Adding & Subtracting Complex Numbers Warmup

Quiz

•

Mathematics

•

9th - 12th Grade

•

Practice Problem

•

Medium

•

CCSS

HSN.CN.A.2, HSN.CN.A.1, 7.NS.A.1C

Standards-aligned

Michelle McFerren

Used 5+ times

FREE Resource

6 questions

Show all answers

1.

MULTIPLE CHOICE QUESTION

2 mins • 1 pt

You can add and subtract like terms of complex numbers in the same way you add or subtract other like terms.

Try simplifying 4i+5i

-1i

9i

20i

1i

Answer explanation

To simplify 4i + 5i, combine the coefficients of the like terms: 4 + 5 = 9. Thus, 4i + 5i = 9i. The correct answer is 9i.

Tags

CCSS.HSN.CN.A.2

2.

MULTIPLE CHOICE QUESTION

2 mins • 1 pt

4i+5i=9i
Just like 4+5=9 or 4x+5x=9x
Now let's try subtraction of imaginary terms
Simplify 4i - 5i

-1i

9i

20i

1i

Answer explanation

To simplify 4i - 5i, subtract the coefficients: 4 - 5 = -1. Thus, 4i - 5i = -1i. The correct answer is -1i.

Tags

CCSS.HSN.CN.A.2

3.

MULTIPLE CHOICE QUESTION

2 mins • 1 pt

We're off to a good start learning about operations on imaginary numbers! Now let's try something complex (meaning a number with a real and imaginary part)

Identify the real part in this complex number
7+3i

7

3

i

3i

Answer explanation

In the complex number 7+3i, the real part is the coefficient of the real component, which is 7. The imaginary part is represented by 3i, where 3 is the coefficient of the imaginary unit i.

Tags

CCSS.HSN.CN.A.1

4.

MULTIPLE CHOICE QUESTION

2 mins • 1 pt

Identify the imaginary part in this complex number
7+3i

7

3

3i

Answer explanation

In the complex number 7+3i, the imaginary part is represented by the coefficient of 'i'. Here, 3 is the coefficient, making the imaginary part 3i. Therefore, the correct answer is 3i.

Tags

CCSS.HSN.CN.A.1

5.

MULTIPLE CHOICE QUESTION

2 mins • 1 pt

Now that we've practiced identifying our real and imaginary parts, let's try adding complex numbers
What is the sum of 6+3i and 7+12i

18+10i

13+15i

15+13i

10+18i

Answer explanation

To add the complex numbers 6+3i and 7+12i, combine the real parts (6+7) and the imaginary parts (3i+12i). This gives 13 for the real part and 15i for the imaginary part, resulting in 13+15i, which is the correct answer.

Tags

CCSS.7.NS.A.1C

6.

MULTIPLE CHOICE QUESTION

2 mins • 1 pt

Last one, let's make it a subtraction problem
What is the simplifies form of
(11 - 7i) - (-3 + 12i)

(remember to distribute the negative)

8 - 19i

8 + 5i

13- 19i

14 -19i

Answer explanation

To simplify (11 - 7i) - (-3 + 12i), distribute the negative: (11 - 7i) + (3 - 12i). Combine real parts: 11 + 3 = 14, and imaginary parts: -7 - 12 = -19i. Thus, the result is 14 - 19i.

Tags

CCSS.HSN.CN.A.2

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Adding & Subtracting Complex Numbers Warmup

6 questions

You can add and subtract like terms of complex numbers in the same way you add or subtract other like terms.Try simplifying 4i+5i

To simplify 4i + 5i, combine the coefficients of the like terms: 4 + 5 = 9. Thus, 4i + 5i = 9i. The correct answer is 9i.

4i+5i=9iJust like 4+5=9 or 4x+5x=9xNow let's try subtraction of imaginary termsSimplify 4i - 5i

To simplify 4i - 5i, subtract the coefficients: 4 - 5 = -1. Thus, 4i - 5i = -1i. The correct answer is -1i.

We're off to a good start learning about operations on imaginary numbers! Now let's try something complex (meaning a number with a real and imaginary part)Identify the real part in this complex number7+3i

In the complex number 7+3i, the real part is the coefficient of the real component, which is 7. The imaginary part is represented by 3i, where 3 is the coefficient of the imaginary unit i.

Identify the imaginary part in this complex number7+3i

In the complex number 7+3i, the imaginary part is represented by the coefficient of 'i'. Here, 3 is the coefficient, making the imaginary part 3i. Therefore, the correct answer is 3i.

Now that we've practiced identifying our real and imaginary parts, let's try adding complex numbers What is the sum of 6+3i and 7+12i

To add the complex numbers 6+3i and 7+12i, combine the real parts (6+7) and the imaginary parts (3i+12i). This gives 13 for the real part and 15i for the imaginary part, resulting in 13+15i, which is the correct answer.

Last one, let's make it a subtraction problemWhat is the simplifies form of (11 - 7i) - (-3 + 12i)(remember to distribute the negative)

To simplify (11 - 7i) - (-3 + 12i), distribute the negative: (11 - 7i) + (3 - 12i). Combine real parts: 11 + 3 = 14, and imaginary parts: -7 - 12 = -19i. Thus, the result is 14 - 19i.

Similar Resources on Wayground

Popular Resources on Wayground

Discover more resources for Mathematics

You can add and subtract like terms of complex numbers in the same way you add or subtract other like terms.

Try simplifying 4i+5i

4i+5i=9i
Just like 4+5=9 or 4x+5x=9x
Now let's try subtraction of imaginary terms
Simplify 4i - 5i

We're off to a good start learning about operations on imaginary numbers! Now let's try something complex (meaning a number with a real and imaginary part)

Identify the real part in this complex number
7+3i

Identify the imaginary part in this complex number
7+3i

Now that we've practiced identifying our real and imaginary parts, let's try adding complex numbers
What is the sum of 6+3i and 7+12i

Last one, let's make it a subtraction problem
What is the simplifies form of
(11 - 7i) - (-3 + 12i)

(remember to distribute the negative)