Q1a. Simplify: (5 - 3i) - (11 + 4i)

Background

Topic: Complex Numbers – Addition and Subtraction

This question tests your ability to add and subtract complex numbers by combining real and imaginary parts.

Key Terms and Formulas:

• Complex number: , where is the real part and is the imaginary part.

• To add or subtract complex numbers, combine like terms (real with real, imaginary with imaginary).

Step-by-Step Guidance

1. Write both complex numbers in standard form: and .

2. Distribute the negative sign to the second complex number: .

3. Group the real parts and the imaginary parts separately.

4. Combine the real parts and combine the imaginary parts.

Try solving on your own before revealing the answer!

Q1b. Simplify: -3i(6 - i)

Background

Topic: Complex Numbers – Multiplication

This question tests your ability to multiply a complex number by a scalar and another imaginary number.

Key Terms and Formulas:

• Recall that .

• Use the distributive property to multiply.

Step-by-Step Guidance

1. Apply the distributive property: and .

2. Simplify each term, remembering that .

3. Replace with and simplify further.

Try solving on your own before revealing the answer!

Q1c. Simplify: (3 - 4i)(-2 + 4i)

Background

Topic: Complex Numbers – Multiplication (FOIL Method)

This question tests your ability to multiply two complex numbers using the distributive (FOIL) method.

Key Terms and Formulas:

• FOIL: First, Outside, Inside, Last.

• Remember .

Step-by-Step Guidance

1. Multiply each term in the first parenthesis by each term in the second parenthesis.

2. Combine like terms (real and imaginary parts).

3. Replace with and simplify.

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Q1d. Simplify: (\frac{3}{4} - \frac{1}{2}i)(\frac{3}{4} + \frac{1}{2}i)

Background

Topic: Complex Numbers – Multiplication of Conjugates

This question tests your ability to multiply conjugate pairs of complex numbers, which results in a real number.

Key Terms and Formulas:

• Conjugate: and .

• (since ).

Step-by-Step Guidance

1. Apply the formula for multiplying conjugates.

2. Square the real part and the imaginary part (without ).

3. Add the results, remembering .

Try solving on your own before revealing the answer!

Q1e. Simplify: \frac{6}{5 + i}

Background

Topic: Complex Numbers – Rationalizing the Denominator

This question tests your ability to write a complex fraction in standard form by rationalizing the denominator.

Key Terms and Formulas:

• To rationalize, multiply numerator and denominator by the conjugate of the denominator.

• Conjugate of is .

Step-by-Step Guidance

1. Multiply numerator and denominator by .

2. Expand both numerator and denominator using distributive property.

3. Simplify the denominator using .

4. Write the result in standard form .

Try solving on your own before revealing the answer!

Q1f. Simplify: \frac{2 - i}{5 + 2i}

Background

Topic: Complex Numbers – Rationalizing the Denominator

This question tests your ability to express a complex fraction in standard form by rationalizing the denominator.

Key Terms and Formulas:

• Multiply numerator and denominator by the conjugate of the denominator.

• Conjugate of is .

Step-by-Step Guidance

1. Multiply numerator and denominator by .

2. Expand both numerator and denominator using distributive property.

3. Simplify the denominator using .

4. Write the result in standard form .

Try solving on your own before revealing the answer!

Q2. Solve the quadratic equation:

Background

Topic: Quadratic Equations – Solving by Factoring, Quadratic Formula, or Square Root Property

This question tests your ability to solve a quadratic equation using various methods.

Key Terms and Formulas:

• Quadratic formula:

• Factoring: Express the quadratic as

Step-by-Step Guidance

1. Identify , , and in the equation .

2. Check if the quadratic can be factored easily.

3. If not, set up the quadratic formula with the identified values.

4. Calculate the discriminant .

Try solving on your own before revealing the answer!

Q3. Solve the quadratic equation:

Background

Topic: Quadratic Equations – Solving by Factoring, Quadratic Formula, or Square Root Property

This question tests your ability to rearrange and solve a quadratic equation.

Key Terms and Formulas:

• Quadratic formula:

Step-by-Step Guidance

1. Rewrite the equation in standard form: .

2. Identify , , and .

3. Set up the quadratic formula with these values.

4. Calculate the discriminant .

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Q4. Solve the quadratic equation:

Background

Topic: Quadratic Equations – Solving by Factoring or Quadratic Formula

This question tests your ability to rearrange and solve a quadratic equation.

Key Terms and Formulas:

• Quadratic formula:

• Factoring: Set the equation to zero and factor.

Step-by-Step Guidance

1. Rewrite the equation in standard form: .

2. Factor out the common term if possible.

3. Set each factor equal to zero and solve for .

Try solving on your own before revealing the answer!

Q5. Solve the quadratic equation:

Background

Topic: Quadratic Equations – Solving by Square Root Property or Factoring

This question tests your ability to solve a quadratic equation that is a difference of squares.

Key Terms and Formulas:

• Difference of squares:

• Square root property: If , then

Step-by-Step Guidance

1. Recognize the equation as a difference of squares.

2. Factor or use the square root property to isolate .

3. Solve for by taking the square root of both sides.

Try solving on your own before revealing the answer!