BC Math 10 - Hun Kim Tutorials

Here you will find a concise collection of math practice problems aligned with the BC Math 10 curriculum. Visit this page directly at hunkim.com/10

BC Math 10 Youtube Playlist

Click here for a concise playlist on BC Math 10 practice problems. Each math video is about 5 minutes long and can be used as lesson examples or for reviewing the course. Subscribe to the channel if you find these videos useful.

BC Math 10 Course Topics

Topic 1: Prime Factorization
Topic 2: Algebra Review
Topic 3: Operations on Powers
Topic 4: Multiplying Polynomials
Topic 5: Polynomial Factoring
Topic 6: Primary Trigonometric Ratios
Topic 7: Linear Functions
Topic 8: Arithmetic Sequences (and series)
Topic 9: Functions and Relations
Topic 10: Systems of Linear Equations
Topic 11: Types of Income
Final Exam Review
- Core final review video playlist
- Course review video playlist

BC Math 10 Topic 1: Prime Factorization

Understanding prime factorization trees will help you understand the math topic “entire vs. mixed radicals.” Finding the LCM of two or more numbers will help you add and subtract fractions. Identifying the GCF is the first step in factoring.

Expressing prime factorization of a number using powers
Identifying the factors of a number
Includes greatest common factor (GCF) and least common multiple (LCM)
Strategies include using factor trees and factor pairs

Enrichment: List the first four prime numbers
Solution
$2, 3, 5, 7$
Find the prime factorization of 27000
Solution
$2^3\times 3^3\times 5^3$
What are the factors of 12?
Solution
$1, 2, 3, 4, 6, 12$
What are the prime factors of 24?
Solution
$2, 3$
Find the GCF and LCM of:
1. 10 and 15
  Solution
  GCF 5, LCM 20
2. 8, 12, and 20
  Solution
  GCF 4, LCM 120
3. 6, 20, and 30
  Solution
  GCF 2, LCM 60
Your turn: Find the GCF and LCM of:
$15ab^2, 10a^3b^5, 25a^2b^7$
Solution
GCF $5ab^2$ , LCM $150a^3b^7$
Challenge: Why do perfect squares have an odd number of factors?
Solution
The factors are 1, 2, 3, 4, 6, 9, 12, 18, and 36. Here, there is an odd number of factors because the square root of the perfect square (in this case 6) does not have a pair.

BC Math 10 Topic 2: Algebra Review

Although algebra is not an explicit requirement of the BC Math 10 curriculum, this topic is included because it is an essential part of solving math problems.

Simplify $2x-5x$
Solution
$-3x$
$\frac{1}{2}x+\frac{x}{3}-x$
Solution
$-\frac{x}{6}$
Solve $2x-1=x+3$
Solution
$4$
$\frac{x}{2}+3=3x-\frac{1}{3}$
Solution
$x=4/3$
$\frac{x}{5}=\frac{2}{3}$
Solution
$x=10/3$
$5=\frac{x}{3}$
Solution
$x=15$
$-2=\frac{5}{k}$
Solution
$k=-5/2$
$\frac{4}{5}=\frac{3}{2x-1}$
Solution
$x=19/8$
$2(x-5)=3(x+2)$
Solution
$x=-16$
$\frac{2}{3}(1-2x)=-\frac{3x+5}{2}$
Solution
$x=-19$
$\frac{1-\frac{2}{3}}{\frac{1}{2}+\frac{3}{4}}=1\div\frac{1}{x}$
Solution
$4/15$

BC Math 10 Topic 3: Operations on Powers

Last year you learned about exponent laws with whole-number exponents. This year, in BC Math 10, you will learn about negative exponents. Next year, you will learn about fractional exponents.

Positive and negative exponents
Exponent laws
Evaluation using order of operations
Numerical and variable bases

Evaluate:
1. $2^3$
  Solution
  $8$
2. $(-5)^3$
  Solution
  $-125$
3. $-3^2$
  Solution
  $-9$
Evaluate:
1. $(-1)^{100}$
  Solution
  $1$
2. $(-1)^{123}$
  Solution
  $-1$
3. $-1^{666}$
  Solution
  $-1$
Evaluate:
1. $-2(-2)^2$
  Solution
  $-8$
2. $-2^2-(-2)^2$
  Solution
  $-8$
Evaluate:
1. $0^1$
  Solution
  $0$
2. $1^0$
  Solution
  $1$
3. $\pi^0$
  Solution
  $1$
4. $0^0$
  Solution
  Undefined
Evaluate:
1. $\left(\frac{2}{3}\right)^2$
  Solution
  $4/9$
2. $2^{-3}$
  Solution
  $1/8$
3. $\left(\frac{3}{2}\right)^{-2}$
  Solution
  $4/9$
Evaluate:
1. $-2(-2)^{-2}$
  Solution
  $-1/2$
2. $4(-2)^{-3}\div\frac{1}{2^{-2}}$
  Solution
  $-1/8$
Simplify:
1. $a(2a^3\times 3a^2)$
  Solution
  $6a^6$
2. $\frac{x(x^2)(x^5)}{x^4}$
  Solution
  $x^4$
3. $(2x^3y^2)^3$
  Solution
  $8x^9y^6$
Simplify:
1. $\left(\frac{4x^5}{2x^3}\right)^3$
  Solution
  $8x^6$
2. $\left(\frac{3a}{9a^{-2}}\right)^2$
  Solution
  $\frac{a^6}{9}$
3. $\left(\frac{5x^2yz^3}{25x^{-1}yz^3}\right)^{-3}$
  Solution
  $\frac{125y^6}{x^9z^9}$

BC Math 10 Topic D: Multiplying Polynomials

Expanding polynomials is a BC Math 10 topic that is the opposite process of factoring. Multiplying polynomials and gathering like terms reliably is an important math skill. Visit this section directly at hunkim.com/10d

$-3x(x-1)$
Solution
$-3x^2+3x$
Your turn: $-5x(x-5)$
Solution
$-5x^2+25x$
$2x^2(2-3x+4x^2)$
Solution
$8x^4-6x^3+4x^2$
Your turn: $3x^2(1-2x+7x^2)$
Solution
$21x^4-6x^3+3x^2$
$(x-3)(x-5)$
Solution
$x^2-8x+15$
Your turn: $(x+2)(x-7)$
Solution
$x^2-5x-14$
$(3x-2)(x-3)$
Solution
$3x^2-11x+6$
Your turn: $(2x-1)(x+4)$
Solution
$2x^2+7x-4$
$(2x-7)^2$
Solution
$4x^2-28x+49$
Your turn: $(11x-5)^2$
Solution
$121x^2-110x+25$
$-3(5-2x)^2$
Solution
$-12x^2+60x-75$
Your turn: $-2(3x-1)^2$
Solution
$-18x^2+12x-2$
$2(3x-1)(x-2)$
Solution
$6x^2-14x+4$
Your turn: $-3(x+1)(2x-5)$
Solution
$-6x^2+9x+15$
$(x+2)(-2)(x-4)$
Solution
$-2x^2+4x+16$
Your turn: $(2x-1)(-3)(x+1)$
Solution
$-6x^2-3x+3$
$(x-1)(x^2+x+1)$
Solution
$x^3-1$
Your turn: $(a+b)(a^2-ab+b^2)$
Solution
$a^3+b^3$
$(x^2+x+1)(1-x-x^2)$
Solution
$-x^4-2x^3-x^2+1$
Your turn: $(a^2+a-1)(a^2-a+1)$
Solution
$a^4-a^2+2a-1$
Expand $(x-2)^2(x+1)^2$
Solution
$x^4-2x^3-3x^2+4x+4$
Your turn: Expand $(2x-1)^2(3x+1)^2$
Solution
$36x^4-12x^3-11x^2+2x+1$
$(3x-3y)^3$
Solution
$27x^3-81x^2y+81xy^2-27y^3$
Your turn: $(2y+3z)^3$
Solution
$8y^3+36y^2z+54yz^2+27z^3$
$(2x-1)^4$
Solution
$16x^4-32x^3+24x^2-8x+1$
Your turn: $(3a+1)^4$
Solution
$81a^4+108a^3+54a^2+12a+1$
Represent the product of the following factors using algebra tiles: $(2x-1)(x+2)$
Your turn: Represent the product of the following factors using algebra tiles: $(3x+2)(x-1)$
The length of an edge of a cube is $x-1$ . Find the area of the cube.
Solution
$6x^2-12x+6$ units squared
Your turn: Find the surface area of the top of the box only in the form $ax^2+bx+c$

Solution
$x^2+3x+2$ units squared
Find the area of the shaded region below:

Solution
$2x^2+14x+30$ units squared
Your turn: Find the area of the shaded region below:

Solution
$10x^2+9x-10$ units squared
Find the area of the shaded region below:

Solution
$36x^2-9\pi x$ units squared
Your turn: Find the area of the shaded region below:

Solution
$28x^2-32\pi x^2$ units squared
The diameter of a circle is 2x+4
1. Area in expanded form?
  Solution
  $\pi x^2+4\pi x+4\pi$ units squared
2. Circumference?
  Solution
  $2\pi x+4\pi$
Your turn: The diameter of a circle is 6x+12
1. Area in expanded form?
  Solution
  $9\pi x^2+36\pi x+36\pi$ units squared
2. Circumference?
  Solution
  $6 \pi x+12\pi$
See cylinder below:
1. Volume in expanded form?
  Solution
  $\pi x^3+\pi x^2$ units cubed
2. Total surface area including the bottom (in expanded form)?
  Solution
  $4\pi x^2+2\pi x$ units squared
Your turn:
1. Volume?
  Solution
  $400 \pi x^2$ units cubed
2. Area?
  Solution
  $8\pi x^2+400\pi x$ units squared
Challenge: Find the area of the shaded region

Solution
$3-\frac{9\pi}{16}$ units squared

BC Math 10 Topic E: Polynomial Factoring

Learning how to factor is the first step in learning about quadratic functions. Try to master factoring in this BC Math 10 course because you will continue to factor in future grades. Visit this section directly at hunkim.com/10e

Greatest common factor of a polynomial
Simpler cases involving trinomials $y=x^2+bx+c$ and difference of squares

Factor fully:

$15x^5-10x^7$
Solution
$5x^5(3-2x^2)$
Your turn: $30x^3-20x^2$
Solution
$10x^2(3x-2)$
$x^2-25$
Solution
$(x+5)(x-5)$
Your turn: $t^2-9$
Solution
$(t+3)(t-3)$
$9a^2-25$
Solution
$(3a+5)(3a-5)$
Your turn: $100p^2-49$
Solution
$(10p+7)(10p-7)$
$25a^6-y^2 z^{10}$
Solution
$(5a^3+yz^5)(5a^3-yz^5)$
Your turn: $49a^4b^6-9z^8$
Solution
$(7a^2b^3+3z^4)(7a^2b^3-3z^4)$
$a^2+9$
Solution
Cannot factor or $(a+3i)(a-3i)$
Your turn: $x^2+4$
Solution
Cannot factor
$5x^2-45$
Solution
$5(x+3)(x-3)$
Your turn: $3a^2-12$
Solution
$3(a+2)(a-2)$
$x^2-8x+15$
Solution
$(x-3)(x-5)$
Your turn: $x^2+2x-24$
Solution
$(x+6)(x-4)$
$x^2-6x-72$
Solution
$(x+6)(x-12)$
Your turn: $x^2+4x-96$
Solution
$(x-8)(x+12)$
$3x^2-12x+12$
Solution
$3(x-2)^2$
Your turn: $2x^2+12x+18$
Solution
$2(x+3)^2$
$2x^2+7x-4$
Solution
$(2x-1)(x+4)$
Your turn: $5x^2-32x+12$
Solution
$(5x-2)(x-6)$
$4x^2-35x+24$
Solution
$(4x-3)(x-8)$
Your turn: $6x^2+31x-30$
Solution
$(6x-5)(x+6)$
$30x^2+52x-48$
Solution
$2(3x-2)(5x+12)$
Your turn: $36x^2+194x-22$
Solution
$2(9x-1)(2x+11)$
$-9(x+1)+x^2(x+1)$
Solution
$(x+1)(x+3)(x-3)$
Your turn: $a^2(x-2)-4(x-2)$
Solution
$(x-2)(a+2)(a-2)$
$a^2(3x-1)+9(1-3x)$
Solution
$(3x-1)(a+3)(a-3)$
Your turn: $w^2(2w-7)+25(7-2w)$
Solution
$(2w-7)(w+5)(w-5)$
$5x^3-10x^2+3x-6$
Solution
$(x-2)(5x^2+3)$
Your turn: $3x^3+3x^2+4x+4$
Solution
$(x+1)(3x^2+4)$
$112ab-16a+128a^2-14b$
Solution
$2(8a-1)(7b+8a)$
Your turn: $60x^2+36xy-45x-27y$
Solution
$3(4x-3)(5x+3y)$
$-4x^4y+12x^3+x^2y-3x$
Solution
$x(2x+1)(2x-1)(3-xy)$
Your turn: $-9a^4b+9a^3+4a^2b-4a$
Solution
$a(3a-2)(3a+2)(1-ab)$
Challenge:
1. What is the area of the shaded region below in fully factored form?
  
  Solution
  $4\pi (x+1)$ units squared
2. Factor $2(\sin\theta)^2-5\sin\theta-3$
  Solution
  $(2\sin\theta+1)(\sin\theta-3)$
3. Factor $e^{2x}-25$ ( $e\approx 2.718$ is a special constant)
  Solution
  $(e^x+5)(e^x-5)$
4. $x^2+kx+8$ . Find the possible values of $k$ such that this trinomial can be factored.
  Solution
  $\pm 9, \pm 6$
5. Factor $x^3+1$
  Solution
  $(x+1)(x^2-x+1)$
6. Factor $8a^6-b^3$
  Solution
  $(2a^2-b)(4a^4+2a^2b+b^2)$
7. Factor $x^3-3x^2+4$
  Solution
  $(x-2)^2(x+1)$
8. Factor $x^n-y^n$
  Solution
  When $n$ is odd, notice that $x-y$ is a factor and the counting down and up pattern with the exponents. Ex. $x^7-y^7=(x-y)(x^6+x^5y+x^4y^2+x^3y^3+x^2y^4+xy^5+y^6)$

BC Math 10 Topic F:
Primary Trigonometric Ratios

Visit this page directly at hunkim.com/10f

Sine, cosine, and tangent ratios
Right-triangle problems: determining missing sides and/or angles using trigonometric ratios and the Pythagorean theorem
Contexts involving direct and indirect measurement

Explain the acronym SOH CAH TOA

BC Math 10 Topic G: Linear Functions

Visit the page directly at hunkim.com/10g

Slope: positive, negative, zero, and undefined
Types of equations and lines (point-slope, slope-intercept, and general)
Equations of parallel and perpendicular lines
Equations of horizontal and vertical lines
Connections between representations: graphs, tables, equations

Slope = $\frac{\text{rise}}{\text{?}}=\frac{y_2-y_1}{?}$

BC Math 10 Topic H: Arithmetic Sequences (and Series)

Visit this page directly at hunkim.com/10h

Applying formal language (common difference, first term, general term) to increasing and decreasing linear patterns
Connecting to linear relations
Extension: exploring arithmetic series

2, 5, 8, 11, ...
Video
1. Find the 100th number using your knowledge of lines
  Solution
  $299$
2. Find the common difference $d$
  Solution
  $3$
3. Find $t_1$
  Solution
  $2$
4. Find the 100th number using the arithmetic sequence formula: $t_n=t_1+(n-1)d$
  Solution
  $299$
Explain why the arithmetic sequence formula used above works
Solution
The value of an unknown term is based on the initial term $t_1$ . We repeatedly add or subtract the common difference $d$ , $(n-1)$ times.
$\frac{1}{2}$ and $\frac{3}{5}$ are the first two terms of an arithmetic sequence. Find the 4th term.

BC Math 10 Topic 9: Functions and Relations

Communicating domain and range in both situational and non-situational contexts
Connecting graphs and context
Understanding the meaning of a function
Identifying whether a relation is a function
Using function notation
Connecting data, graphs, and situations

Domain and range?
1. $f(x)=3x+2$
  Solution
  Domain: $x\in\mathbb{R}$
  Range: $y\in\mathbb{R}$
2. $f(x)=5$
  Solution
  Domain: $x\in\mathbb{R}$
  Range: $y=5$
3. $x=3$
  Solution
  Domain: $x=3$
  Range: $y\in\mathbb{R}$
f(x)=2x+3, x\geq 1
1. Domain?
  Solution
  $x\geq 1$ or $[1,\infty)$
2. Range?
  Solution
  $y\geq 5$ or $[5,\infty)$
3. Graph this ray on Desmos using curly brace notation: $y=2x+3\{x\geq 1\}$
  Solution
4. Evaluate $f(2)$
  Solution
  $7$
Write in interval notation and as a number line:
1. $y<3$
2. $2\leq x<4$
Is the following graph a function?
1. See below:
2. See below:
3. See below:
4. See below:
5. See below:
6. See below:
7. See below:
8. See below:
Evaluate f(-3) given:
1. $f(x)=x^2$
2. $f(x)=x^2-2x$
3. Challenge: $f(x)=3x^3-\frac{2^x}{5x}$
Money is a function of time (hours): M(t)=50t+100
1. How much does this plumber charge for just “showing up”?
2. How much does this plumber charge for working 8 hours?
3. How long does this plumber need to work to earn $400?
4. In the context of this question, what is the domain?
5. A different plumber’s earning is modelled by $E(t)=70t$ . This plumber does not charge a fee for showing up. When does $E(t)$ surpass $M(t)$ ?
V(t)=100-20t models the volume of gas (L) as a function of time.
1. Sketch this function and label the axes.
2. What is the meaning of the intercepts?
3. What is the meaning of the slope of this function?
Challenge: See f(x) below:
1. Domain?
2. Range?
Challenge: Given $f(x)=x^2$ , simplify $\frac{f(x+h)-f(x)}{(x+h)-x}$

BC Math 10 Topic J:
Systems of Linear Equations

Visit this page directly at hunkim.com/10j

Solving graphically
Solving algebraically by inspection, substitution, elimination
Connecting ordered pair with meaning of an algebraic solution
Solving problems in situational contexts

$x+2y=13$ and $3x-y=-11$
Is $(-1,7)$ a point of intersection?
Solution
No
$2x-4=4y$ and $x+y=11$
Is $(8,3)$ a point of intersection?
Solution
Yes
x+y=2 and y=3
1. Solve by graphing

BC Math 10 Topic K: Types of Income

Visit this page directly at hunkim.com/10k

Types of income
Income tax and other deductions

What’s the difference between being paid a salary vs. by hourly wage?
Solution
Salary: paid a fixed amount in a year (regardless of “overtime” work). Hourly wage: paid per hour of work
You work 8 hours a day, 5 days a week, and make $20 per hour.
1. How much will your gross pay be this month (assume 4 weeks)?
  Solution
  $3200
2. Now assume your work 10 hours a day. In BC you are paid 1.5 times your pay if your work beyond 8 hours. How much will your gross pay be this month? Assume that there are 4 weeks in a month.
  Solution
  $4400
Your net income is less than your gross income because of which of the following?
- Income Tax (paid to the government at both the Federal and Provincial levels)
- Canada Pension Plan (CPP)
- Employment Insurance (EI)
- All of the above
  Solution
  All of the above
In BC, what percentage of your net income is being deducted if your annual income is:
1. $40,000
  Solution
  25%
2. $80,000
  Solution
  27.5%
3. $160,000
  Solution
  32.6%
If you rent out your basement suite, can you deduct a portion of your utility bills to reduce your taxes?
Solution
Yes
As a car salesperson how much would you have to sell to match (and possibly surpass) a $60,000 annual salary if you earn $20,000 plus 5% on the sale of each car you sell?
Solution
$800 000
As a realtor, suppose you earn 3% of the value of each home you sell.
1. Approximately how many homes do you need to sell each year to gross $100,000 each year?
  Solution
  $3.\bar{3}$ million in sales. About 3 one million dollar homes
2. When can a realtor expect more customers? At the beginning or end of their career?
  Solution
  At the end
Suppose you are a police officer or nurse working a 12-hour shift. You are needed to do a double shift and work for 24 hours. In BC you are paid double time (twice the regular hourly wage) if you work beyond 12 hours. Suppose you are paid $40 per hour. How much do you gross for working 24 hours straight?
Solution
$1440
True or False:
1. If you show up for work as scheduled but are sent home because you are no longer needed you must be paid a for a minimum number of hours of work.
  Solution
  True
2. In BC you must have a minimum of 8 hours of rest between shifts.
  Solution
  True
3. Whether you’re 9 or 90, age has no effect on your requirement to file a tax return.
  Solution
  True
4. Keeping your receipts is important because tax payers can receive a number of tax refunds after filing their annual taxes.
  Solution
  True
There are 3 types of income. Define:
1. Active income
  Solution
  You actively work to earn money
2. Passive income
  Solution
  You earn money with little to no effort for it to keep coming
3. Portfolio income
  Solution
  Money that comes from interest on your investments
Explain the following types of Youtube income revenue streams:
Video link: https://www.youtube.com/watch?v=0DnKKn2IG2k
1. Adsense
  Solution
  Advertisements on your Youtube videos or website
2. Product sales / merchandise

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