Enter Title

Sets

Rational Equations

Functions and Graphs

Transformations

100

In your own words, describe what a set is.

A set is a collection of distinct objects such as numbers, letters, symbols etc..

100

Explain why they are named rational equations.

They contain rational expressions (numerator/denominator) similar to how a rational number is a fraction of two intergers.

100

When we have two different equations plotted on a graph and we are looking for the solution of the equations what point are we interested in?

The intersection of the two graphs

100

Name the 3 types of reflections and how to identify each one.

x axis -> y = -f(x)

y axis -> y = f(-x)

y = x -> x = f(y)

200

If (A n B) = 0, what can we say about the sets A and B?

A and B are disjoint sets

200

What are non-permissible values? Why do they occur?

They occur because we cannot divide by 0. Therefore we must be careful what values of our variable we pick.

200

Name 5 base graphs we have studied and describe the base shape of each graph.

y = x

y = x^2

y = x^3

y = 1/x

y = 2^x

200

In what order should you apply transformations?

Stretches

Reflections

Translations

300

What does (A u B)' mean? What area does this represent in a Venn Diagram.

The compliment of A or B

In the Venn Diagram, everything except A or B

300

What happens to the graph of a rational equation when we are able to cancel out a variable term in the numerator/denominator?

A point of discontinuity forms.

300

If I have a quadratic function with roots at a and b. What is the equation of the line of symmetry of this quadratic function?

Roots are at a and b. Line of symmetry will be in the middle of a and b. So the line of symmetry will be at x = (a+b)/2

300

State what each parameter in the general form of a transformation represents.

a - vs stretch by a and if a < 0 reflection on x axis

b - hs stretch by 1/b and if b < 0 reflection on x axis

h - ht by h units

k - vs by k units

400

Given two sets A and B. A and B have common elements. What is the value of (A n B) n (A n B')?

400

Simplify the following rational expression and state any NPVs.

(x+2)/(x-3) where x cannot equal -3, -1/2, 3, 4

400

Is a scenario possible where two functions can have 3 solutions? If so provide an example.

Yes

ex:

y = (1/3)x^3

y = x

400

Name a function that when reflected along the line y=x has no change in its shape.

y = 1/x

500

Given

e = {x: 0 < x < 11}

A = {x: x are even numbers}

If it is possible, create a set B so that n(A n B) = n(e).

It is not possible, A n B can only have a maximum possible number of intersections of 5.

500

Solve the following rational equation. State any NPVs.

x = -3

500

Consider the graph of y = x^2. If we create a tangent line at the minimum point what will we find the value of the slope of the tangent line be? Give an example of a scenario where this can be useful.

slope = 0

If we have a parabola, and we know the coordinate where the slope is found to be 0 we can say that point can be the minimum/maximum point.

Ex: Trajectory of a ball, we can have the exact point where it is at it's maximum height

500

The point (2, 4) lies on our parent function y=f(x). The function is transformed and now has become (-3, 9). What is a possible combination of transformations that the parent function has experienced if the function experience at least 1 stretch.

ex:

vs by 2

vt up 1

ht 1 right

reflection on the y axis