🎯

ACT SCORE BOOSTER: Master This Topic for 2-3 Extra Points!

🔢 Odd & Even Number Properties

➕➖ Positive & Negative Number Rules

✂️ Divisibility Rules (Essential for ACT)

Solution:

Step 1: Identify what we know

• $$x$$ = odd integer
• $$y$$ = even integer

Step 2: Test each answer choice using odd/even rules

• A) $$x + y$$: Odd + Even = Odd ✓
• B) $$x + x$$: Odd + Odd = Even ✗
• C) $$y + y$$: Even + Even = Even ✗
• D) $$xy$$: Odd × Even = Even ✗
• E) $$x^2 + y$$: (Odd)² + Even = Odd + Even = Odd ✓

Step 3: Determine which MUST be odd

Both A and E are odd, but the question asks which must be odd. Let’s verify:

• Choice A will always be odd (Odd + Even = Odd)
• Choice E will always be odd (Odd² is odd, Odd + Even = Odd)

⏱️ Time estimate: 30-45 seconds

Solution:

Step 1: Identify what we know

• $$a$$ is negative ($$a < 0$$)
• $$b$$ is positive ($$b > 0$$)

Step 2: Test each choice using sign rules

• F) $$a + b$$: Could be positive or negative (depends on magnitudes) ✗
• G) $$ab$$: Negative × Positive = Negative ✓
• H) $$a^2b$$: (Negative)² × Positive = Positive × Positive = Positive ✗
• J) $$\frac{b}{a}$$: Positive ÷ Negative = Negative ✓
• K) $$a – b$$: Negative – Positive = Negative + Negative = Negative ✓

Step 3: Verify with specific numbers

Let $$a = -2$$ and $$b = 3$$:

• G) $$(-2)(3) = -6$$ ✓
• J) $$\frac{3}{-2} = -1.5$$ ✓
• K) $$-2 – 3 = -5$$ ✓

⏱️ Time estimate: 45-60 seconds

Solution:

Step 1: Apply divisibility rule for 3 (sum of digits divisible by 3)

• A) $$2+3+4=9$$ → $$9÷3=3$$ ✓
• B) $$3+1+2=6$$ → $$6÷3=2$$ ✓
• C) $$4+2+6=12$$ → $$12÷3=4$$ ✓
• D) $$5+2+8=15$$ → $$15÷3=5$$ ✓
• E) $$6+3+0=9$$ → $$9÷3=3$$ ✓

Step 2: Apply divisibility rule for 4 (last 2 digits divisible by 4)

• A) Last 2 digits: 34 → $$34÷4=8.5$$ ✗
• B) Last 2 digits: 12 → $$12÷4=3$$ ✓
• C) Last 2 digits: 26 → $$26÷4=6.5$$ ✗
• D) Last 2 digits: 28 → $$28÷4=7$$ ✓
• E) Last 2 digits: 30 → $$30÷4=7.5$$ ✗

Step 3: Find numbers divisible by BOTH

From our analysis:

• B) 312: Divisible by both 3 ✓ and 4 ✓
• D) 528: Divisible by both 3 ✓ and 4 ✓

⏱️ Time estimate: 60-90 seconds

📝

⏱️ Time Allocation Strategy

Number property questions should take 30-60 seconds each. They typically appear in the first 20 questions of the ACT Math section. Here’s how to manage your time:

• Basic odd/even questions: 30-40 seconds
• Positive/negative with variables: 40-50 seconds
• Divisibility rule applications: 45-60 seconds
• Complex combinations: 60-75 seconds

🎲 When to Skip and Return

Skip a number property question if:

• You don’t immediately recognize which property rule applies
• The question involves multiple properties combined (odd/even + positive/negative + divisibility)
• You’ve spent more than 90 seconds without progress
• The question uses unfamiliar terminology or notation

These questions are usually easier than they first appear. Coming back with fresh eyes often makes the solution obvious.

🎯 Strategic Guessing with Number Properties

If you must guess, use these elimination strategies:

✅ Quick Verification Methods

Always verify your answer using one of these methods:

1. Plug in simple numbers: Use 2 and 3 for odd/even, -1 and 1 for positive/negative
2. Test extreme cases: What if the variable is 0? What if it’s very large?
3. Check the opposite: If the answer says “must be even,” verify it can’t be odd
4. Use your calculator: For divisibility, quick division confirms your rule application

🚨 Common ACT Traps to Avoid

📊 Score Impact Analysis

Based on typical ACT Math sections:

• 8-12 questions directly test number properties (13-20% of Math section)
• 15-20 additional questions require number property knowledge indirectly
• Mastering this topic can improve your Math score by 2-3 points
• Each question is worth approximately 0.5-0.7 points on the 36-point scale

❌ Mistake #1: Treating Zero Incorrectly

Wrong thinking: “Zero isn’t even or odd, it’s neutral.”

Correct: Zero IS even because $$0 = 2 \times 0$$. It’s divisible by 2 with no remainder.

❌ Mistake #2: Sign Errors in Multiplication

Wrong: $$(-3) \times (-4) = -12$$

Correct: $$(-3) \times (-4) = +12$$ (negative × negative = positive)

❌ Mistake #3: Confusing Divisibility Rules

Wrong: “If a number is divisible by 6, it must be divisible by 12.”

Correct: Divisibility by 6 means divisible by 2 AND 3, but NOT necessarily by 12. Example: 18 is divisible by 6 but not by 12.

❌ Mistake #4: Forgetting Squared Negatives Become Positive

Wrong: If $$x < 0$$, then $$x^2 < 0$$

Correct: If $$x < 0$$, then $$x^2 > 0$$ (squaring always produces a positive result except when $$x = 0$$)

💻 Computer Science

Odd/even checks determine if numbers should be processed differently. Divisibility rules optimize algorithms for factors and prime numbers.

💰 Finance & Accounting

Positive/negative numbers represent credits/debits. Divisibility helps with splitting payments, calculating interest periods, and budget allocation.

🏗️ Engineering

Divisibility determines if materials can be divided evenly. Positive/negative values represent forces, voltages, and directional quantities.

📊 Data Science

Number properties help identify patterns in datasets. Odd/even analysis reveals alternating trends; divisibility finds periodic cycles.

Is zero considered an even number or an odd number? +

Zero is definitively an even number. By definition, an even number is any integer that can be expressed as $$2n$$ where $$n$$ is an integer. Since $$0 = 2 \times 0$$, zero fits this definition perfectly. Additionally, zero is divisible by 2 with no remainder: $$0 \div 2 = 0$$. This is a common ACT trap question—don’t eliminate answer choices that include zero as an even number!

What’s the fastest way to check if a large number is divisible by 3? +

Add up all the digits. If the sum is divisible by 3, then the original number is divisible by 3. For example, to check if 4,827 is divisible by 3:

$$4 + 8 + 2 + 7 = 21$$

Since $$21 \div 3 = 7$$ (a whole number), 4,827 is divisible by 3. This method works for any size number and is much faster than long division! The same trick works for divisibility by 9.

Why does multiplying two negative numbers give a positive result? +

Think of it this way: a negative sign means “opposite.” When you multiply $$-3 \times -4$$, you’re taking the opposite of $$-3$$, four times. The opposite of $$-3$$ is $$+3$$, so you get $$+3$$ four times, which equals $$+12$$.

Pattern to remember:

• Same signs (both positive or both negative) → Positive result
• Different signs (one positive, one negative) → Negative result

This rule applies to both multiplication AND division!

How often do number property questions appear on the ACT? +

Number property questions appear on every single ACT Math test. You can expect:

• 8-12 direct questions specifically testing odd/even, positive/negative, or divisibility
• 15-20 additional questions where number properties help you solve faster or eliminate wrong answers
• These questions typically appear in the first 30 questions (easier section)

This makes number properties one of the highest-yield topics to master for ACT Math. The time investment to learn these rules pays off significantly!

Can I use my calculator to check divisibility on the ACT? +

Yes, you can! To check if 456 is divisible by 3, simply calculate $$456 \div 3$$ on your calculator. If you get a whole number (152.0), it’s divisible. If you get a decimal (152.333…), it’s not divisible.

However, knowing the divisibility rules is much faster:

• Calculator method: 10-15 seconds (enter number, divide, check result)
• Divisibility rule: 3-5 seconds (add digits: 4+5+6=15, divisible by 3 ✓)

On a timed test, those extra seconds add up! Use the calculator as a backup verification tool, but master the rules for speed.

Educational Content Creator & Competitive Exam Specialist

IrfanEdu.com • United States

Dr. Irfan Mansuri is a distinguished educational content creator and competitive exam specialist with over 15 years of experience spanning high school, undergraduate, and postgraduate levels. As the founder of IrfanEdu.com, he has successfully guided thousands of students through various competitive examinations, helping them achieve exceptional results and gain admission to their dream institutions.

🔢 Fractions & Decimals

Master operations with fractions, decimals, and percentages

📐 Basic Algebra

Solve equations, inequalities, and work with variables

📊 Ratios & Proportions

Understand relationships between quantities and scale