pile of two apples.
Addition
+=
+
+ +
=
++
In general, if A and B are two numbers, then A + B = B + A. and we say that “addition is commutative.”
If we are to add two apples to a pile of three apples, the outcome is the same as adding three apples to the pile of two apples.
Addition
+=
+
If we are gathering three piles of apples, it does not matter which two piles we group together first,
+ +
=
++
i.e. (A + B) + C = A + (B + C) where the “( )” means “do first.”
In general, if A and B are two numbers, then A + B = B + A. and we say that “addition is commutative.”
If we are to add two apples to a pile of three apples, the outcome is the same as adding three apples to the pile of two apples.
Addition
+=
+
If we are gathering three piles of apples, it does not matter which two piles we group together first,
+ +
We say that “addition is associative.”
=
++
i.e. (A + B) + C = A + (B + C) where the “( )” means “do first.”
In general, if A and B are two numbers, then A + B = B + A. and we say that “addition is commutative.”
If we are to add two apples to a pile of three apples, the outcome is the same as adding three apples to the pile of two apples.
Addition
+=
+
If we are gathering three piles of apples, it does not matter which two piles we group together first,
+ +
We say that “addition is associative.”
=
++
i.e. (A + B) + C = A + (B + C) where the “( )” means “do first.”
The addition operation being commutative and associative allows us to add multiple numbers in any order and we can take advantage of that.
To add multiple numbers, we may first collect those digits that sum to 5, 10 or 15 as shown here:
Addition
then sum the rest of digits.
To add multiple numbers, we may first collect those digits that sum to 5, 10 or 15 as shown here:
Addition
then sum the rest of digits.
8
3
7
2
4
+
Example A. a. Calculate.
3 8
+
2 3
51 7
3 2
1 1
b. Calculate.
61 2
To add multiple numbers, we may first collect those digits that sum to 5, 10 or 15 as shown here:
Addition
1 + 4 = 2 + 3 = 5
then sum the rest of digits.
8
3
7
2
4
+
Example A. a. Calculate.
3 8
+
2 3
51 7
3 2
1 1
b. Calculate.
61 2
To add multiple numbers, we may first collect those digits that sum to 5, 10 or 15 as shown here:
Addition
1 + 4 = 2 + 3 = 5 1 + 9 = 2 + 8 = 3 + 7 = 4 + 6 = 5 + 5 = 10 then sum the rest of digits.
8
3
7
2
4
+
Example A. a. Calculate.
3 8
+
2 3
51 7
3 2
1 1
b. Calculate.
61 2
To add multiple numbers, we may first collect those digits that sum to 5, 10 or 15 as shown here:
Addition
8
3
7
2
4
+
Example A. a. Calculate.
1 + 4 = 2 + 3 = 5 1 + 9 = 2 + 8 = 3 + 7 = 4 + 6 = 5 + 5 = 10
6 + 9 = 7 + 8 = 15
then sum the rest of digits.
3 8
+
2 3
51 7
3 2
1 1
b. Calculate.
To add multiple numbers, we may first collect those digits that sum to 5, 10 or 15 as shown here:
Addition
8
3
7
2
4
+
Example A. a. Calculate.
1 + 4 = 2 + 3 = 5 1 + 9 = 2 + 8 = 3 + 7 = 4 + 6 = 5 + 5 = 10
6 + 9 = 7 + 8 = 15
then sum the rest of digits.
10 10
3 8
+
2 3
51 7
3 2
1 1
b. Calculate.
To add multiple numbers, we may first collect those digits that sum to 5, 10 or 15 as shown here:
Addition
8
3
7
2
4
+
Example A. a. Calculate.
1 + 4 = 2 + 3 = 5 1 + 9 = 2 + 8 = 3 + 7 = 4 + 6 = 5 + 5 = 10
6 + 9 = 7 + 8 = 15
then sum the rest of digits.
10 10
24
b. Calculate.
3 8
+
2 3
51 7
3 2
1 1
To add multiple numbers, we may first collect those digits that sum to 5, 10 or 15 as shown here:
Addition
8
3
7
2
4
2 + 3 + 4 + 7 + 8 =
+
Example A. a. Calculate.
1 + 4 = 2 + 3 = 5 1 + 9 = 2 + 8 = 3 + 7 = 4 + 6 = 5 + 5 = 10
6 + 9 = 7 + 8 = 15
then sum the rest of digits.
10 10
or24
b. Calculate.
3 8
+
2 3
51 7
3 2
1 1
To add multiple numbers, we may first collect those digits that sum to 5, 10 or 15 as shown here:
Addition
8
3
7
2
4
2 + 3 + 4 + 7 + 8 =
+
Example A. a. Calculate.
1 + 4 = 2 + 3 = 5 1 + 9 = 2 + 8 = 3 + 7 = 4 + 6 = 5 + 5 = 10
6 + 9 = 7 + 8 = 15
then sum the rest of digits.
5
10
15
10
or24
b. Calculate.
3 8
+
2 3
51 7
3 2
1 1
To add multiple numbers, we may first collect those digits that sum to 5, 10 or 15 as shown here:
Addition
8
3
7
2
4
2 + 3 + 4 + 7 + 8 =
+
Example A. a. Calculate.
1 + 4 = 2 + 3 = 5 1 + 9 = 2 + 8 = 3 + 7 = 4 + 6 = 5 + 5 = 10
6 + 9 = 7 + 8 = 15
then sum the rest of digits.
5
10
15
20
10
24
or24
3 8
+
2 3
51 7
3 2
1 1
b. Calculate.
To add multiple numbers, we may first collect those digits that sum to 5, 10 or 15 as shown here:
Addition
8
3
7
2
4
2 + 3 + 4 + 7 + 8 =
+
Example A. a. Calculate.
1 + 4 = 2 + 3 = 5 1 + 9 = 2 + 8 = 3 + 7 = 4 + 6 = 5 + 5 = 10
6 + 9 = 7 + 8 = 15
then sum the rest of digits.
5
10
15
20
10
24
or24
3 8
+
2 3
51 7
3 2
1 1
b. Calculate.
10
10
To add multiple numbers, we may first collect those digits that sum to 5, 10 or 15 as shown here:
Addition
8
3
7
2
4
2 + 3 + 4 + 7 + 8 =
+
Example A. a. Calculate.
1 + 4 = 2 + 3 = 5 1 + 9 = 2 + 8 = 3 + 7 = 4 + 6 = 5 + 5 = 10
6 + 9 = 7 + 8 = 15
then sum the rest of digits.
5
10
15
20
10
24
or24
3 8
+
2 3
51 7
3 2
1 1
b. Calculate.
10
10
6
2
total 26, carry the 2
To add multiple numbers, we may first collect those digits that sum to 5, 10 or 15 as shown here:
Addition
8
3
7
2
4
2 + 3 + 4 + 7 + 8 =
+
Example A. a. Calculate.
1 + 4 = 2 + 3 = 5 1 + 9 = 2 + 8 = 3 + 7 = 4 + 6 = 5 + 5 = 10
6 + 9 = 7 + 8 = 15
then sum the rest of digits.
5
10
15
20
10
24
or24
3 8
+
2 3
51 7
3 2
1 1
b. Calculate.
10
10
2
5
5
total 26, carry the 26
To add multiple numbers, we may first collect those digits that sum to 5, 10 or 15 as shown here:
Addition
8
3
7
2
4
2 + 3 + 4 + 7 + 8 =
+
Example A. a. Calculate.
1 + 4 = 2 + 3 = 5 1 + 9 = 2 + 8 = 3 + 7 = 4 + 6 = 5 + 5 = 10
6 + 9 = 7 + 8 = 15
then sum the rest of digits.
5
10
15
20
10
24
or24
3 8
+
2 3
51 7
3 2
1 1
b. Calculate.
10
10
total 26, carry the 26
2
5
5
1 2
AdditionGiven a number, the sum of all its digits is called the “digit sum” of that number.
Addition
3 + 5 + 3 + 2 + 8 + 7 + 9 + 2
Given a number, the sum of all its digits is called the “digit sum” of that number.
35,328,792 is
For example, the digit sum of
Addition
3 + 5 + 3 + 2 + 8 + 7 + 9 + 2
10 1010
Given a number, the sum of all its digits is called the “digit sum” of that number.
= 39.35,328,792 is
For example, the digit sum of
Addition
3 + 5 + 3 + 2 + 8 + 7 + 9 + 2
10 1010
Example B. a. The digit sum of the number 3,X52,00X is 16 where X is an unknown digit, what is the number?
Given a number, the sum of all its digits is called the “digit sum” of that number.
= 39.35,328,792 is
For example, the digit sum of
Addition
3 + 5 + 3 + 2 + 8 + 7 + 9 + 2
10 1010
Example B. a. The digit sum of the number 3,X52,00X is 16 where X is an unknown digit, what is the number?
We a are given that 3 + X + 5 + 2 + 0 + 0 + X = 16,
Given a number, the sum of all its digits is called the “digit sum” of that number.
= 39.35,328,792 is
For example, the digit sum of
Addition
3 + 5 + 3 + 2 + 8 + 7 + 9 + 2
10 1010
Example B. a. The digit sum of the number 3,X52,00X is 16 where X is an unknown digit, what is the number?
We a are given that 3 + X + 5 + 2 + 0 + 0 + X = 16,
Given a number, the sum of all its digits is called the “digit sum” of that number.
= 39.
10
35,328,792 is
For example, the digit sum of
Addition
3 + 5 + 3 + 2 + 8 + 7 + 9 + 2
10 1010
Example B. a. The digit sum of the number 3,X52,00X is 16 where X is an unknown digit, what is the number?
We a are given that 3 + X + 5 + 2 + 0 + 0 + X = 16,
Given a number, the sum of all its digits is called the “digit sum” of that number.
= 39.
Hence we must have 10 + X + X = 16.10
35,328,792 is
For example, the digit sum of
Addition
3 + 5 + 3 + 2 + 8 + 7 + 9 + 2
10 1010
Example B. a. The digit sum of the number 3,X52,00X is 16 where X is an unknown digit, what is the number?
We a are given that 3 + X + 5 + 2 + 0 + 0 + X = 16,
Given a number, the sum of all its digits is called the “digit sum” of that number.
= 39.
Hence we must have 10 + X + X = 16.10
Therefore X + X = 6 or X = 3 and the number must be 3,352,003
35,328,792 is
For example, the digit sum of
Addition
3 + 5 + 3 + 2 + 8 + 7 + 9 + 2
10 1010
Example B. a. The digit sum of the number 3,X52,00X is 16 where X is an unknown digit, what is the number?
We a are given that 3 + X + 5 + 2 + 0 + 0 + X = 16,
Given a number, the sum of all its digits is called the “digit sum” of that number.
= 39.
Hence we must have 10 + X + X = 16.10
Therefore X + X = 6 or X = 3 and the number must be 3,352,003
35,328,792 is
Qn: Is it possible for the digit sum of the number 3,X52,00X to be 15? Explain.
For example, the digit sum of
Additionb. The digit sum of the number 2X,58Y is 16 where X and Y are two possibly different digits, what could the number be?
Additionb. The digit sum of the number 2X,58Y is 16 where X and Y are two possibly different digits, what could the number be?
We have that 2 + X + 5 + 8 + Y = 16.
Addition
15
b. The digit sum of the number 2X,58Y is 16 where X and Y are two possibly different digits, what could the number be?
We have that 2 + X + 5 + 8 + Y = 16.
Addition
Hence we must have X + Y = 1 and X and Y must consist of a “0” and a “1”
15
b. The digit sum of the number 2X,58Y is 16 where X and Y are two possibly different digits, what could the number be?
We have that 2 + X + 5 + 8 + Y = 16.
Addition
Hence we must have X + Y = 1 and X and Y must consist of a “0” and a “1”
15
So the number must be 20,581 or 21,580.
b. The digit sum of the number 2X,58Y is 16 where X and Y are two possibly different digits, what could the number be?
We have that 2 + X + 5 + 8 + Y = 16.
Addition
Hence we must have X + Y = 1 and X and Y must consist of a “0” and a “1”
15
So the number must be 20,581 or 21,580.
b. The digit sum of the number 2X,58Y is 16 where X and Y are two possibly different digits, what could the number be?
We have that 2 + X + 5 + 8 + Y = 16.
Digit sums is one of the basic procedures used in a computer program designed for checking to see if the transmitted data is corrupted, i.e. transmitted incorrectly. We will use this sum later on when we address the division operation.
Addition
Hence we must have X + Y = 1 and X and Y must consist of a “0” and a “1”
15
So the number must be 20,581 or 21,580.
b. The digit sum of the number 2X,58Y is 16 where X and Y are two possibly different digits, what could the number be?
We have that 2 + X + 5 + 8 + Y = 16.
Digit sums is one of the basic procedures used in a computer program designed for checking to see if the transmitted data is corrupted, i.e. transmitted incorrectly. We will use this sum later on when we address the division operation.
We call “0” the additive identity because x + 0 = 0 + x = x. i.e. when 0 is added with another value x, we get back x.
Addition
Hence we must have X + Y = 1 and X and Y must consist of a “0” and a “1”
15
So the number must be 20,581 or 21,580.
b. The digit sum of the number 2X,58Y is 16 where X and Y are two possibly different digits, what could the number be?
We have that 2 + X + 5 + 8 + Y = 16.
Digit sums is one of the basic procedures used in a computer program designed for checking to see if the transmitted data is corrupted, i.e. transmitted incorrectly. We will use this sum later on when we address the division operation.
We call “0” the additive identity because x + 0 = 0 + x = x. i.e. when 0 is added with another value x, we get back x. We end this section with some step by step exercises for mental mathematics.
AdditionIdeally, one should be comfortable with mental addition of two two-digit numbers such as totaling $28 and $45. Below are a series of mental exercises that will help one to do that.
Step 1. Memorize the sums of two digits.
AdditionIdeally, one should be comfortable with mental addition of two two-digit numbers such as totaling $28 and $45. Below are a series of mental exercises that will help one to do that.
Step 1. Memorize the sums of two digits.
Addition
for example, do mentally,
Ideally, one should be comfortable with mental addition of two two-digit numbers such as totaling $28 and $45. Below are a series of mental exercises that will help one to do that.
Step 2. Practice the sum of a two-digit number with a digit;
33 + 4 = 37 57 + 8 = 65 9 + 84 = 93
Step 1. Memorize the sums of two digits.
Addition
for example, do mentally,
Ideally, one should be comfortable with mental addition of two two-digit numbers such as totaling $28 and $45. Below are a series of mental exercises that will help one to do that.
Step 2. Practice the sum of a two-digit number with a digit;
33 + 4 = 37 57 + 8 = 65 9 + 84 = 93Step 3. Practice the sum of a two-digit number with a multiple of 10;
Step 1. Memorize the sums of two digits.
Addition
for example, do mentally,
Ideally, one should be comfortable with mental addition of two two-digit numbers such as totaling $28 and $45. Below are a series of mental exercises that will help one to do that.
Step 2. Practice the sum of a two-digit number with a digit;
33 + 4 = 37 57 + 8 = 65 9 + 84 = 93
for example, do mentally,
Step 3. Practice the sum of a two-digit number with a multiple of 10;
13 + 40 = 53 57 + 40 = 97 29 + 90 = 119
Step 1. Memorize the sums of two digits.
Addition
for example, do mentally,
Ideally, one should be comfortable with mental addition of two two-digit numbers such as totaling $28 and $45. Below are a series of mental exercises that will help one to do that.
Step 2. Practice the sum of a two-digit number with a digit;
33 + 4 = 37 57 + 8 = 65 9 + 84 = 93
for example, do mentally,
Step 3. Practice the sum of a two-digit number with a multiple of 10;
13 + 40 = 53 57 + 40 = 97 29 + 90 = 119
Step 4. Do the sum of a two-digit number in two steps by adding the 10’s first, then add the unit-digits;
Step 1. Memorize the sums of two digits.
Addition
for example, do mentally,
Ideally, one should be comfortable with mental addition of two two-digit numbers such as totaling $28 and $45. Below are a series of mental exercises that will help one to do that.
Step 2. Practice the sum of a two-digit number with a digit;
33 + 4 = 37 57 + 8 = 65 9 + 84 = 93
for example, do mentally,
Step 3. Practice the sum of a two-digit number with a multiple of 10;
13 + 40 = 53 57 + 40 = 97 29 + 90 = 119
Step 4. Do the sum of a two-digit number in two steps by adding the 10’s first, then add the unit-digits;
53 + 28 = for example, do mentally,
Step 1. Memorize the sums of two digits.
Addition
for example, do mentally,
Ideally, one should be comfortable with mental addition of two two-digit numbers such as totaling $28 and $45. Below are a series of mental exercises that will help one to do that.
Step 2. Practice the sum of a two-digit number with a digit;
33 + 4 = 37 57 + 8 = 65 9 + 84 = 93
for example, do mentally,
Step 3. Practice the sum of a two-digit number with a multiple of 10;
13 + 40 = 53 57 + 40 = 97 29 + 90 = 119
Step 4. Do the sum of a two-digit number in two steps by adding the 10’s first, then add the unit-digits;
53 + 28 = 53 + 20 + 8 for example, do mentally,
Step 1. Memorize the sums of two digits.
Addition
for example, do mentally,
Ideally, one should be comfortable with mental addition of two two-digit numbers such as totaling $28 and $45. Below are a series of mental exercises that will help one to do that.
Step 2. Practice the sum of a two-digit number with a digit;
33 + 4 = 37 57 + 8 = 65 9 + 84 = 93
for example, do mentally,
Step 3. Practice the sum of a two-digit number with a multiple of 10;
13 + 40 = 53 57 + 40 = 97 29 + 90 = 119
Step 4. Do the sum of a two-digit number in two steps by adding the 10’s first, then add the unit-digits;
53 + 28 =
= 73 + 8
53 + 20 + 8 for example, do mentally,
Step 1. Memorize the sums of two digits.
Addition
for example, do mentally,
Ideally, one should be comfortable with mental addition of two two-digit numbers such as totaling $28 and $45. Below are a series of mental exercises that will help one to do that.
Step 2. Practice the sum of a two-digit number with a digit;
33 + 4 = 37 57 + 8 = 65 9 + 84 = 93
for example, do mentally,
Step 3. Practice the sum of a two-digit number with a multiple of 10;
13 + 40 = 53 57 + 40 = 97 29 + 90 = 119
Step 4. Do the sum of a two-digit number in two steps by adding the 10’s first, then add the unit-digits;
53 + 28 =
= 73 + 8
53 + 20 + 8 for example, do mentally,
= 81
Step 1. Memorize the sums of two digits.
Addition
for example, do mentally,
Ideally, one should be comfortable with mental addition of two two-digit numbers such as totaling $28 and $45. Below are a series of mental exercises that will help one to do that.
Step 2. Practice the sum of a two-digit number with a digit;
33 + 4 = 37 57 + 8 = 65 9 + 84 = 93
for example, do mentally,
Step 3. Practice the sum of a two-digit number with a multiple of 10;
13 + 40 = 53 57 + 40 = 97 29 + 90 = 119
Step 4. Do the sum of a two-digit number in two steps by adding the 10’s first, then add the unit-digits;
53 + 28 =
= 73 + 8
97 + 55 = 53 + 20 + 8 for example, do mentally,
= 81
Step 1. Memorize the sums of two digits.
Addition
for example, do mentally,
Ideally, one should be comfortable with mental addition of two two-digit numbers such as totaling $28 and $45. Below are a series of mental exercises that will help one to do that.
Step 2. Practice the sum of a two-digit number with a digit;
33 + 4 = 37 57 + 8 = 65 9 + 84 = 93
for example, do mentally,
Step 3. Practice the sum of a two-digit number with a multiple of 10;
13 + 40 = 53 57 + 40 = 97 29 + 90 = 119
Step 4. Do the sum of a two-digit number in two steps by adding the 10’s first, then add the unit-digits;
53 + 28 =
= 73 + 8
97 + 55 = 53 + 20 + 8 97 + 50 + 5 for example, do mentally,
= 81
Step 1. Memorize the sums of two digits.
Addition
for example, do mentally,
Ideally, one should be comfortable with mental addition of two two-digit numbers such as totaling $28 and $45. Below are a series of mental exercises that will help one to do that.
Step 2. Practice the sum of a two-digit number with a digit;
33 + 4 = 37 57 + 8 = 65 9 + 84 = 93
for example, do mentally,
Step 3. Practice the sum of a two-digit number with a multiple of 10;
13 + 40 = 53 57 + 40 = 97 29 + 90 = 119
Step 4. Do the sum of a two-digit number in two steps by adding the 10’s first, then add the unit-digits;
53 + 28 =
= 73 + 8
97 + 55 = = 147 + 5 = 152
53 + 20 + 8 97 + 50 + 5 for example, do mentally,
= 81
AdditionYour Turn: Do the following mentally in two steps.26 + 27 = 26 + 20 + 7 = 44 + 39 = 44 + 30 + 9 =87 + 48 = 87 + 40 + 8 =
HW A. Fill in the values.
Number of nickels
Sum in ¢’s
2 4 6 8 10 12 14 16 18 20
Addition
Number of nickels
Sum in ¢’s
1 3 5 7 9 11 13 15 17 19
2. Arrange the following values from the largest to the smallest then add them.
10431 9776
10429
513869
513896
a.1045 93036
504
639869
837372
b.
Exercise B. Do the following problems two ways. * Add the following by summing the multiples of 10 first. * Add by adding in the order.to find the correct answer. 1. 3 + 5 + 7 2. 8 + 6 + 2 3. 1 + 8 + 9 4. 3 + 5 + 15 5. 9 + 14 + 6 6. 22 + 5 + 8 7. 16 + 5 + 4 + 3 8. 4 + 13 + 5 + 79. 19 + 7 + 1 + 3 10. 4 + 5 + 17 + 311. 23 + 5 + 17 + 3 12. 22 + 5 + 13 + 2813. 35 + 6 + 15 + 7 + 14 14. 42 + 5 + 18 + 1215. 21 + 16 + 19 + 7 + 44 16. 53 + 5 + 18 + 27 + 2217. 155 + 16 + 25 + 7 + 344 18. 428 + 3 + 32 + 227 + 22
Addition