Complex Numbers & Solving Quadratics Equations Review
-3 + 2i
(-1 + 5i) + (-2 - 3i)
12
(-2 - 2i)(-3 + 3i)
-118 + 34i
(-4 + 6i)(2 - i)(3 + 7i)
2-2i
(-4+i) + (6-3i)
11 + 23i
(1 + i)(2 + 3i)(4 - 3i)
-5+4i
(3+2i)+(1+4i)(2i)
5 + 4i
(4 + 6i) - (-1 + 2i)
-1-13i
(4-3i) - (5+10i)
-33-56i
(4-7i)²
4 + 4i
(6+i) - (2-3i)
30
(6-3i)(4+2i)
2-i
(9-6i) - (7-5i)
6
-3i × 2i
-72√3
3√-24 × 2√-18
Stretched Vertically
Choose one correct transformation for the function below. y = -4(x + 3)² + 21
Compressed Vertically
Choose one correct transformation for the function below. y = 1/3(x)² + 5
Translate left 4 units
Choose one correct transformation for the function below. y = 3(x + 4)² + 3
Translate up one unit
Choose one correct transformation for the function below. y = 9(x - 6)² +1
1 Rational, Real Root
Describe the number and type of roots for the quadratic equation. -16x² + 8x -1 = 0
2 Complex Roots
Describe the number and type of roots for the quadratic equation. 2x² - 6x + 9 = 0
2 Irrational, Real roots
Describe the number and type of roots for the quadratic equation. 3x² + 8x + 2 = 0
True
Every complex number has a real part.
True
Every complex number has an imaginary part.
False
Every complex number has either a real part or an imaginary part.
-19
Find the value of the discriminant for the quadratic equation. 7x² + 11x + 5 = 0
0
Find the value of the discriminant for the quadratic equation. x² + 22x + 121 = 0
3, -2
Find the values of (a) and (b) that make the equation true. 3a + (4b + 2)i = 9 - 6i
5, 3
Find the values of (a) and (b) that make the equation true. 4b - 5 + (-a - 3)i = 7 - 8i
x = 1, -3
Solve by Completing the Square. x² + 2x - 3 = 0
x = -2 ± √2
Solve by Completing the Square. x² + 4x + 2 = 0
x = -2, -5/2
Solve by Completing the Square. 2x² + 9x + 10 = 0
x = -4
Solve by Completing the Square. 2x² = -16x - 32
x = 1, -2.5
Solve using the Quadratic Formula. 2x² + 3x - 5 = 0
x = 1/5, 7
Solve using the Quadratic Formula. 5x² - 36x + 7 = 0
x = (-1 ± i√39) / 4
Solve using the Quadratic Formula. 2x² + 5 = -x
x = (3 ± i√7) / 4
Solve using the Quadratic Formula. 2x² - 3x + 2 = 0
x = (-1 ± i√79) / 8
Solve using the Quadratic Formula. 4x² + x + 5 = 0
x = -4 ± 2√13
Solve using the Square Root Property. (4 + x)² - 5 = 47
x = 1 ± √13
Solve using the Square Root Property. (x - 1)² = 13
x = ± √5 / 2
Solve using the Square Root Property. 4x² - 5 = 0
a + bi
Standard form for a complex number is __________?
y = -2(x - 2)² + 3
Write the function in vertex form. y = -2x² + 8x - 5
y = -(x + 2)² + 3
Write the function in vertex form. y = -x² -4x - 1
1
i raised to the 40th power.
i
i raised to the 41th power
-4√15
√-10 × √-24
2i√6
√12 × √-2