Topic 2: Functions Review

Equations of a straight line

Functions/Inverse functions

Graphing/Graph Features

Parent Functions/Modeling

100

What does 'm' stand for in the following equations of a straight line:

y-y₁ = m(x-x₁) and y = mx + c

gradient (SLOPE IS WRONG AND NOT ACCEPTED AS AN ANSWER)

100

Determine the image of the following quadratic function at x = 5

f(x) = 3x²- 1.5x + 7

To find the image, you substitute the value of x into the function, so f(5) = 3(5)²- 1.5(5) + 7 = 74.5

100

The domain of a function is associated with the ___ values and the range of a function is associated with the ____ values. (Both blanks must be correct to earn the points)

domain is associated with x values (inputs) and range is associated with y-values (outputs)

100

Name one parent function that has a domain of

[x: -∞ < x < ∞]

linear, quadratic, cubic, exponential growth/decay, trigonometric

200

Determine the gradient between the following two points: (-4,3) and (-7,5)

Use the gradient formula: (y₂-y₁)/(x₂-x₁)

(5 - 3)/(-7 - (-4)) = 2/(-7 + 4) = -2/3

200

In order for a function to have an inverse, that function must have what characteristic?

be one-to-one, every input has only one output and every output as only one input

200

What are the zeros of a function?

Points where the graph of the function touch or cross the x-axis. They are also called x-intercepts.

200

True or false: The value of an asymptote is included in the domain/range.

False

300

Parallel lines have the _____________ gradient while perpendicular lines have gradients that are the _____________________, _____________________ of each other. You must fill in all blanks to earn the points for this question.

same, opposite, reciprocal (or same, reciprocal, opposite)

300

Describe one way you can find the inverse of a function?

switch x and y in the equation and use inverse operations isolate y, reflect the function across the line y=x, switch the x and y values of some of the points of the function, graph those points, and determine the line that goes through them

300

What is the vertex of a quadratic function?

The minimum or maximum turning point of the graph.

300

Ms. Reinbold was heating up water for tea and asked me to determine the function that models the rate at which the water heats up.

I determined this function to be: T(t) = 0.1e^0.03t + 20 where t is the time in seconds and T(t) is the temperature of the water in degrees celsius.

What is the temperature of the water when it is placed in the kettle?

Plug in 0 for t to get 20.1 degrees Celsius

400

The equation for the line that represents Broad Street is given as: y = -2x + 5. Find the equation for Malvern Avenue, which is perpendicular to Broad Street, if you are standing on Malvern Avenue at point (-3,2).

the gradient of Malvern Avenue is the opposite reciprocal of the gradient of Broad Street, so 1/2

substitute the gradient (1/2) and the point (-3,2) into point-gradient form and then simplify the double negative

y - 2 = 1/2(x + 3)

400

Determine the inverse of this function:

f(x) = 5x - 3

y = 5x - 3 (replace f(x) with y)

x = 5y - 3 (switch x and y)

x + 3 = 5y

x/5 + 3/5 = y (isolate y)

f^-1(x) = x/5 + 3/5 (replace y with f^-1(x))

400

What do we call the vertical or horizontal line that the graph of a function approaches but does not touch?

An asymptote

400

Ms. Reinbold was heating up water for tea and asked me to determine the function that models the rate at which the water heats up.

I determined this function to be: T(t) = 0.1e^0.03t + 20 where t is the time in seconds and T(t) is the temperature of the water in degrees Celsius.

Determine the horizontal asymptote of this graph.

y = 20, graph the function and trace to the left to observe the y-value that the graph is approaching but never touches

500

You are driving from your house to school. You note the time you leave your house to be 8:15 and the time you arrived at school to be 8:30. You also know that you live 5 miles from the school. You want to determine the equation that models your trip to school, so you create the following two points:(0,0) and (15,5) where x represents time in minutes and y represents the distance traveled in miles. Determine the gradient between these two points and interpret it's meaning in the context of the problem.

Use the gradient formula: (y₂-y₁)/(x₂-x₁)

(5-0)/(15-0) = 5/15 = 1/3 miles per minute

This represents the average speed that you traveled to school at in miles per minute

500

Find the inverse of this function:

f(x) = 3x³

y = 3x³ (replace f(x) with y)

x = 3y³(switch x and y)

1/3x = y³

∛(1/3x) = y (isolate y)

f^-1(x) = ∛(1/3x) (replace y with f^-1(x))

500

Name one parent function that has an asymptote.

Exponential growth, exponential decay, rational (inverse)

500

Ms. Reinbold was heating up water for tea and asked me to determine the function that models the rate at which the water heats up.

I determined this function to be: T(t) = 0.1e^0.03t + 20 where t is the time in seconds and T(t) is the temperature of the water in degrees Celsius.

Determine how long it takes for the water to boil. Water boils at 100 degrees Celsius

Since temperature is the 'y' value, you can use numeric solver to solve for 'x' or the time in seconds, t. Press math and scroll down to find Numeric Solver and press enter. Then type 0.1e^0.03x + 20 into E1 and 100 into E2, press enter, then press alpha, enter and it will solve for x. (If you do not press alpha enter, it will not solve). X = 22.8 or 223 seconds.