INTRO TO QUADRATIC CONCEPTS AND VOCAB 2015 COPY

Question 1

why are they called “quadratics?”

Answer 1

from latin “quadrus” which means SQUARE

Question 2

what is the tough thing about quadratics?

Answer 2

the fact that they are squared.. We have to undo that x². We want to get it linear!!

Question 3

How do we handle that squared term? how can we undo it?

Answer 3

by either splitting the x’s apart by factoring, or by taking a square root somewhere..

Question 4

Why is it called a “linear” term

Answer 4

alone its graph would be a straight line

Question 5

why is it called a constant term

Answer 5

alone it would be a constant function.. The same height always. a horizontal line with a constant y, a constant height

Question 6

why is it called a discriminant?

Answer 6

because it discriminates between which type of solutions, roots and zeros you will have (2real, one real or imaginary)

Question 7

Geometrically, how is the shape of a parabola made?

Answer 7

A parabola is the set of all points equidistant from point, called the focus, and a line, called the directrix.

Question 8

Are all quadratics similar?

Answer 8

YES.. THEY ALL HAVE THE EXACT SAME SHAPE.. They are simply zoom-ins or zoom-outs of eachother..

Question 9

Why do parabolas look different if they are all similar?

Answer 9

Well…. Simply either imagine zooming way in or zooming way out… this method can always get any 2 parabolas to look the same.

Question 10

f(x)= 3x²-4x+5 What is a, b and c ?

Answer 10

a = 3, b = -4, c = 5

Question 11

f(x)= 3x²-6x+3 What is the axis of symmetry?

Answer 11

-b/2a = -(-6)/2(3) = 6/6 = 1

Question 12

f(x)= 5 - 2x +3x² What is a, b and c ?

Answer 12

a = 3, b = -2, c = 5

Question 13

f(x)= -4x² + 8 What is a, b and c ?

Answer 13

a = -4, b = 0, c = 8

Question 14

f(x)= 3x - 9 What is a, b and c?

Answer 14

a = 0 , b = 3, c = 9..

There is no quadratic term.. THIS IS LINEAR!!! IT’S A LINE!

slope of

Question 15

f(x)= 6x²- 7x What is a, b and c ?

Answer 15

a = 6, b=-7, c = 0

Question 16

f(x)= 6x²- 5x What is the axis of symmetry?

Answer 16

x= -b/2a = -(-5)/2(6) = 5/12, AOS x= 5/12

Question 17

f(x)= -4x² + 8 What is the axis of symmetry?

Answer 17

x= -b/2a = -0/2(-4) = 0/8 = 0. AOS is x=0, which is the y axis!!

Question 18

What are the five ways to solve a quadratic?

Answer 18

set to zero and factor, complete square, quadratic formula, graph and look for x-intercepts, or when there is no linear term, isolate the x² and root both sides.

Question 19

When can you just isolate the x² and root both sides?

Answer 19

when there are no linear terms (only quad and const)

Question 20

How do you know when it is a quadratic?

Answer 20

when the highest degreed term is the x² term (quadrus:square)

Question 21

f(x)= 3x²-6x+3 What is the quadratic term?

Answer 21

3x²

Question 22

f(x)= 3x²-6x+3 What is the linear term?

Answer 22

-6x

Question 23

f(x)= 3x²-6x+3 What is the constant term?

Answer 23

3, it is the also the y intercept

Question 24

what is a coefficient?

Answer 24

the number in front of a variable or variables

Question 25

f(x)= 3x²-6x+3 What is the coefficient of the quadratic term?

Answer 25

3 this is also known as “a”

Question 26

f(x)= 3x²-6x+3 What is the coefficient of the linear term?

Answer 26

-6 this is also known as “b”

Question 27

f(x)= 3x²-6x+3 What is the coefficient of the constant term?

Answer 27

3 this is also known as “c”

Question 28

what is the quadratic term’s exponent on the x ?

Answer 28

2

Question 29

what is the linear term’s exponent on the x ?

Answer 29

1

Question 30

what is the constant term’s exponent on the x?

Answer 30

0

Question 31

f(x) = ax² + bx + c What is the coefficient of the quadratic term?

Answer 31

a

Question 32

f(x) = ax² + bx + c What is the coefficient of the linear term?

Answer 32

b

Question 33

f(x) = ax² + bx + c What is the coefficient of the constant term?

Answer 33

c (it is the y intercept)

Question 34

f(x) = ax² + bx + c What is the quadratic term?

Answer 34

ax²

Question 35

f(x) = ax² + bx + c What is the linear term?

Answer 35

bx

Question 36

f(x) = ax² + bx + c What is the constant term?

Answer 36

c (it is the y intercept)

Question 37

Describe what an axis of symmetry is

Answer 37

it is where the parabola can fold onto itself. It is the equation of this vertical line, so you write “x = ___”

(-b/2a)

Question 38

What is the equation of the axis of symmetry?

Answer 38

x = -b / 2a (notice it is the equation of a vertical line)

Question 39

where is the vertex located?

Answer 39

on the axis of symmetry (highest or lowest point)

Question 40

What is the quadratic formula?

Answer 40

x = -b +- sqroot b squared - 4ac all over 2a (but in formula)

Question 41

How do you solve by completing the square?

Answer 41

get all quadratic and linear term on one side and bring constant term over to other…. Make sure a=1, take half of b and square it, add it to both sides. Factor, root, solve

Question 42

what completes the square and what is the factored form? x2 + 6x + ____

Answer 42

9 completes it and the factored form is (x+3)²

Question 43

what completes the square and what is the factored form? x2 - 8x + ____

Answer 43

16 completes it and the factored form is (x-4)²

Question 44

what completes the square and what is the factored form? x2 + 5x + ____

Answer 44

25/4 completes it and the factored form is (x + 5/2) ²

Question 45

what completes the square and what is its factored form? x2 + b/a x + ____

Answer 45

b²/4a² completes it and the factored form is (x+ b/2a)²

Question 46

What are solutions to (x+8)(x-3) = 0

Answer 46

x = { -8, 3} this is not a point on the graph, it is a set of two numbers that make the equation true. They are also the x intercepts of the parabola

Question 47

How do you solve by factoring?

Answer 47

get stuff all on one side, factor, set each factor = 0, solve each linear equation.

Question 48

How do you solve by isolating the x² ? (when can you do it?)

Answer 48

When there is no linear term (no x term), simply act like you’re solving for x, but solve for x2 and in the last step, take square root of both sides ( + / - )

Question 49

What is the discriminant?

Answer 49

b²-4ac (notice there is no sq root on it!!)

Question 50

What does the discriminant tell us about?

Answer 50

about the roots, the zeros, how many x intercepts the parabola has, how many times it crosses the x axis, whether roots are real or imaginary

Question 51

What do we call b²-4ac

Answer 51

the discriminant

Question 52

If the discriminant is zero, what do you know about roots?

Answer 52

there is one double root, it is a perfect square, the parabola just touches down x axis without crossing, the vertex is on the x axis.

Question 53

If the discriminant is negative, what do you know about roots?

Answer 53

there are no real roots, 2 imaginary roots, the parabola doesn’t touch x axis

Question 54

If the discriminant is positive, what do you know about roots?

Answer 54

there are 2 real roots, and the parabola crosses x axis twice.. at these roots

Question 55

Explain what a parabola with no real roots (real zeros) looks like.

Answer 55

doesn’t touch x axis

Question 56

Explain what a parabola with one real root (real zero) looks like.

Answer 56

just touches x axis at one spot, the root (the zero), it doesn’t cross it, it bounces off it, called a “double root”, the vertex is on the x axis

Question 57

Explain what a parabola with two real roots (real zeros) looks like.

Answer 57

crosses x axis at those roots, at those x values

Question 58

why are roots called “zeros”

Answer 58

because it is where the height is zero; where the y value is zero; they are the x values that make the y=0

Question 59

what is difference between (3, -2) and {3, -2}

Answer 59

the first is a point on a plane (over 3, down 2) and is in parentheses… The second set are numbers in braces, so it is simply a set containing two values, 3 and -2. It is not a point on a plane, the order does non matter in braces.

Question 60

If the discriminant is negative, how many times does the parabola hit the x axis?

Answer 60

0

Question 61

If the discriminant is zero, how many times does the parabola hit the x axis?

Answer 61

1

Question 62

If the discriminant is positive, how many times does the parabola hit the x axis?

Answer 62

2

Question 63

thinking of the quadratic formula, why are there no real roots when you have a negative discriminant?

Answer 63

because you have to take the square root of a negative, which is an imaginary number. You end with an imaginary number.. .hence.. Imaginary roots (not real)

Question 64

thinking of the quadratic formula, why is there only one real root when the discriminant is zero?

Answer 64

because the square root of zero is zero, so you are going to + and - zero… the quad formula reduces to -b/2a .. The only root is the axis of symmetry (the vertex is on the x axis)

Question 65

thinking of the quadratic formula, why are there 2 real roots when the discriminant is positive?

Answer 65

because there is a square root of a positive, you will have to + and - that in the top, giving 2 different real solutions.

Question 66

What are the roots of a function? (other names?)

Answer 66

the zeros, the x-intercepts, the solutions, where the parabola crosses

Question 67

What are the zeros of a function? (other names?)

Answer 67

the roots, the x intercepts, the solutions, where the parabola crosses

Question 68

What are the solutions of a function? (other names)

Answer 68

the roots, the x intercepts, the zeros where the parabola crosses

Question 69

What are the x intercepts of a function? (other names?)

Answer 69

the roots, the zeros, the solutions

Question 70

When we graph a parabola to solve a quadratic, what do we look for?

Answer 70

look for the x intercepts, these are the roots. The zeros, the solutions

Question 71

How do you graph a parabola?

Answer 71

first graph the Axis of symmetry with dotted line, (x= -b/2a) then make a T table and use that x value to find the vertex and use a couple integers near it to find other points. LEAVE SPACE FOR ARITHMETIC. Reflect over the AOS and connect the dots

Question 72

What are the two forms of quadratic functions?

Answer 72

standard and vertex form

Question 73

What is the vertex form of a quadratic?

Answer 73

f(x) = a(x-h)² + k

Question 74

what is tricky about the vertex form?

Answer 74

the -h part.. If its (x+9)² +8 then h is -9.. remember that h is also the AOS !!!

Question 75

What is the standard form of a quadratic?

Answer 75

ax²+bx+c = 0

Question 76

How do you convert from standard to vertex form?

Answer 76

Leave space, complete square by ADDING ZERO ( +4 -4), write the square as factored form

Question 77

How do you convert from vertex to standard form?

Answer 77

square the binomial and combine stuff

Question 78

f(x) = a(x-h)² + k where it the vertex? what is the Axis of Symmetry?

Answer 78

vertex at the point (h, k), the AOS is the vertical line x= h

Question 79

f(x) = a(x-h)² + k How do we know if it opens up or down?

Answer 79

by the sign of a, if its positive, up, negative , down

Question 80

f(x) = a(x-h)² + k How do we know if it has max or min?

Answer 80

by the sign of a, if its positive it opens up so it has a MIN, negative it opens down so it has a MAX

Question 81

f(x)= -2(x-5)²-3

What is vertex and is it a min or a max? What is the axis of symmetry?

Answer 81

at ( 5, -3) and it is a maximum, the AOS is x=5

Question 82

f(x)= -4(x-8)²+6

What is vertex and which way does it open?

what is AOS?

Answer 82

at (8, 6) and opens downward (has max). The AOS is x=8

Question 83

f(x)= 2(x+4)²-3 What is vertex and which way does it open?

Answer 83

at (-4, -3) and it opens upwards (has min)

Question 84

f(x)= (x+9)²-8 What is vertex and is it a min or a max?

Answer 84

at (-9, -8) and it is a minimum

Question 85

When converting from standard to vertex form, and “a” is not 1, what do you have to be careful about?

Answer 85

Focus on quadratic and linear term.. Factor out “a”.. Complete the square, be sure to subtract (a times the number you used to complete square) from the constant term so that you are adding ZERO

Question 86

How do you find the vertex of a parabola in standard form?

Answer 86

the x value is always -b/2a . To get the y value for it, put that x value into the function and solve

Question 87

How do you know if a parabola has a max or minimum by looking at the function in standard form?

Answer 87

if “ a” is pos, it has a min. if ‘a’ is negative, it has a max

Question 88

How do you know if a parabola in standard form opens upward (smile) or down (frown)?

Answer 88

if “a” is pos it opens up. if a is negative, it opens down. Positive people smile, negative people frown.

Question 89

How do you find the max or min value of a quadratic in either form?

Answer 89

it is the y value at the vertex. In vertex form, it’s simply k. In standard form, Plug -b/2a into the function to get y.

remember to look at “a” + smiles have min.. - frowns have max.

Question 90

When completing the square and “a” is not equal to 1, what do you have to do?

Answer 90

divide both sides of equation (every term) by that “a” to turn “a” into “1”

Question 91

Does “a” have to be equal to 1 when doing quadratic formula?

Answer 91

NO

Question 92

Does “a” have to be equal to 1 when completing a square?

Answer 92

YES

Question 93

If there is no linear term, what is an easy way to solve?

Answer 93

simply isolate the x² and root both sides.

Question 94

If “a” is not equal to one and you want to factor, what should you do?

Answer 94

bridge method (or look for perfect square trinomial or diff of squares)

Question 95

If there is no constant term, what is an easy way to factor?

Answer 95

just factor out the x and set the factors to zero (one solution is zero)

Question 96

What is the zero product property?

Answer 96

(this)(that)=0 is true when (this)=0 and when (that)=0.

this is what we use when solving by factoring.

Question 97

how would you solve (3x-2)(x-5)=0 (what are solutions?)

Answer 97

set factors = 0 and solve: 3x-2=0 and solve x-5=0 zero product property. The solutions are x = { 5, 2/3}

Question 98

how would you solve 4x² - 9 = 13 ? (just say what you’d do)

Answer 98

no linear term, so just isolate the x² and root sides

Question 99

How would you solve 9x² - 3x = 0 ? (just say what you’d do)

Answer 99

factor out x and set factors=0.. (one solution will be 0)

Question 100

How do you know when a parabola is smiling?

Answer 100

when a is positive

Question 101

How do you know when a parabola is frowning?

Answer 101

when a is negative

Question 102

How is the axis of symmetry hidden in the quadratic formula?

Answer 102

it is the beginning.. (put both parts over 2a)

Question 103

What does the quadratic formula say about finding the x intercepts?

Answer 103

stand at the AOS and reach up and down a bit to find the solutions

Question 104

What is solution to:

5(x-8)(x+3)=0

Answer 104

8 and -3

(this)(that)=0 situation

this=0 and that=0

we are looking for the x values that make the equation true.. so we want to make x-8=0 and x+3=0

Question 105

What is solution to:

g (x+f)(x-w) = 0

Answer 105

• f and w
  (this) (that)=0 situation

this=0 and that=0

we want to make equation true

so we solve x+f=0 and x-w=0

Question 106

What are the x intercepts of:

y=5(x+6)(x-3)

Answer 106

at -6 and at 3

(they are also called solutions or zeros)

Question 107

Do all quadratic functions have x intercepts?

Answer 107

No, some don’t touch the x axis.. These have imaginary roots and a negative discriminant

Question 108

Do all quadratics have a y intercept

Answer 108

YES… All quadratics have exactly 1 y-intercept.. (c).. if there is no constant term, the y intercept is 0, so the parabola passes through the origin!!!!

Question 109

What are the three forms of a quadratic function?

Answer 109

Standard y=ax²+bx+c

Vertex y=a(x-h)²+k

Factored y=e(x+f)(x+g)

Question 110

What are the zeros of y=5(x-3)(2x+1)

Answer 110

The zeros, or roots, or x intercepts are at

(3, 0) and (-1/2, 0)