Integers Negative integersPositive integers Zero …, -3, -2, -1, 0, 1, 2, 3, …
1.An integer is a whole number that has a positive sign (+) or a negative sign (-), including zero. Understanding integers
2. A positive integer is a whole number with a positive sign or without any sign. +2, +7, 8, 12.
3. A negative integer is a whole number with a negative sign. -3, -10, -20.
Solution (a) Positive seventy - nine (a)Write +79 in words. (b) Write negative one hundred and fifty in figures. (a)Write +79 in words. (b) Write negative one hundred and fifty in figures. (b) -150
The integers are -2, 6 and 0. State the integers from the list below , +, 6, -2.9, 0, 1 4 3
Test Yourself 1. Write each of the following integers in words. (a) -17(b) +23(c) +48 (d) -69(e) -205(f) +416
2. Write each of the following integers in figures. (a) Negative forty - two (b) Positive nine (c) Positive sixty – eight (d) Negative two hundred and seventy 3.State the integers from the list below. -9,,6.2, 4, -78,-,
nted Representing integers using a number line Representing integers using a number line Integers can be represented using a horizontal or a vertical number line Integers can be represented using a horizontal or a vertical number line
IncreasingDecreasing Number line. Number line.
Positive integersNegative integers Zero Horizontal number line
Negative integers Positive integers Zero Vertical number line
(a) Use a number line to represent the integers from -5 to 3. (b) Mark 6, -3, -1 and 4 on a number line.
Test Yourself 1. Use a number line to represent the integers from (a) -3 to 4 (b) -20 to -15
tol Comparing two integers On a horizontal number line, an integer is always greater than the integers to its left and less than the integers to its right.
is greater than -4 but is less than 1.
(a) Which integer is smaller, -5 or 3 ? (b) Which integer is greater, -2 or -8 ?
is greater than is smaller than 3.
Test Yourself 1. Copy and complete each of the following with ‘is greater than’ or ‘is less than’ (a) (b) +8-9 (c) -3-7 (d) (e) +9-20
Arranging integers in order 1. We can arrange integers in increasing or decreasing order using a number line.
(a) Arrange -4, 6, -3, 5, 0 and 1 in increasing order. (b) Arrange 6, 0, 4, -2 and -4 in decreasing order.
Increasing order : -4, -3, 0, 1, 5, 6 (a) (b) Decreasing order : 6, 4, 0, -2, -4
Test Yourself 1. Arrange each of the following sets of integers in increasing order. (a) -5, -3, 0, -1, 2, -4 (B) 8, -7, -5, 6, -9, 3 2. Arrange each of the following sets of integers in decrasing order. (a) 9, -12, -6, 3, 7, -10 (b) -11, -4, 8, -3, 5, -6
2. We can identify the largest integer and the smallest integer by arranging the given integers in order.
Determine the largest integer and the smallest integer from the following set of numbers. 1, -2, 3, 0, -5
solution The largest integer is 3 and the smallest integer is -5
Test Yourself Determine the largest integer and the smallest integer from each of following sets of integers. (a) -7, 5, -9, 3, 0, -2 (b) 8, -12, 13,-15, 7, 11 (c) -20, -15, -19, -7, -30 (d) 5, -15, -20, 15, 10, -5
3. If the pattern of a sequence of integers is determined, we can find the missing terms in the sequence
Copy and complete the following sequence of integers., -5, 0, 5,, Example
Solution, -5, 0, 5,,
Test Yourself Copy and complete each of the following sequences of integers. (a) 9, 5, 1,,, (b) -12,,, 3, 8, (c),,, -10, -4 (d) -32,,, -23, -20, (e),, -13, -4,
2.2 Addition and Subtraction of Integers Addition of Integers A A 1. Addition of Integers is a process of finding the sum of two or more integers.
2. Addition an Integers to a positive integer can be represented using a number line by a movement towards the positive direction, which means from left to right For example, = 2
3. Adding an integer to a negative integer can be represented using a number line by a movement towards the negative direction, which means from right to left For example, 2 +(-4)=-2
4. Integers with like signs are integers with the same sign. For example 2 and 5 -8 and -12
5. Integers with unlike signs are integers with different signs. For example -4 and 10 3 and -9
1 + Example Simplify each of the following. (a) 1 + (- 2) (- 2) = -1 Solution
(b) Solution = 2
Evaluate 6 +(-4) + (-5). Example Solution (-4) + (-5) = -3
Example The initial temperature of a cold storage was -2 °C. Two hours later, the temperature dropped by 3 °C. When the cold storage was switched off, the temperature rose by 7 °C. What was the new temperature of the cold storage?
Solution -2 +(-3)+7 = Therefore, the new temperature of the cold storage was 2 °C.
Test Yourself 1.Calculate each of the following. 1) 35 + (-18) 2) (-21) + 9 3) (-13) ) (-50) + (-28) 5) (-39) + 16
2. Simplify each of the following. 1) (-27) + (-35) + (-14) 2) (-79) (-32) 3) (-215) + (-18) 4) (-116) + (-227) + (- 59) + (-32) 5) (-358) (-78) ) (-359) + (- 291) + (-432)
Subtraction of Integers B B 1. Subtraction of integers is a process of finding the difference between two integers. 2. The difference between two integers is the number of steps required to move from the second integer to reach the first integer on a number line.
(( If you move to the right, you will get a positive integer. For example, -3 – (-8) =
If you move to the left, you will get a negative integer. For example, -8 – (-3) =
3. To perform a subtraction involving three integers, always work out from left to right. Example Simplify 8- (-4) – 3. Solution 8- (-4) – 3 = – 3 = 12 – 3 = 9
Example In the morning, the temperature of a city was -3 °C. Its temperature then dropped by 5 °C in the afternoon. At night, its temperature dropped by another 4 °C. Find the temperature of the city at night.
Solution = = -12 Therefore, the temperature of the city at night was - 12 °C
Test Yourself 1.Calculate each of the following. 1)(-3) - 5 2)4 - (-16) 3)13 - (-7) 4)(-63) - (-50) 5)(-10) + (-13)
2. Simplify each of the following. 1){(-4) - (-8)} + (-11) 2)19 - (-25) + (-7) 3)(-12) - (-6) ){15 + (-11) - (-6)} + (-25) 5) [(-10) + (-7) –{ (- 12) –( 9 ) + ( -6)} ] – {(-28) – (-25)}
and 2.3 Multiplication and Division of Integers Multiplying integers A A 1. Rules for multiplication of two integers: 1. Determine the sign of the product. (+) × (+) = (+) (-) × (-) = (+) (+) × (-) = (-) (-) × (+) = (-) 2. Multiply the whole numbers.
(a) Example Find the product of the following. (a) -4 × 3 Solution (a) -4 × 3 = - (4 × 3) = -12
(b) -8 × (-7) Solution (b)-8 × (-7) = + (8 × 7) = 56
2. When multiplying three integers, we work from left to right. Example Calculate the following. (a) -2 × 3 × (-5) Solution (a)-2 × 3 × (-5) = -6 × (-5) = 30
(b) -6 × (-4) × (-3) Solution (a) -6 × (-4) × (-3) = 24 × (-3) = -72
Example The temperature in a refrigerator decreases 2 °C every hour. If the temperature now is 0 °C, find its temperature (a)3 hours later, (b) 4 hours earlier.
Solution (a) -2 × (+3) = -6 °C Therefore, the temperature 3 hours later is -6 °C. (b) -2 × (-4) = 8 °C Therefore, the temperature 4 hours earlier was 8 °C.
Test Yourself 1.Calculate each following. 1)7 (-5) 2)(-20) 49 3)(-13) (-28) 4)(-35) 21 (-6) 5)111 (-25)
2. Solve the following. 1){(-23) 41} - (-560) 2)(-36) (-11) + (-278) – 993){(-64) + (-19)} (- 12) ){(-1,028) - (-457)} (-26) 5)(-109) {(-18) - (- 32)} + (-84)
3. A submarine dived 3 m each minute. How deep can the submarine dive after 5 minutes? 4.The temperature at a highland resort drops by 2 °C every hour. Find the total drop in temperature after 4 hours.
Dividing integers B B 1. Rules for division of two integers: 1. Determine the sign of the quotient. (+) ÷ (+) = (+) (-) ÷ (-) = (+) (+) ÷ (-) = (-) (-) ÷ (+) = (-) 2. Divide the whole numbers.
Example Find the results of dividing the following. (a) -124 ÷ (-4) Solution -124 ÷ (-4) = 124 ÷ 4 = 31
(b) Solution = - 25 (c) 18 ÷ (-2) ÷ (-3) Solution 18 ÷ (-2) ÷ (-3) = -9 ÷ (-3) = 3
Example Ake, sak and wach started a business together. In the first month, they made loss of Baht. Find the loss of each person if the loss is shared equally among them. Solution Baht ÷ 3 = Baht Therefore, each person made a loss of Baht.
Test Yourself 1. Find the results of dividing the following. 1. (-16) (-1)2. (-34) (-8)4. (-220) (-11) 6. {(-15) (-3)} - {180 (-90)} 7. {(-450) 15} + {(-208) (- 13)}
2.The temperature of a cold storage room drops constantly by 28 °C in 4 hours. Calculate the drop in temperature each hour. 3.The water level in a reservoir decreases by 5 m in 4 days. Find the average decrease in the water level per day.
2.4 Combined Operations of Integers Example 1. Solve each of the following. (a) – 23 = -178 – 23 = -201 Solution
(b) 20 × 8 ÷(-4) 20 × 8 ÷(-4) = 160 ÷ (-4) = -40 Solution (c) -(-3) × (-3) × = 3 × = 49 Solution
Example The initial temperature in a freezer is 5 ˚C If the temperature decreases by 4˚C every minute, find its temperature after 6 minutes.
Solution The change of temperature in the freezer = - 4 ˚C 5 + 6×(-4) = 5 + (-24) = -19 ˚C Therefore, the temperature in the freezer after 6 minutes is -19 ˚C.
Test Yourself 1.Evaluate each of the following. 1) {(-15) (-3)} (-4) 2) {(-9) (-4)} {(-5) + 3} 3) {(-10) - (-11)} {(-12) - (-15)} (-1) 4) {(-3) (-20) (-15)} + (- 9) - (-14) 5) {(-40) 8} (-16) {(- 10) - (-9)}