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Drag the tiles to the correct boxes to complete the pairs. Not all tiles will be used.

Simplify the expressions and match them with their solutions.

(2 + 5i)2 − 20i +1

(4 + i)(-4 + i) ÷ 17

(3 + 2i)2 − (2 + 3i)2

2i(5 + 4i) − 5(3 + 2i)

(-2i)4 + (3i)3 + (27i)


-1

10

-20

16

Drag the tiles to the correct boxes to complete the pairs Not all tiles will be used Simplify the expressions and match them with their solutions2 5i2 20i 14 i4 class=

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Answer:

-1= (4+i)(-4+i)/17

10= (3+2i)^2-(2+3i)^2

-20= (2+5i)^2-20i+1

16= (-2i)^4+(3i)^3+(27i)

Step-by-step explanation: plato

The tiles to the correct boxes to complete the pairs are,

1) -1= (4+i)(-4+i)/17

2) 10= (3+2i)^2-(2+3i)^2

3) -20= (2+5i)^2-20i+1

4) 16= (-2i)^4+(3i)^3+(27i)

We have given that,

(2 + 5i)^2 − 20i +1

(4 + i)(-4 + i) ÷ 17

(3 + 2i)^2 − (2 + 3i)^2

2i(5 + 4i) − 5(3 + 2i)

We have to determine the

Drag the tiles to the correct boxes to complete the pairs. Not all tiles will be used.

What is the complex number?

A complex number can be visually represented as a pair of numbers (a, b) forming a vector on a diagram called an Argand diagram, representing the complex plane.

So we get the correct options,

1) -1= (4+i)(-4+i)/17

2) 10= (3+2i)^2-(2+3i)^2

3) -20= (2+5i)^2-20i+1

4) 16= (-2i)^4+(3i)^3+(27i)

To learn more about the expression visit:

https://brainly.com/question/723406

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