Question 1
Find the missing number: 4, 9 : 5 :: 4, ? : ?
In AP, common difference = 5. Next term after 4 is 9
Arithmetic Progression Analogy: Worksheet 2 - Beginner Practice Arithmetic Progression Analogy BEGINNER
Ready to master Arithmetic Progression Analogy? This entry level practice worksheet (2/10) presents 20 beginner-level challenges. Focus area: pattern recognition. Learn to solve arithmetic progression analogy reasoning questions, handle arithmetic progression analogy practice, and perfect arithmetic progression analogy for competitive exams with our step-by-step solutions.
What you'll learn in this worksheet:
- Understand the logic behind arithmetic progression analogy practice
- Learn step-by-step approaches to pattern recognition
- Practice basic problem types with clear explanations
- Develop systematic problem-solving habits
- Master arithmetic progression analogy reasoning questions through focused practice
Your progress through Arithmetic Progression Analogy
Worksheet 2 of 10 (11% complete)
Question 2
Find the missing number: 5 : sum of 2 terms = 14 :: 4 : sum of 2 terms = ?
Sum of 2 terms of AP: n/2 × (2a + (n-1)d). For 4, sum = 12
Question 3
Find the missing number: 5 : 13 (n=3) :: 2 : ?
The nth term formula: a + (n-1)d. For 2, term 3 = 10
Question 4
Find the missing number: 4 : 10 (n=4) :: 3 : ?
The nth term formula: a + (n-1)d. For 3, term 4 = 9
Question 5
Find the missing number: 3 : sum of 3 terms = 21 :: 4 : sum of 3 terms = ?
Sum of 3 terms of AP: n/2 × (2a + (n-1)d). For 4, sum = 24
Question 6
Find the missing number: 3 : sum of 3 terms = 21 :: 3 : sum of 3 terms = ?
Sum of 3 terms of AP: n/2 × (2a + (n-1)d). For 3, sum = 21
Question 7
Find the missing number: 8 : 12 (n=3) :: 3 : ?
The nth term formula: a + (n-1)d. For 3, term 3 = 7
Question 8
Find the missing number: 2 : 4 (n=2) :: 4 : ?
The nth term formula: a + (n-1)d. For 4, term 2 = 6
Question 9
Find the missing number: 9, 15 : 6 :: 7, ? : ?
In AP, common difference = 6. Next term after 7 is 13
Question 10
Find the missing number: 8, 14 : 6 :: 10, ? : ?
In AP, common difference = 6. Next term after 10 is 16
Question 11
Find the missing number: 5, 10 : 5 :: 6, ? : ?
In AP, common difference = 5. Next term after 6 is 11
Question 12
Find the missing number: 5 : sum of 3 terms = 27 :: 1 : sum of 3 terms = ?
Sum of 3 terms of AP: n/2 × (2a + (n-1)d). For 1, sum = 15
Question 13
Find the missing number: 8 : 20 (n=4) :: 7 : ?
The nth term formula: a + (n-1)d. For 7, term 4 = 19
Question 14
Find the missing number: 2 : 8 (n=3) :: 4 : ?
The nth term formula: a + (n-1)d. For 4, term 3 = 10
Question 15
Find the missing number: 8, 10 : 2 :: 7, ? : ?
In AP, common difference = 2. Next term after 7 is 9
Question 16
Find the missing number: 5 : sum of 2 terms = 12 :: 5 : sum of 2 terms = ?
Sum of 2 terms of AP: n/2 × (2a + (n-1)d). For 5, sum = 12
Question 17
Find the missing number: 2 : sum of 2 terms = 8 :: 1 : sum of 2 terms = ?
Sum of 2 terms of AP: n/2 × (2a + (n-1)d). For 1, sum = 6
Question 18
Find the missing number: 8 : 14 (n=3) :: 7 : ?
The nth term formula: a + (n-1)d. For 7, term 3 = 13
Question 19
Find the missing number: 5 : sum of 3 terms = 24 :: 1 : sum of 3 terms = ?
Sum of 3 terms of AP: n/2 × (2a + (n-1)d). For 1, sum = 12
Question 20
Find the missing number: 4 : 8 (n=2) :: 4 : ?
The nth term formula: a + (n-1)d. For 4, term 2 = 8
📝 Continue your Arithmetic Progression Analogy practice. Worksheet 2 focuses on pattern recognition.