Question 1
One person's age is 2 times another. If sum of ages is 33, what are their ages?
Let x: base, 2x: second. x + 2x = 33 → x = 11, 2x = 22
Geometric Age Product Beginner-Intermediate Worksheet: Focus on common variations practice Geometric Age Product BEGINNER INTERMEDIATE
Level up your Geometric Age Product skills! You're at Worksheet 4 of 10 (33% through this series). This step-up challenge worksheet features 20 beginner-intermediate-level problems with a focus on common variations practice. Topics covered: geometric age product for competitive exams, how to solve geometric age product, geometric age product tricks.
What you'll learn in this worksheet:
- Understand the logic behind how to solve geometric age product
- Learn step-by-step approaches to common variations practice
- Bridge the gap between basic and advanced concepts
- Handle problems with increasing complexity
- Master geometric age product for competitive exams through focused practice
Your progress through Geometric Age Product
Worksheet 4 of 10 (33% complete)
Question 2
One person's age is 2 times another. If sum of ages is 27, what are their ages?
Let x: base, 2x: second. x + 2x = 27 → x = 9, 2x = 18
Question 3
One person's age is 3 times another. If sum of ages is 52, what are their ages?
Let x: base, 3x: second. x + 3x = 52 → x = 13, 3x = 39
Question 4
One person's age is 3 times another. If sum of ages is 52, what are their ages?
Let x: base, 3x: second. x + 3x = 52 → x = 13, 3x = 39
Question 5
One person's age is 3 times another. If sum of ages is 32, what are their ages?
Let x: base, 3x: second. x + 3x = 32 → x = 8, 3x = 24
Question 6
One person's age is 2 times another. If sum of ages is 24, what are their ages?
Let x: base, 2x: second. x + 2x = 24 → x = 8, 2x = 16
Question 7
One person's age is 2 times another. If sum of ages is 54, what are their ages?
Let x: base, 2x: second. x + 2x = 54 → x = 18, 2x = 36
Question 8
One person's age is 2 times another. If sum of ages is 39, what are their ages?
Let x: base, 2x: second. x + 2x = 39 → x = 13, 2x = 26
Question 9
One person's age is 2 times another. If sum of ages is 54, what are their ages?
Let x: base, 2x: second. x + 2x = 54 → x = 18, 2x = 36
Question 10
One person's age is 2 times another. If sum of ages is 30, what are their ages?
Let x: base, 2x: second. x + 2x = 30 → x = 10, 2x = 20
Question 11
One person's age is 2 times another. If sum of ages is 36, what are their ages?
Let x: base, 2x: second. x + 2x = 36 → x = 12, 2x = 24
Question 12
One person's age is 2 times another. If sum of ages is 39, what are their ages?
Let x: base, 2x: second. x + 2x = 39 → x = 13, 2x = 26
Question 13
One person's age is 2 times another. If sum of ages is 33, what are their ages?
Let x: base, 2x: second. x + 2x = 33 → x = 11, 2x = 22
Question 14
One person's age is 2 times another. If sum of ages is 27, what are their ages?
Let x: base, 2x: second. x + 2x = 27 → x = 9, 2x = 18
Question 15
One person's age is 3 times another. If sum of ages is 48, what are their ages?
Let x: base, 3x: second. x + 3x = 48 → x = 12, 3x = 36
Question 16
One person's age is 2 times another. If sum of ages is 24, what are their ages?
Let x: base, 2x: second. x + 2x = 24 → x = 8, 2x = 16
Question 17
One person's age is 2 times another. If sum of ages is 33, what are their ages?
Let x: base, 2x: second. x + 2x = 33 → x = 11, 2x = 22
Question 18
One person's age is 3 times another. If sum of ages is 44, what are their ages?
Let x: base, 3x: second. x + 3x = 44 → x = 11, 3x = 33
Question 19
One person's age is 2 times another. If sum of ages is 45, what are their ages?
Let x: base, 2x: second. x + 2x = 45 → x = 15, 2x = 30
Question 20
One person's age is 2 times another. If sum of ages is 45, what are their ages?
Let x: base, 2x: second. x + 2x = 45 → x = 15, 2x = 30
📝 Continue your Geometric Age Product practice. Worksheet 4 focuses on common variations practice.