Functions

Question 1

What is meant by a “Critical Point”?

Answer 1

Any point on a curve where the slope of the tangent to the curve is zero (parallel to x-axis) OR where the slope of the tangent th the curve is undefined (parallel to Y-axis).

Question 2

What is meant by a “Stationary point”?

Answer 2

Any point on a curve where the slope of the tangent to the curve is zero (parallel to x-axis)

Question 3

What is meant by a “local maximum”?

Answer 3

A point on the curve where the function has a greater value at that point than at any points close to it. Not necessarily the greatest value of the function. Can be more then one.

Question 4

What is meant by a “local minimum”?

Answer 4

A point on the curve where the function has a lesser value at that point than at any points close to it. Not necessarily the least value of the function. Can be more then one.

Question 5

What is meant by a “global maximum”?

Answer 5

Occurs when f is defined over a domain A: a

Question 6

What is meant by a continous and discontinous function?

Answer 6

Continous: no break in the curve of the function.Discontinous: Is a break in the function

Question 7

What is meant by an odd function?

Answer 7

-f(x) = f(-x)

graph is rotational 180º about the origin

EX Sine curve sin(-45) = -sin(45)

Question 8

What is meant by an even function?

Answer 8

f(-x) = f(x)

graph is symmetrical under reflection in the y-axis.

EX Cosine curve cos(-45) = cos (45)

Question 9

What is a one-to-one function?

Answer 9

Elememts in the Domain must map to one and only one element in the range.

Question 11

How do you graphically show if a function is One-to-one?

Answer 11

Take a horizontal line and move it up and down over the graph. If at any point the line crosses the graph at more than one point then the function is NOT one-to-one!

Question 12

How do you know if a function is an onto function?

Answer 12

A function where the range is equal to the codomain - there are no extra elements in the codomain. (The range is a subset of the codomain)

Question 13

How do you draw the inverse of a function?

Answer 13

Reflection of the function in the line y=x

Question 14

When is a function non differentiable?

Answer 14

At corners or discontinous points. Only a continous fn can be differentiable

Question 15

How do you know if a function has an inverse?

Answer 15

It is a one-to-one fn (one element in the domain mapped to one lement in the range and vice versa!) and an onto fn.

Question 16

How do you find the inverse of a function?

Answer 16

Ex. f(x) = 3x² + 5

y = 3x² + 5

Change the subject to x:

x = [(y-5)/3]^1/2

then sway x for y

f^-1(x) = [(x-5)/3]^1/2

Question 17

How do you find the vertical asymptote?

Answer 17

The value of x that makes the function undefined.

(the value of x that makes the denominator = 0)

Question 18

How do you find the non vertical asymptote?

Answer 18

If improper fraction: The answer after algebraic long division.

As x → infinity y → Ans

y = Ans

If not improper fraction: y=0

As x → 0 y → 0

y = 0

Question 19

Answer 19

Question 20

Answer 20

Question 21

Answer 21

Question 22

Answer 22