MCR3U Unit 2 Quadratics Review

Factoring

Determining Max/Min

Radicals

Roots of Quadratic Functions

Families of Functions/Linear-Quadratic Systems

100

Factor fully:

2x² + 8x

2x(x+4)

100

What is the optimal value? Will it be a maximum or minimum?

f(x) = -4(x+5)² + 7

Max is 7

100

Express as a mixed radical in simplest form.

√392

14√2

100

Find the roots of the following quadratic equation:

0 = x²- 2x - 15

x = -3 and x = 5

100

Find the family equation for a quadratic function with zeros of 24 and -42.

f(x) = a(x - 24)(x + 42)

200

Factor fully:

x²+ 5x + 6

(x+2)(x+3)

200

Find the optimal value of:

f(t) = -5t² + 40t + 100

Then state whether it is a max or min.

The maximum value is 180

200

Simplify the following radical:

√44 + √88 + √99 + √198

5√11 + 5√22

200

Determine the value for k for which the quadratic equation has one root

0 = 9x² +kx + 25

k = 30

200

Find the specific family member of a quadratic function that has zeros of 5 + √7 and 5 - √7 and passes through the point (2 , 15)

f(x) = 15/2(x - 5 - √7)(x - 5 + √7)

300

Factor fully:

9 - 4k²

-(2k - 3)(2k + 3)

300

Determine the min or max coordinates of the following quadratic function by completing the square:

f(x) = x² - 6x + 8

Vertex: (3, -1)

Minimum value = -1

300

Multiply and then simplify your answer:

√70 ⋅ √26

2√455

300

Find the exact roots of:

0 = 9x² + 4x - 16

x = (-2 ± 2√37)/9

300

Determine algebraically whether the linear and quadratic functions intersect and if they do intersect how many points of intersection there will be for the following system:

Line: y = 3x + 5

Quadratic: f(x) = 3x² - 2x -4

D = 133

D > 0 so there are two solutions meaning two points of intersection exist in this system of equations.

400

Factor fully:

4m²n - 28mn² + 49n³

n(2m - 7n)²

400

Last year, the Musical tickets were sold for $11 each and 400 people attend. It have been determined that an increase of $1 in ticket price would cause a decrease in attendance of 20 people. What ticket price would maximize revenue?

$15.50

400

Give the simplest form of the product of:

(3√5 + √6)(√5 - 2√6)

3 - 5√30

400

The power consumption of a school cafeteria is approximated by P(x) = -0.25x² + 6x + 14, where x is the number of hours after 12:00 AM and P is the power consumption in kW.

Determine how long the power consumption is at least 40 kW.

12.65 hours

400

Determine the exact value of the x-values of the points of intersection between:

Line: 4x - y = 5

Quadratic: f(x) = 6x² - 7x - 15

(-2/3,-23/3)

(5/2,5)

500

Factor fully:

x² - y² - 2yz - z²

(x + y + z)(x - y - z)

500

Randy is building a fence at the side of his warehouse. He has 120m of fencing to work with and is using the side of the warehouse as one side of the rectangular fenced area. What are the dimensions of the maximum area that Randy can enclose?

30m by 60m

500

Rationalize:

4 / (5 - √3)

(10 + 2√3)/11

500

Given the quadratic 0 = x² + kx + 4, determine the restrictions on k so the equation has two distinct real roots.

k < -4 and k > 4

500

Write the simplified standard form for the quadratic with:

- x-intercepts at 2 ± √5

- Pass through (5,4)

f(x) = x² - 4x - 1