Quadratic Functions

Yoyo

TomTom

Cody

100

The standard form of a quadratic equation is ax²+bx+c=0.

Identify the values of a, b and c in the quadratic equation −8x²+3x=0.

a = -8

b = 3

c = 0

100

The standard form of a quadratic equation is ax²+bx+c=0.

Identify the values of a, b and c in the quadratic equation 3x²−8x+2=9x−7.

a = 3

b = -17

c = 9

100

By definition, what is the number i equal to?

Therefore, what does i² equal?

√−1

-1

100

To solve x²−x=2, Emma substitutes a=1 into the quadratic formula. What value of c should she substitute into the quadratic formula?

-2

200

Express 9−√−64 in terms of i

9-8i

200

Express −√−100 in terms of i.

-10i

200

Consider a quadratic function that passes through the points shown in the table. (3)

Does this quadratic function have a maximum or minimum point?

What is the minimum value of the function?

What is the range of the quadratic function?

Minimum

(4,-1)

y ≥ -1

200

Consider the curve y=x²+2x−2.

Determine the equation of the axis of symmetry.

Now determine the minimum value of y.

x = -2/2 = -1

(-1,-3)

300

Consider the equation y=2x². (5)

Is every value of y positive?

State the axis of symmetry of the parabola.

What is the minimum value of y?

Yes

x = 0

(0,0)

300

A quadratic function includes the points shown in the table. (4)

Does the function have a maximum or minimum point?

What is the minimum value of the function?

What is the range of the function?

Minimum

(7,-3)

y ≥ -3

300

Consider the graph of the function y=f(x) and answer the following questions. (2)

What is the absolute minimum of the graph?

Hence determine the range of the function.

Over what interval of the domain is the function decreasing?

(-4,0)

y≥0

x<-4

300

After using your quadratic formula, your discriminant is -1, how many solutions will there be?

No real solutions or 2 imaginary

400

Identify the graph of the quadratic f(x)=ax²+bx+c, where a>0 and b2−4ac=0

(13)

400

Below your discriminant from the quadratic formula.

d = 9-4x56

How many solutions will there be?

2 imaginary or no real solutions

400

For a particular quadratic equation, ax²+bx+c=0, b2−4ac=0, how many solutions are there?

No real solutions

(or 2 imaginary ones)

400

Consider the equation x²+6x+9=0

Find the discriminant and number of solutions.

1 solution

500

Solve the equation 4x²+6x+2=0 using the quadratic formula.

-1/2

-1

500

Solve x²+2x+5=0, stating your solutions in the form a±bi

-1±2i

500

Use the quadratic formula to find the solutions of x²+7x−3=0.

-0.46

-6.54

500

Solve the equation x²+11x+28=0 by using the quadratic formula.

-1

-10