CEUET Mathematics — Arithmetic — Multiples, Factors, PEMDAS, Fractions & DecimalsSummary
For anyone preparing for the CEUET 2026, Arithmetic — Multiples, Factors, PEMDAS, Fractions & Decimals is a must-know chapter in Mathematics. Centro Escolar University tests this area consistently — expect a meaningful fraction of the Mathematics subtest to come from Arithmetic — Multiples, Factors, PEMDAS, Fractions & Decimals. This page summarises the big ideas, the terms you should know cold, and the patterns CEUET uses in its Arithmetic — Multiples, Factors, PEMDAS, Fractions & Decimals questions.
Exam context
On the CEUET 2026, the Mathematics subtest carries a "Core" weight in Centro Escolar University's pattern. Arithmetic — Multiples, Factors, PEMDAS, Fractions & Decimals lands at position 1st out of 9 in the standard review order. Target score is Competitive overall score, and roughly a meaningful share of items come from Mathematics on a typical CEUET paper.
Arithmetic — Multiples, Factors, PEMDAS, Fractions & Decimals - Summary
Arithmetic forms the foundation of all mathematical understanding and is crucial for success in UPCAT and other entrance exams. This chapter covers essential number concepts including multiples and factors, order of operations (PEMDAS), and working with fractions and decimals. These skills are not just academic—they're used daily in calculating grades, managing money, cooking measurements, and solving real-world problems. Mastering these concepts will give you the confidence to tackle more advanced mathematical topics.
Key Concepts
A multiple of a number n is any number that can be divided by n without remainder (like 15, 20, 25 are multiples of 5). A factor of a number n is any number that divides n without remainder (like 1, 2, 3, 6 are factors of 6). Key insight: if m is a factor of n, then n is a multiple of m. Example: Since 4 is a factor of 12, then 12 is a multiple of 4.
Concept
Multiples and Factors
Importance
Understanding multiples and factors is essential for solving problems involving LCM, GCF, simplifying fractions, and finding patterns in number sequences—all common in entrance exams.
A prime number has exactly two factors: 1 and itself (like 2, 3, 5, 7, 11). A composite number has more than two factors (like 4, 6, 8, 9). To test if a large number n is prime: check if any prime number up to √n divides it. Example: To test 431, check primes up to √431 ≈ 21, so test 2, 3, 5, 7, 11, 13, 17, 19. Since none divide 431, it's prime.
Concept
Prime and Composite Numbers
Importance
Prime factorization is the foundation for finding LCM and GCF, simplifying fractions, and solving various algebraic problems in entrance exams.
LCM is the smallest number divisible by both given numbers. GCF is the largest number that divides both given numbers. Method 1: List multiples/factors until you find common ones. Method 2: Use prime factorization—for LCM, take highest power of each prime; for GCF, take lowest power of common primes. Example: For 24 = 2³×3 and 30 = 2×3×5, LCM = 2³×3×5 = 120, GCF = 2×3 = 6.
Concept
Least Common Multiple (LCM) and Greatest Common Factor (GCF)
Importance
LCM and GCF are essential for adding fractions, solving ratio problems, and scheduling problems commonly found in entrance exams and real-life applications.
Quick tests to check if one number divides another: Divisible by 2 if even; by 3 if digit sum is divisible by 3; by 4 if last two digits form a number divisible by 4; by 5 if ends in 0 or 5; by 6 if divisible by both 2 and 3; by 8 if last three digits form a number divisible by 8; by 9 if digit sum is divisible by 9; by 10 if ends in 0.
Concept
Divisibility Rules
Importance
Divisibility rules allow quick mental calculations without long division, saving valuable time during timed exams and making factor-finding much faster.
PEMDAS stands for Parentheses, Exponents, Multiplication/Division (left to right), Addition/Subtraction (left to right). Always follow this order to get correct results. Example: 2 + 3 × 4² = 2 + 3 × 16 = 2 + 48 = 50 (not 400!). Common mistake: doing operations from left to right instead of following PEMDAS order.
Concept
Order of Operations (PEMDAS)
Importance
Proper order of operations is crucial for solving complex expressions correctly and avoiding careless errors that can cost points in entrance exams.
Fractions represent parts of a whole (numerator/denominator). Decimals are another way to express fractions using place value. Converting: divide numerator by denominator for decimal; use place value for fraction (0.75 = 75/100 = 3/4). Operations: find common denominators for addition/subtraction; multiply straight across; divide by multiplying by reciprocal.
Concept
Fractions and Decimals
Importance
Fraction and decimal operations are fundamental for algebra, geometry, statistics, and real-world applications like calculating percentages, measurements, and financial problems.
Key properties include Commutative (order doesn't matter: a+b = b+a), Associative (grouping doesn't matter: (a+b)+c = a+(b+c)), Distributive (a(b+c) = ab+ac), Identity (adding 0 or multiplying by 1 doesn't change the number), and Inverse (every number has an opposite for addition and reciprocal for multiplication).
Concept
Properties of Real Numbers
Importance
These properties allow for flexible problem-solving strategies and are essential for algebraic manipulation and equation solving in higher mathematics.
Important Points
- The number 1 is neither prime nor composite—it's a special case that students often forget
- When finding LCM and GCF, remember: LCM × GCF = Product of the two numbers
- If one number is a factor of another, the smaller is the GCF and the larger is the LCM
- Two numbers are relatively prime if their GCF is 1 (they share no common factors except 1)
- In PEMDAS, multiplication and division have equal priority (work left to right), same with addition and subtraction
- When converting fractions to decimals, look for patterns—some create repeating decimals
- Always simplify fractions to lowest terms by dividing by the GCF of numerator and denominator
- Prime factorization is unique for every number—there's only one way to express any number as a product of primes
- For divisibility by 6, a number must be divisible by BOTH 2 AND 3 (not just one or the other)
- Zero divided by any non-zero number equals zero, but division by zero is undefined
Chapter Objectives
- Identify and calculate multiples and factors of integers using various methods
- Apply divisibility rules to quickly determine if one number divides another
- Find the Least Common Multiple (LCM) and Greatest Common Factor (GCF) of numbers
- Distinguish between prime and composite numbers using systematic testing
- Apply the order of operations (PEMDAS) correctly in complex expressions
- Convert between fractions and decimals accurately
- Perform operations with fractions and decimals confidently
- Solve word problems involving arithmetic concepts commonly found in entrance exams
Concept Relationships
- Prime numbers are the building blocks for finding factors, multiples, LCM, and GCF through prime factorization
- Divisibility rules connect to factors—if a number is divisible by another, that number is a factor
- LCM and GCF are inversely related—as one increases, the other typically decreases for the same pair of numbers
- Fraction operations rely heavily on finding LCM (for common denominators) and GCF (for simplifying)
- PEMDAS ensures consistent results when expressions involve multiple fraction and decimal operations
- The properties of real numbers provide the logical foundation for all arithmetic operations and algebraic manipulations
- Understanding multiples helps in recognizing patterns in decimal representations of fractions
- Prime factorization serves as a universal tool connecting all major arithmetic concepts in this chapter
Practical Applications
- Calculating GPA: Finding weighted averages using fraction and decimal operations
- Budget planning: Using percentages and decimals to track expenses and savings
- Recipe scaling: Applying fraction operations to adjust ingredient quantities
- Time management: Using LCM to find when recurring events coincide (like class schedules)
- Shopping comparisons: Converting between fractions and decimals to compare prices and discounts
- Construction and crafts: Using measurements involving fractions and mixed numbers
- Statistics interpretation: Understanding decimal representations of survey results and probabilities
- Computer science: Binary and hexadecimal number systems build on base-10 arithmetic concepts
- Music theory: Fraction relationships in rhythm and harmony
- Scientific calculations: Proper order of operations in formulas and measurements
In summary
Mastering arithmetic concepts is like building a strong foundation for a house—everything else in mathematics depends on these fundamental skills. The concepts of multiples, factors, prime numbers, LCM, and GCF work together to help you understand number relationships. PEMDAS ensures you calculate expressions correctly every time. Fractions and decimals allow you to work with parts of wholes precisely. These aren't just abstract concepts—they're practical tools you'll use in daily life and advanced mathematics. Regular practice with these concepts will build your confidence and speed, essential qualities for success in UPCAT and other entrance examinations. Remember, arithmetic is not about memorizing rules but understanding patterns and relationships that make numbers meaningful and manageable.
Next steps
Now that you understand these fundamental arithmetic concepts, you're ready to apply them in more complex scenarios. Practice identifying when to use each concept in multi-step problems. Work on speed and accuracy with mental calculations using divisibility rules and estimation with decimals. Begin exploring how these concepts connect to algebra, where you'll use factoring, LCM, and GCF with variables. Start practicing with mixed problems that combine multiple concepts from this chapter. Most importantly, seek out word problems that require you to identify which arithmetic concepts to apply—this skill is crucial for entrance exam success. Consider reviewing percentage problems next, as they build directly on your fraction and decimal knowledge.
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