Question 1
Find the missing number: 2 : 8 (n=4) :: 8 : ?
The nth term formula: a + (n-1)d. For 8, term 4 = 14
Arithmetic Progression Analogy - Absolute-Beginner Level: core concept mastery Arithmetic Progression Analogy ABSOLUTE BEGINNER
This skill primer 🌟 worksheet focuses on Arithmetic Progression Analogy - a key topic in Number Analogy. You'll solve 20 absolute-beginner-level problems (Worksheet 1 of 10). The primary focus is on core concept mastery. Master arithmetic progression analogy problems, arithmetic progression analogy reasoning questions, and arithmetic progression analogy practice through systematic practice.
What you'll learn in this worksheet:
- Master arithmetic progression analogy problems through focused practice
- Understand the logic behind arithmetic progression analogy reasoning questions
- Learn step-by-step approaches to core concept mastery
- Start with the absolute basics - no prior knowledge needed
- Learn fundamental concepts with simple examples
Your progress through Arithmetic Progression Analogy
Worksheet 1 of 10 (0% complete)
Question 2
Find the missing number: 8, 12 : 4 :: 4, ? : ?
In AP, common difference = 4. Next term after 4 is 8
Question 3
Find the missing number: 3, 6 : 3 :: 8, ? : ?
In AP, common difference = 3. Next term after 8 is 11
Question 4
Find the missing number: 3, 8 : 5 :: 2, ? : ?
In AP, common difference = 5. Next term after 2 is 7
Question 5
Find the missing number: 9, 14 : 5 :: 8, ? : ?
In AP, common difference = 5. Next term after 8 is 13
Question 6
Find the missing number: 2 : sum of 3 terms = 12 :: 1 : sum of 3 terms = ?
Sum of 3 terms of AP: n/2 × (2a + (n-1)d). For 1, sum = 9
Question 7
Find the missing number: 2 : sum of 3 terms = 15 :: 5 : sum of 3 terms = ?
Sum of 3 terms of AP: n/2 × (2a + (n-1)d). For 5, sum = 24
Question 8
Find the missing number: 1 : sum of 2 terms = 5 :: 5 : sum of 2 terms = ?
Sum of 2 terms of AP: n/2 × (2a + (n-1)d). For 5, sum = 13
Question 9
Find the missing number: 3, 7 : 4 :: 9, ? : ?
In AP, common difference = 4. Next term after 9 is 13
Question 10
Find the missing number: 1 : sum of 2 terms = 4 :: 3 : sum of 2 terms = ?
Sum of 2 terms of AP: n/2 × (2a + (n-1)d). For 3, sum = 8
Question 11
Find the missing number: 7 : 13 (n=4) :: 4 : ?
The nth term formula: a + (n-1)d. For 4, term 4 = 10
Question 12
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 13
Find the missing number: 1 : sum of 3 terms = 15 :: 2 : sum of 3 terms = ?
Sum of 3 terms of AP: n/2 × (2a + (n-1)d). For 2, sum = 18
Question 14
Find the missing number: 5 : sum of 2 terms = 14 :: 2 : sum of 2 terms = ?
Sum of 2 terms of AP: n/2 × (2a + (n-1)d). For 2, sum = 8
Question 15
Find the missing number: 4 : 10 (n=3) :: 4 : ?
The nth term formula: a + (n-1)d. For 4, term 3 = 10
Question 16
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 17
Find the missing number: 5 : 10 (n=2) :: 7 : ?
The nth term formula: a + (n-1)d. For 7, term 2 = 12
Question 18
Find the missing number: 4 : sum of 3 terms = 18 :: 5 : sum of 3 terms = ?
Sum of 3 terms of AP: n/2 × (2a + (n-1)d). For 5, sum = 21
Question 19
Find the missing number: 5 : 13 (n=3) :: 5 : ?
The nth term formula: a + (n-1)d. For 5, term 3 = 13
Question 20
Find the missing number: 5, 7 : 2 :: 8, ? : ?
In AP, common difference = 2. Next term after 8 is 10
🌟 Start your Arithmetic Progression Analogy journey here! Build strong foundations with this beginner worksheet.