a) To Perform: − 4 + 5 ( − 3 )

Question

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Answer 1

Question

Chapter 5.CR, Problem 1CR

To determine

a)

To Perform:

−4+5(−3)

Expert Solution

Answer to Problem 1CR

Solution:

−19

Explanation of Solution

Addition of integers:

To add integers first we have to look the signs of integers. Let us assume that x, y and z are integers.

Step1:

Check if it has at least one of the integers is 0; if so, then

x+0=0+x=x

Step2:

Check whether the two terms have the same sign. If so, then

Add both the numbers and give the same sign.

(i.e.)x+y=z

(−x)+(−y)=−z

Where z is the total value we get from adding the two terms.

Step3:

Check whether the two terms have the different sign. If so, then

Subtract the smaller one from the larger value and put the sign of larger value.

(i.e.)x+(−y)=−z if −y is the larger absolute value

Or x+(−y)=z if x is the larger absolute value.

Multiplication of Integers:

Let us assume that x, y and z are integers.

Step1:

First we have to check it has at least one of the integers is 0; if so, then

x⋅0=0⋅x=0

Step2:

The product of two positive integers or two negative integers is positive.

The product of positive integer and a negative integer is negative.

Given:

−4+5(−3)

To remove the bracket, we can multiply the last two terms by using the multiplication of integers.

Step1:

We have to check whether it has at least one zero. There is no zero in the equation so we can move on.

Step2:

5×(−3)

The product of positive integer and a negative integer is negative. After multiplying the above integers, we get

−15

Step3:

Now we can add the both numbers.

By using the addition of integers, we get

(−4)+(−15)=−19

Hence we got the answer.

To determine

b)

To Perform:

47+59

Expert Solution

Answer to Problem 1CR

Solution:

7163

Explanation of Solution

Rational number:

The set of rational numbers is denoted by ℚ

The rational numbers is the set of all numbers in the fractional form ab where a and b are integers, and b≠0.

ab means a÷b where a is the numerator and b is the denominator

Addition with Rational Numbers:

ab+cd=adbd+bcbd=ad+bcbd

Given:

47+59

By using the addition with rational numbers, we can add the above rational numbers

4×97×9+5×79×7=3663+3563

Then 36+3563=7163

Hence the answer is 7163.

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Answer 2

Question

Chapter 5.CR, Problem 1CR

To determine

a)

To Perform:

−4+5(−3)

Expert Solution

Answer to Problem 1CR

Solution:

−19

Explanation of Solution

Addition of integers:

To add integers first we have to look the signs of integers. Let us assume that x, y and z are integers.

Step1:

Check if it has at least one of the integers is 0; if so, then

x+0=0+x=x

Step2:

Check whether the two terms have the same sign. If so, then

Add both the numbers and give the same sign.

(i.e.)x+y=z

(−x)+(−y)=−z

Where z is the total value we get from adding the two terms.

Step3:

Check whether the two terms have the different sign. If so, then

Subtract the smaller one from the larger value and put the sign of larger value.

(i.e.)x+(−y)=−z if −y is the larger absolute value

Or x+(−y)=z if x is the larger absolute value.

Multiplication of Integers:

Let us assume that x, y and z are integers.

Step1:

First we have to check it has at least one of the integers is 0; if so, then

x⋅0=0⋅x=0

Step2:

The product of two positive integers or two negative integers is positive.

The product of positive integer and a negative integer is negative.

Given:

−4+5(−3)

To remove the bracket, we can multiply the last two terms by using the multiplication of integers.

Step1:

We have to check whether it has at least one zero. There is no zero in the equation so we can move on.

Step2:

5×(−3)

The product of positive integer and a negative integer is negative. After multiplying the above integers, we get

−15

Step3:

Now we can add the both numbers.

By using the addition of integers, we get

(−4)+(−15)=−19

Hence we got the answer.

To determine

b)

To Perform:

47+59

Expert Solution

Answer to Problem 1CR

Solution:

7163

Explanation of Solution

Rational number:

The set of rational numbers is denoted by ℚ

The rational numbers is the set of all numbers in the fractional form ab where a and b are integers, and b≠0.

ab means a÷b where a is the numerator and b is the denominator

Addition with Rational Numbers:

ab+cd=adbd+bcbd=ad+bcbd

Given:

47+59

By using the addition with rational numbers, we can add the above rational numbers

4×97×9+5×79×7=3663+3563

Then 36+3563=7163

Hence the answer is 7163.

Want to see more full solutions like this?

Subscribe now to access step-by-step solutions to millions of textbook problems written by subject matter experts!

Answer 3

Question

Chapter 5.CR, Problem 1CR

To determine

a)

To Perform:

−4+5(−3)

Expert Solution

Answer to Problem 1CR

Solution:

−19

Explanation of Solution

Addition of integers:

To add integers first we have to look the signs of integers. Let us assume that x, y and z are integers.

Step1:

Check if it has at least one of the integers is 0; if so, then

x+0=0+x=x

Step2:

Check whether the two terms have the same sign. If so, then

Add both the numbers and give the same sign.

(i.e.)x+y=z

(−x)+(−y)=−z

Where z is the total value we get from adding the two terms.

Step3:

Check whether the two terms have the different sign. If so, then

Subtract the smaller one from the larger value and put the sign of larger value.

(i.e.)x+(−y)=−z if −y is the larger absolute value

Or x+(−y)=z if x is the larger absolute value.

Multiplication of Integers:

Let us assume that x, y and z are integers.

Step1:

First we have to check it has at least one of the integers is 0; if so, then

x⋅0=0⋅x=0

Step2:

The product of two positive integers or two negative integers is positive.

The product of positive integer and a negative integer is negative.

Given:

−4+5(−3)

To remove the bracket, we can multiply the last two terms by using the multiplication of integers.

Step1:

We have to check whether it has at least one zero. There is no zero in the equation so we can move on.

Step2:

5×(−3)

The product of positive integer and a negative integer is negative. After multiplying the above integers, we get

−15

Step3:

Now we can add the both numbers.

By using the addition of integers, we get

(−4)+(−15)=−19

Hence we got the answer.

To determine

b)

To Perform:

47+59

Expert Solution

Answer to Problem 1CR

Solution:

7163

Explanation of Solution

Rational number:

The set of rational numbers is denoted by ℚ

The rational numbers is the set of all numbers in the fractional form ab where a and b are integers, and b≠0.

ab means a÷b where a is the numerator and b is the denominator

Addition with Rational Numbers:

ab+cd=adbd+bcbd=ad+bcbd

Given:

47+59

By using the addition with rational numbers, we can add the above rational numbers

4×97×9+5×79×7=3663+3563

Then 36+3563=7163

Hence the answer is 7163.

Want to see more full solutions like this?

Subscribe now to access step-by-step solutions to millions of textbook problems written by subject matter experts!

Answer 4

Question

Chapter 5.CR, Problem 1CR

To determine

a)

To Perform:

−4+5(−3)

Expert Solution

Answer to Problem 1CR

Solution:

−19

Explanation of Solution

Addition of integers:

To add integers first we have to look the signs of integers. Let us assume that x, y and z are integers.

Step1:

Check if it has at least one of the integers is 0; if so, then

x+0=0+x=x

Step2:

Check whether the two terms have the same sign. If so, then

Add both the numbers and give the same sign.

(i.e.)x+y=z

(−x)+(−y)=−z

Where z is the total value we get from adding the two terms.

Step3:

Check whether the two terms have the different sign. If so, then

Subtract the smaller one from the larger value and put the sign of larger value.

(i.e.)x+(−y)=−z if −y is the larger absolute value

Or x+(−y)=z if x is the larger absolute value.

Multiplication of Integers:

Let us assume that x, y and z are integers.

Step1:

First we have to check it has at least one of the integers is 0; if so, then

x⋅0=0⋅x=0

Step2:

The product of two positive integers or two negative integers is positive.

The product of positive integer and a negative integer is negative.

Given:

−4+5(−3)

To remove the bracket, we can multiply the last two terms by using the multiplication of integers.

Step1:

We have to check whether it has at least one zero. There is no zero in the equation so we can move on.

Step2:

5×(−3)

The product of positive integer and a negative integer is negative. After multiplying the above integers, we get

−15

Step3:

Now we can add the both numbers.

By using the addition of integers, we get

(−4)+(−15)=−19

Hence we got the answer.

To determine

b)

To Perform:

47+59

Expert Solution

Answer to Problem 1CR

Solution:

7163

Explanation of Solution

Rational number:

The set of rational numbers is denoted by ℚ

The rational numbers is the set of all numbers in the fractional form ab where a and b are integers, and b≠0.

ab means a÷b where a is the numerator and b is the denominator

Addition with Rational Numbers:

ab+cd=adbd+bcbd=ad+bcbd

Given:

47+59

By using the addition with rational numbers, we can add the above rational numbers

4×97×9+5×79×7=3663+3563

Then 36+3563=7163

Hence the answer is 7163.

Want to see more full solutions like this?

Subscribe now to access step-by-step solutions to millions of textbook problems written by subject matter experts!

Answer 5

Chapter 5.CR, Problem 1CR

To determine

a)

To Perform:

−4+5(−3)

Expert Solution

Answer to Problem 1CR

Solution:

−19

Explanation of Solution

Addition of integers:

To add integers first we have to look the signs of integers. Let us assume that x, y and z are integers.

Step1:

Check if it has at least one of the integers is 0; if so, then

x+0=0+x=x

Step2:

Check whether the two terms have the same sign. If so, then

Add both the numbers and give the same sign.

(i.e.)x+y=z

(−x)+(−y)=−z

Where z is the total value we get from adding the two terms.

Step3:

Check whether the two terms have the different sign. If so, then

Subtract the smaller one from the larger value and put the sign of larger value.

(i.e.)x+(−y)=−z if −y is the larger absolute value

Or x+(−y)=z if x is the larger absolute value.

Multiplication of Integers:

Let us assume that x, y and z are integers.

Step1:

First we have to check it has at least one of the integers is 0; if so, then

x⋅0=0⋅x=0

Step2:

The product of two positive integers or two negative integers is positive.

The product of positive integer and a negative integer is negative.

Given:

−4+5(−3)

To remove the bracket, we can multiply the last two terms by using the multiplication of integers.

Step1:

We have to check whether it has at least one zero. There is no zero in the equation so we can move on.

Step2:

5×(−3)

The product of positive integer and a negative integer is negative. After multiplying the above integers, we get

−15

Step3:

Now we can add the both numbers.

By using the addition of integers, we get

(−4)+(−15)=−19

Hence we got the answer.

To determine

b)

To Perform:

47+59

Expert Solution

Answer to Problem 1CR

Solution:

7163

Explanation of Solution

Rational number:

The set of rational numbers is denoted by ℚ

The rational numbers is the set of all numbers in the fractional form ab where a and b are integers, and b≠0.

ab means a÷b where a is the numerator and b is the denominator

Addition with Rational Numbers:

ab+cd=adbd+bcbd=ad+bcbd

Given:

47+59

By using the addition with rational numbers, we can add the above rational numbers

4×97×9+5×79×7=3663+3563

Then 36+3563=7163

Hence the answer is 7163.

Answer 6

Chapter 5.CR, Problem 1CR

To determine

a)

To Perform:

−4+5(−3)

Expert Solution

Answer to Problem 1CR

Solution:

−19

Explanation of Solution

Addition of integers:

To add integers first we have to look the signs of integers. Let us assume that x, y and z are integers.

Step1:

Check if it has at least one of the integers is 0; if so, then

x+0=0+x=x

Step2:

Check whether the two terms have the same sign. If so, then

Add both the numbers and give the same sign.

(i.e.)x+y=z

(−x)+(−y)=−z

Where z is the total value we get from adding the two terms.

Step3:

Check whether the two terms have the different sign. If so, then

Subtract the smaller one from the larger value and put the sign of larger value.

(i.e.)x+(−y)=−z if −y is the larger absolute value

Or x+(−y)=z if x is the larger absolute value.

Multiplication of Integers:

Let us assume that x, y and z are integers.

Step1:

First we have to check it has at least one of the integers is 0; if so, then

x⋅0=0⋅x=0

Step2:

The product of two positive integers or two negative integers is positive.

The product of positive integer and a negative integer is negative.

Given:

−4+5(−3)

To remove the bracket, we can multiply the last two terms by using the multiplication of integers.

Step1:

We have to check whether it has at least one zero. There is no zero in the equation so we can move on.

Step2:

5×(−3)

The product of positive integer and a negative integer is negative. After multiplying the above integers, we get

−15

Step3:

Now we can add the both numbers.

By using the addition of integers, we get

(−4)+(−15)=−19

Hence we got the answer.

Answer 7

Chapter 5.CR, Problem 1CR

To determine

a)

To Perform:

−4+5(−3)

Answer 8

Expert Solution

Answer to Problem 1CR

Solution:

−19

Answer 9

Expert Solution

Answer 10

Expert Solution

Answer 11

Expert Solution

Answer 12

Explanation of Solution

Addition of integers:

To add integers first we have to look the signs of integers. Let us assume that x, y and z are integers.

Step1:

Check if it has at least one of the integers is 0; if so, then

x+0=0+x=x

Step2:

Check whether the two terms have the same sign. If so, then

Add both the numbers and give the same sign.

(i.e.)x+y=z

(−x)+(−y)=−z

Where z is the total value we get from adding the two terms.

Step3:

Check whether the two terms have the different sign. If so, then

Subtract the smaller one from the larger value and put the sign of larger value.

(i.e.)x+(−y)=−z if −y is the larger absolute value

Or x+(−y)=z if x is the larger absolute value.

Multiplication of Integers:

Let us assume that x, y and z are integers.

Step1:

First we have to check it has at least one of the integers is 0; if so, then

x⋅0=0⋅x=0

Step2:

The product of two positive integers or two negative integers is positive.

The product of positive integer and a negative integer is negative.

Given:

−4+5(−3)

To remove the bracket, we can multiply the last two terms by using the multiplication of integers.

Step1:

We have to check whether it has at least one zero. There is no zero in the equation so we can move on.

Step2:

5×(−3)

The product of positive integer and a negative integer is negative. After multiplying the above integers, we get

−15

Step3:

Now we can add the both numbers.

By using the addition of integers, we get

(−4)+(−15)=−19

Hence we got the answer.

Answer 13

To determine

b)

To Perform:

47+59

Expert Solution

Answer to Problem 1CR

Solution:

7163

Explanation of Solution

Rational number:

The set of rational numbers is denoted by ℚ

The rational numbers is the set of all numbers in the fractional form ab where a and b are integers, and b≠0.

ab means a÷b where a is the numerator and b is the denominator

Addition with Rational Numbers:

ab+cd=adbd+bcbd=ad+bcbd

Given:

47+59

By using the addition with rational numbers, we can add the above rational numbers

4×97×9+5×79×7=3663+3563

Then 36+3563=7163

Hence the answer is 7163.

Answer 14

To determine

b)

To Perform:

47+59

Answer 15

Expert Solution

Answer to Problem 1CR

Solution:

7163

Answer 16

Expert Solution

Answer 17

Expert Solution

Answer 18

Expert Solution

Answer 19

Explanation of Solution

Rational number:

The set of rational numbers is denoted by ℚ

The rational numbers is the set of all numbers in the fractional form ab where a and b are integers, and b≠0.

ab means a÷b where a is the numerator and b is the denominator

Addition with Rational Numbers:

ab+cd=adbd+bcbd=ad+bcbd

Given:

47+59

By using the addition with rational numbers, we can add the above rational numbers

4×97×9+5×79×7=3663+3563

Then 36+3563=7163

Hence the answer is 7163.

Answer 20

Ch. 5.1 - Level 1 IN YOUR OWN WORDS Explain each of the...Ch. 5.1 - Prob. 2PS Ch. 5.1 - Prob. 3PS Ch. 5.1 - Prob. 4PS Ch. 5.1 - Prob. 5PS Ch. 5.1 - Prob. 6PS Ch. 5.1 - Prob. 7PS Ch. 5.1 - Prob. 8PS Ch. 5.1 - Prob. 9PS Ch. 5.1 - Prob. 10PS

a) To Perform: − 4 + 5 ( − 3 )

Concept explainers

Videos

a)

To Perform:

−4+5(−3)

Answer to Problem 1CR

Explanation of Solution

b)

To Perform:

47+59

Answer to Problem 1CR

Explanation of Solution

Want to see more full solutions like this?

Chapter 5 Solutions

a) To Perform: − 4 + 5 ( − 3 )

Concept explainers

Videos

a) To Perform: −4+5(−3)

Answer to Problem 1CR

Explanation of Solution

b) To Perform: 47+59

Answer to Problem 1CR

Explanation of Solution

Want to see more full solutions like this?

Chapter 5 Solutions

a)

To Perform:

−4+5(−3)

b)

To Perform:

47+59