Complex Numbers - College Algebra

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Question

Add:

Answer

When adding complex numbers, add the real parts and the imaginary parts separately to get another complex number in standard form.

Adding the real parts gives , and adding the imaginary parts gives .

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Question

Divide: $\frac{2-i}{3+2i}$

The answer must be in standard form.

Answer

Multiply both the numerator and the denominator by the conjugate of the denominator which is which results in

$\frac{\left ( 2-i \right )\left ( 3-2i \right )}{\left ( 3+2i \right )\left ( 3-2i \right )}$

The numerator after simplification give us $6-4i-3i+2i^{2}=6-7i+2i^{2}=4-7i$

The denominator is equal to $3^{2}-4i^{2}=9+4=13$

Hence, the final answer in standard form =

$\frac{4}{13}-\frac{7i}{13}$

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Question

Divide: $\frac{2+3i}{i}$

Answer must be in standard form.

Answer

Multiply both the numerator and the denominator by the conjugate of the denominator which is resulting in

$\frac{\left ( 2+3i \right )\left ( -i \right )}{\left ( i \right )\left ( -i \right )}$

This is equal to $\frac{-2i-{3i}^2}{-i^2}$

Since you can make that substitution of in place of in both numerator and denominator, leaving:

$\frac{-2i-3(-1)}{-(-1)}$

When you then cancel the negatives in both numerator and denominator (remember that , simplifying each term), you're left with a denominator of and a numerator of , which equals .

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Question

Consider the following definitions of imaginary numbers:

Then,

Answer

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Question

What is the value of ?

Answer

Recall that the definition of imaginary numbers gives that $i = \sqrt{-1}$ and thus that . Therefore, we can use Exponent Rules to write $i^4 = i^2 \cdot i^2 = -1\cdot-1 = 1$

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Question

What is the value of ?

Answer

When dealing with imaginary numbers, we multiply by foiling as we do with binomials. When we do this we get the expression below:

Since we know that we get which gives us .

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Question

Evaluate:

Answer

Use the FOIL method to simplify. FOIL means to mulitply the first terms together, then multiply the outer terms together, then multiply the inner terms togethers, and lastly, mulitply the last terms together.

The imaginary is equal to:

$\sqrt{-1}$

Write the terms for $i, i^2, \textup{and } i^3$ .

$i=\sqrt{-1}$

$i^3=i \times i^2=-\sqrt{-1}=-i$

Replace $i^2 \textup{ and } i^3$ with the appropiate values and simplify.

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Question

Answer

Combine like terms:

Distribute:

Combine like terms:

$\mathbf{8-6i}$

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Question

Multiply:

Answer

Use FOIL to multiply the two binomials.

Recall that FOIL stands for Firsts, Outers, Inners, and Lasts.

Remember that

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Question

Rationalize the complex fraction: $\frac{2+i}{3-i}$

Answer

To rationalize a complex fraction, multiply numerator and denominator by the conjugate of the denominator.

$\frac{(2+i)(3+i)}{(3-i)(3+i)}$

$\frac{6+3i+2i+i^2}{9-3i+3i-i^2}$

$\frac{5+5i}{10}$

$\frac{1+i}{2}$

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Question

Simplify the following:

Answer

To solve, you must remember the basic rules for i exponents.

$i=\sqrt{-1}$

Given the prior, simply plug into the given expression and combine like terms.

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Question

Given the following quadratic, which values of will produce a set of complex valued solutions for

Answer

In order to determine if a quadratic equation will have real-valued or complex-valued solutions compute the discriminate:

If the discriminate is negative, we will have complex-valued solutions. If the discriminate is positive, we will have real-valued solutions.

This arises from the fact that the quadratic equation has the square-root term,

$x=\frac{-b\pm \sqrt{b^2 -4ca}}{2a}$

Evaluate the discriminate for

-79<0 so the quadratic has complex roots for .

Evaluate the discriminate for

The discriminate is positive, therefor the quadratic has real roots for

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Question

Evaluate:

Answer

Recall that $i=\sqrt{-1}$ , , and .

Each imaginary term can then be factored by using .

Replace the numerical values for each term.

The answer is:

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Question

Simplify:

Answer

When simplifying expressions with complex numbers, use the same techniques and procedures as normal.

Distribute the negative:

Combine like terms- combine the real numbers together and the imaginary numbers together:

This gives a final answer of 2+4i

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Question

Simplify:

Answer

When simplifying expressions with complex numbers, use the same techniques and procedures as normal.

Distribute the sign to the terms in parentheses:

Combine like terms- combine the real numbers together and the imaginary numbers together:

This gives a final answer of 10-4i

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Question

Simplify:

Answer

When simplifying expressions with complex numbers, use the same techniques and procedures as normal.

Distribute the sign to the terms in parentheses:

Combine like terms- combine the real numbers together and the imaginary numbers together:

This gives a final answer of 10+2i

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Question

Simplify:

Answer

When simplifying expressions with complex numbers, use the same techniques and procedures as normal.

Distribute the sign to the terms in parentheses:

Combine like terms- combine the real numbers together and the imaginary numbers together:

This gives a final answer of 7+18i

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Question

Simplify:

Answer

When simplifying expressions with complex numbers, use the same techniques and procedures as normal.

Distribute the sign to the terms in parentheses:

Combine like terms- combine the real numbers together and the imaginary numbers together:

This gives a final answer of 9+2i

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Question

Simplify:

Answer

When simplifying expressions with complex numbers, use the same techniques and procedures as normal.

Distribute the sign to the terms in parentheses:

Combine like terms- combine the real numbers together and the imaginary numbers together:

This gives a final answer of -1+9i

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Question

Simplify:

Answer

When simplifying expressions with complex numbers, use the same techniques and procedures as normal.

Distribute the sign to the terms in parentheses:

Combine like terms- combine the real numbers together and the imaginary numbers together:

This gives a final answer of 10-4i

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