The expression ( 5 − 6 i ) + ( 3 + 2 i ) in the form of a + b i .

Question

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Answer 1

Question

Chapter H, Problem 1E

To determine

To evaluate: The expression (5−6i)+(3+2i) in the form of a+bi.

Expert Solution & Answer

Answer to Problem 1E

The value of the expression (5−6i)+(3+2i) is 8−4i.

Explanation of Solution

The sum of two complex numbers defined as, (a+bi)+(c+di)=(a+c)+i(b+d).

Thus, the expression (5−6i)+(3+2i) simplified as follows.

(5−6i)+(3+2i)=(5+3)+i(−6+2)=8−4i

Therefore, the value of the expression (5−6i)+(3+2i) is 8−4i.

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Students have asked these similar questions

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Answer 2

Question

Chapter H, Problem 1E

To determine

To evaluate: The expression (5−6i)+(3+2i) in the form of a+bi.

Expert Solution & Answer

Answer to Problem 1E

The value of the expression (5−6i)+(3+2i) is 8−4i.

Explanation of Solution

The sum of two complex numbers defined as, (a+bi)+(c+di)=(a+c)+i(b+d).

Thus, the expression (5−6i)+(3+2i) simplified as follows.

(5−6i)+(3+2i)=(5+3)+i(−6+2)=8−4i

Therefore, the value of the expression (5−6i)+(3+2i) is 8−4i.

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Answer 3

Question

Chapter H, Problem 1E

To determine

To evaluate: The expression (5−6i)+(3+2i) in the form of a+bi.

Expert Solution & Answer

Answer to Problem 1E

The value of the expression (5−6i)+(3+2i) is 8−4i.

Explanation of Solution

The sum of two complex numbers defined as, (a+bi)+(c+di)=(a+c)+i(b+d).

Thus, the expression (5−6i)+(3+2i) simplified as follows.

(5−6i)+(3+2i)=(5+3)+i(−6+2)=8−4i

Therefore, the value of the expression (5−6i)+(3+2i) is 8−4i.

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

Answer 4

Question

Chapter H, Problem 1E

To determine

To evaluate: The expression (5−6i)+(3+2i) in the form of a+bi.

Expert Solution & Answer

Answer to Problem 1E

The value of the expression (5−6i)+(3+2i) is 8−4i.

Explanation of Solution

The sum of two complex numbers defined as, (a+bi)+(c+di)=(a+c)+i(b+d).

Thus, the expression (5−6i)+(3+2i) simplified as follows.

(5−6i)+(3+2i)=(5+3)+i(−6+2)=8−4i

Therefore, the value of the expression (5−6i)+(3+2i) is 8−4i.

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

Answer 5

Chapter H, Problem 1E

To determine

To evaluate: The expression (5−6i)+(3+2i) in the form of a+bi.

Expert Solution & Answer

Answer to Problem 1E

The value of the expression (5−6i)+(3+2i) is 8−4i.

Explanation of Solution

The sum of two complex numbers defined as, (a+bi)+(c+di)=(a+c)+i(b+d).

Thus, the expression (5−6i)+(3+2i) simplified as follows.

(5−6i)+(3+2i)=(5+3)+i(−6+2)=8−4i

Therefore, the value of the expression (5−6i)+(3+2i) is 8−4i.

Answer 6

Chapter H, Problem 1E

To determine

To evaluate: The expression (5−6i)+(3+2i) in the form of a+bi.

Expert Solution & Answer

Answer to Problem 1E

The value of the expression (5−6i)+(3+2i) is 8−4i.

Explanation of Solution

The sum of two complex numbers defined as, (a+bi)+(c+di)=(a+c)+i(b+d).

Thus, the expression (5−6i)+(3+2i) simplified as follows.

(5−6i)+(3+2i)=(5+3)+i(−6+2)=8−4i

Therefore, the value of the expression (5−6i)+(3+2i) is 8−4i.

Answer 7

Chapter H, Problem 1E

To determine

To evaluate: The expression (5−6i)+(3+2i) in the form of a+bi.

Answer 8

Expert Solution & Answer

Answer to Problem 1E

The value of the expression (5−6i)+(3+2i) is 8−4i.

Answer 9

Expert Solution & Answer

Answer 10

Expert Solution & Answer

Answer 11

Explanation of Solution

The sum of two complex numbers defined as, (a+bi)+(c+di)=(a+c)+i(b+d).

Thus, the expression (5−6i)+(3+2i) simplified as follows.

(5−6i)+(3+2i)=(5+3)+i(−6+2)=8−4i

Therefore, the value of the expression (5−6i)+(3+2i) is 8−4i.

Answer 12

Ch. H - Prob. 1E Ch. H - Prob. 2E Ch. H - Prob. 3E Ch. H - Prob. 4E Ch. H - Prob. 5E Ch. H - Prob. 6E Ch. H - Prob. 7E Ch. H - Evaluate the expression and write your answer in...Ch. H - Prob. 9E Ch. H - Prob. 10E

The expression ( 5 − 6 i ) + ( 3 + 2 i ) in the form of a + b i .

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To evaluate: The expression (5−6i)+(3+2i) in the form of a+bi.

Answer to Problem 1E

Explanation of Solution

Want to see more full solutions like this?

Chapter H Solutions