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Simplifying i's
Simplifying Radicals
Add/Subtract Complex Numbers
Multiplying
Random!
100

i3

What is -i

100

√(-81)

9i

100

(2 + 3i) + (4 + 7i)

 6+10i

100

3i(2i- 5i)

15 - 6i

100

the square root of -1

i

200

i4

What is 1

200

√(-4) + √(-9)

5i

200

(5 + 6i) + (4 - 2i)

What is 9 + 4i

200

(6 + 2i)(6 - 2i)

 40

200

Why do we need imaginary numbers?

To find the square root of negative numbers

300

i2

-1

300

√(-18)

3i√2

300

(6 + 5i) - (3 + 2i)

What is 3+3i

300

(2 + 3i)(4 + 7i)

 -13+26i

300

Simplify the following: √(-36)

6i

400

i8

1

400

√(-32)

4i√2

400

(2 - 7i) - (1 - 4i)

What is 1-3i

400

(7 + i)(7 - i)

 50

400

√(36) + √(-36)

6 + 6i

500

 i19

-i

500

2√(-50)

10i√2

500

9 + 2i - (6 + 4i)

3 - 2i

500

3i(-8i + 5) + 2(5 - i)

34 + 13i

500

Why do we divide by 4 when simplifying powers of i?

Because the pattern repeats every 4.