General Mathematics Past Paper PDF

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This document appears to be a set of general mathematics lesson notes covering topics including relations, functions, and piecewise functions. It includes activities for students to practice. No date or exam board are mentioned.

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GENERAL MATHEMATICS
LESSON 1: RELATIONS AND FUNCTIONS

RELATIONS REPRESENTING FUNCTIONS
A rule that relates values from a set of Set of ordered pairs - there should be no
values (called the domain) to a second set repeating x-value
of values (called the range).
Table of values - there should be no
repeating x-value
FUNCTION Mapping diagram - one-to-one, many-to-
A set of ordered pairs (x,y) such that no two one function
ordered pairs have the same x-values but Graph - Vertical line test (drawing a vertical
different y-values. line must only intersect the graph once)
Using functional notation, we can write Equations - no negative, decimal, or
f(x) = y read as "f of x is equal to y." fractional exponent

ACTIVITY: RELATIONS VS. FUNCTIONS
Determine whether the following relation is a function.

1. {(2,4), (6,8), (5,7), (3,5)} 6. x y 7. x y 8.

2. {(1,2), (1,3), (4,5), (6,7)} -1 1 1 4
3. f(x) = x² - 4/x + 5 -2 2 2 3
4. f(x) = √(x) -4 5 3 2
5. y = x³ + 6x² - 3x + 27 -4 6 4 1

GENERAL MATHEMATICS
LESSON 2: EVALUATING FUNCTIONS AND PIECEWISE FUNCTION

EVALUATING FUNCTION REPRESENTING FUNCTIONS
To evaluate a given function, substitute the x A piecewise function is a function that has a
value to the function and then simplify. different expression for different intervals of
the input.

ACTIVITY: EVALUATING FUNCTIONS
Evaluate the following functions given the set of x values.

1. f(x) = x² - 4x - 4; find f(2) 4. 150x , if 0 < x ≤ 99
2. f(x) = 5x - 25; find f(5) f(x) = 500 , if x = 100
3. f(x) = x³ - 5x² - x - 11; find f(3) 500 + 100 (x - 100) , if x > 100
a. Find f(100) b. Find f(9) c. Find f(102)
GENERAL MATHEMATICS
LESSON 3: FUNCTIONS OPERATIONS

FUNCTIONS OPERATIONS (f + g)(x) = f(x) + g(x)
Let f and g be functions defined at a real
number x. The sum, difference, product, and
(f - g)(x) = f(x) - g(x)
quotient, of f and g are the functions defined
by:
(f g)(x) = f(x) g(x)
(f ÷ g)(x) = f(x) ÷ g(x), g(x) ≠ 0

ACTIVITY: OPERATIONS ON FUNCTIONS
Solve the following operations on functions.

1. Functions of f, g, and h are given by a. (g + h)(x) e. (g + h)(2)
f(x) = x² + x - 12 b. (f - g)(x) f. (f - g)(3)
g(x) = 5x - 2 c. (g h)(x) g. (g h)(4)
h(x) = x - 3 d. (f ÷ h)(x) h. (f ÷ h)(5)

GENERAL MATHEMATICS
LESSON 4: FUNCTION COMPOSITION

FUNCTION COMPOSITION (f ∘ g)(x) = f[g(x)]
Let fng be functions, the composite of
functions f and g is defined as (f ∘ g)(x) =
f[g(x)]. The domain of (f ∘ g)(x) consists of
all real numbers f in the domain of g for
which g(x) is in the domain of f.

ACTIVITY: FUNCTION COMPOSITION
Find the composite of the given function.

1. Functions of f, g, and h are given by a. (f ∘ h)(x) e. (f ∘ h)(5)
f(x) = x² + x + 6 b. (f ∘ g)(x) f. (f ∘ g)(4)
g(x) = x - 2 c. (g ∘ h)(x) g. (g ∘ h)(3)
h(x) = x - 3 d. (h ∘ g)(x) h. (h ∘ g)(2)
GENERAL MATHEMATICS
LESSON 5: INVERSE OF FUNCTIONS

ONE-TO-ONE FUNCTION REPRESENTING FUNCTIONS
The function of f is one-to-one f or any x 1 , x 2 , Let f be a one-to-one with domain A and
in the domain of f, then f(x 1 ) ≠ f(x 2 ). That is, range B. Then the inverse of f, denoted by f
-1

the same y-value is never paired with two is a function with domain Band range A
different x-values. defined by f (y) = x if and only if f(x) = y for
-1

any y in B
A linear function is a one-to-one function. A
quadratic function is not a one-to-one A function has an inverse if and only if it is
function. one-to-one.

HORIZONTAL LINE TEST f(f -1 (x)) = f -1 (f(x))
If every horizontal line intersects the graph of
a function f and at most one point, then f is
one-to-one.

ACTIVITY: INVERSE OF FUNCTIONS
Find the inverse of the following functions.

1. {(1,2), (3,4), (5,6), (7,8), (9, 10)} 3. {(1,5), (3,4), (7,6), (8,5), (9, 10)}
2. f(x) = 5x + 3 4. f(x) = ⅔x - 8

GENERAL MATHEMATICS
LESSON 6: RATIONAL EQUATIONS AND INEQUALITIES

RATIONAL EQUATION Determine if the intervals of the rational
expression takes positive or negative values
An equation that contains rational
a. Determine the x values for which the
expressions is referred to as a rational
ational expression is zero or undefined.
equation.
b. Mark the numbers on the number line.
c. Select the test points within the interior of
RATIONAL EQUATION the interval.
e. Summarize the intervals containing the
An inequality involving rational expressions.
solutions.

SOLVING RATIONAL INEQUALITIES
Rewrite the inequality as a single rational
expression on one side of the inequality
symbol and zero on the other side.

ACTIVITY: RATIONAL EQUATIONS AND INEQUALITIES
Solve the following rational equations and inequalities.

3x 2 7 1 1 4x+2 2x
— +— = —- 2. —— +—— = ———- 3. —— ≥1
1. 5 3 30 x-1 x+1 x²-1 x+1
GENERAL MATHEMATICS
LESSON 7: RATIONAL FUNCTIONS

RATIONAL FUNCTION OBLIQUE ASYMPTOTE
A function in the form f(x) = p(x) / q(x), A line of the form

(
where p(x) and q(x) are polynomials and y = mx + b which the

(
q(x) is not equal to zero. curve approaches but
never touches. It exists
VERTICAL ASYMPTOTE if the degree of n is
larger than the degree
A vertical line of the of m, that is, n = m + 1.
form x = a which the

(
(
curve approaches but
never touches. The DOMAIN
vertical line passing
through the zeros of The set of all values of x that have
the denominator of corresponding values of y; it contains all
the rational functions values that go into the function.
are the vertical
asymptotes. RANGE
HORIZONTAL ASYMPTOTE The set of all values of y that can be
obtained from the possible values of x; it
A horizontal line of the contains all possible values of the function.
(

form y = b which the

(
curve approaches but REPRESENTING FUNCTIONS
never touches.
To determine the The intersection of the
horizontal asymptote graph to the x and y

(
(
of a function axis.
(0,y)
f(x) = p(x)/ q(x), To get the x-intercept,
the degrees of the numerator equate the numerator (x,0)
and the denominator will be considered. to zero.
Let n and m be the degree of p(x) and To get the y-intercept,
q(x) respectively. evaluate f(0).
a. If nm, there is no horizontal asymptote. same with the x-intercept/s.

ACTIVITY: RATIONAL FUNCTION
Given the following function, find horizontal and vertical asymptotes, domain, range,
x-intercept, y-intercept and zeroes.

2x +3
f(x) =
x+2
GENERAL MATHEMATICS
ANSWER KEY

ACTIVITY: RELATIONS VS. FUNCTIONS
Determine whether the following relation is a function.

1. {(2,4), (6,8), (5,7), (3,5)} 6. RELATION 7. FUNCTION 8. RELATION
FUNCTION
x y x y
2. {(1,2), (1,3), (4,5), (6,7)}
-1 1 1 4
RELATION
-2 2 2 3
3. f(x) = x² - 4/x + 5
-4 5 3 2
RELATION
-4 6 4 1
4. f(x) = √(x)
RELATION
5. y = x³ + 6x² - 3x + 27
FUNCTION

ACTIVITY: EVALUATING FUNCTIONS
Evaluate the following functions given the set of x values.

1. f(x) = x² - 4x - 4; find f(2) 4. 150x , if 0 < x ≤ 99
f(2) = (2)² - 4(2) -4 f(x) = 500 , if x = 100
f(2) = 4 - 8 - 4 500 + 100 (x - 100) , if x > 100
f(2) = -8 a. Find f(100)
f(100) = 500
2. f(x) = 5x - 25; find f(5)
f(5) = 5(5) -25 b. Find f(9)
f(5) = 25 - 25 f(9) = 150(9)
f(5) = 0 f(9) = 1350

3. f(x) = x³ - 5x² - x - 11; find f(3) c. Find f(102)
f(3) = (3)³ - 5(3)² - (3) - 11 f(102) = 500 + 100(102 - 100)
f(3) = 27 - 5(9) - 3 - 11 f(102) = 500 + 100(2)
f(3) = 27 - 45 - 3 - 11 f(102) = 500 + 200
f(3) = -32 f(102) = 700
GENERAL MATHEMATICS
ANSWER KEY

ACTIVITY: OPERATIONS ON FUNCTIONS
Solve the following operations on functions.

1. Functions of f, g, and h are given by
e. (g + h)(2)
f(x) = x² + x - 12
(g + h)(2) = [5(2) - 2] + [(2) - 3]
g(x) = 5x - 2
(g + h)(2) = 10 - 2 + 2 - 3
h(x) = x - 3
(g + h)(2) = 7
a. (g + h)(x)
f. (f - g)(3)
(g + h)(x) = (5x - 2) + (x - 3)
(g + h)(x) = 5x - 2 + x - 3 (f - g)(3) = [(3)² + (3) - 12] - [5(3) - 2]

(g + h)(x) = 6x -5 (f - g)(3) = 9 + 3 - 12 - 15 + 2
(f - g)(3) = -12
b. (f - g)(x)
(f - g)(x) = (x² + x - 12) - (5x - 2) g. (g h)(4)

(f - g)(x) = x² + x - 12 - 5x + 2 (g h)(4) = [5(4)- 2][(4) - 3]
(f - g)(x) = x² - 4x - 10 (g h)(4) = (20 - 2)(1)
(g h)(4) = (18)(1)
c. (g h)(x) (g h)(4) = 18
(g h)(x) = (5x - 2)(x - 3)
(g h)(x) = 5x² - 15x - 2x + 6 h. (f ÷ h)(5)
[(5)² + (5) - 12]
(g h)(x) = 5x² - 17x + 6 (f ÷ h)(x) =
[5(5) - 2]
25 + 5 - 12
d. (f ÷ h)(x) (f ÷ h)(x) =
25 - 2
(x² + x - 12)
(f ÷ h)(x) = 18
(5x - 2) (f ÷ h)(x) =
23
(x + 4)(x - 3)
(f ÷ h)(x) =
(x - 3)
(f ÷ h)(x) = x + 4
GENERAL MATHEMATICS
ANSWER KEY

ACTIVITY: FUNCTION COMPOSITION
Find the composite of the given function.

1. Functions of f, g, and h are given by
e. (f ∘ h)(5)
f(x) = x² + x + 6
h(5) = (5) - 3 (f ∘ h)(5) = x² + x + 6
g(x) = x - 2
h(5) = 2 (f ∘ h)(5) = (2)² + (2) + 6
h(x) = x - 3
(f ∘ h)(5) = 4 + 2 + 6
a. (f ∘ h)(x) (f ∘ h)(5) = 12

(f ∘ h)(x) = x² + x + 6
(f ∘ h)(x) = (x - 3)² + (x - 3) + 6 f. (f ∘ g)(4)

(f ∘ h)(x) = x² - 6x + 9 + x - 3 + 6 g(4) = (4) - 2 (f ∘ g)(4) = x² + x + 6

(f ∘ h)(x) = x² - 5x + 12 g(4) = 2 (f ∘ g)(4) = (2)² + (2) + 6
(f ∘ g)(4) = 4 + 2 + 6

b. (f ∘ g)(x) (f ∘ g)(4) = 12
(f ∘ g)(x) = x² + x + 6
(f ∘ g)(x) = (x - 2)² + (x - 2) + 6 g. (g ∘ h)(3)

(f ∘ g)(x) = x² - 4x + 4 + x - 2 + 6 h(3) = (3) - 3 (g ∘ h)(3) = x - 2

(f ∘ g)(x) = x² - 3x + 8 h(3) = 0 (g ∘ h)(3) = (0) - 2
(g ∘ h)(3) = -2

c. (g ∘ h)(x)
(g ∘ h)(x) = x - 2 h. (h ∘ g)(2)

(g ∘ h)(x) = (x - 3) - 2 g(2) = (2) - 2 (h ∘ g)(2) = x - 3

(g ∘ h)(x) = x - 5 g(2) = 0 (h ∘ g)(2) = (0) - 3
(h ∘ g)(2) = -3

d. (h ∘ g)(x)

(g ∘ h)(x) = x - 3
(g ∘ h)(x) = (x - 2) - 3
(g ∘ h)(x) = x - 5
GENERAL MATHEMATICS
ANSWER KEY

ACTIVITY: INVERSE OF FUNCTIONS
Find the inverse of the following functions.

1. {(1,2), (3,4), (5,6), (7,8), (9, 10)} 3. {(1,5), (3,4), (7,6), (8,5), (9, 10)}
{(2,1), (4,3), (6,5), (8,7), (10, 9)} No inverse; not a one-to-one function

2. f(x) = 5x + 3 4. f(x) = ⅔x - 8
y = 5x + 3 y = ⅔x - 3
x = 5y + 3 x = ⅔y - 3
5y = x - 3 (3)x = 3(⅔y - 3)
5 5 3x = 2y - 1
x-3 2y = 3x + 1
y=
5 2 2
x-3 3x + 1
f ¹ (x) = y=
5 2
3x + 1
f ¹ (x) =
2

ACTIVITY: RATIONAL EQUATIONS AND INEQUALITIES
Solve the following rational equations and inequalities.

3x 2 7 1 1 4x+2
— +— = —- 2. —— +—— = ———-
1. 5 3 30 x-1 x+1 x²-1
3x 2 7 1 1 4x + 2
30 ( —— + —) = —— ( 30) (x - 1) (x + 1 )( ——– + ——–) = ———— (x - 1) (x + 1 )
5 3 30 x-1 x-1 x² - 1
6(3x) + 10(2) = 7 (x + 1) + (x + 1) = 4x + 2
18x + 20 = 7 2x + 2 = 4x + 2
18x = 7 - 20 4x - 2x = 2 - 2
18x = -13 2x = 0
18 18 x=0
x = -13 / 18
GENERAL MATHEMATICS
ANSWER KEY

ACTIVITY: RATIONAL EQUATIONS AND INEQUALITIES
Solve the following rational equations and inequalities.

2x
3. ——
x+1
≥1

2x x+1 | | | | | | |
——– - ——— ≥ 0 | -2 -1 0 1 2 3
x+1 x+1
x-1
——– ≥ 0 x < -1 -1 < x < 1 x>1
x+1
x+1 - + +
x-1=0 x+1=0
x-1 - - +
x=1 x ≠ -1
= + - +
{x ∈ ℝ | x < -1 or x ≥ 1}

ACTIVITY: RATIONAL FUNCTION
Given the following function, find horizontal and vertical asymptotes, domain, range,
x-intercept, y-intercept and zeroes.

2x +3 horizontal asymptote: y = 2 x-intercept: (-3/2, 0)
f(x) =
x+2 vertical asymptotes: x = -2 y-intercept: (0, 3/2)
domain: {x | x ≠ -2} zeroes:
range: {y | y ≠ 2}