Question 1
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
Geometric Age Product - Expert Level: conceptual clarity Geometric Age Product EXPERT
This skill evaluation ⚡ worksheet focuses on Geometric Age Product - a key topic in Age Problems. You'll solve 20 expert-level problems (Worksheet 9 of 10). The primary focus is on conceptual clarity. Master geometric age product ssc cgl, geometric age product reasoning tricks, and fast geometric age product solving through systematic practice.
What you'll learn in this worksheet:
- Master geometric age product ssc cgl through focused practice
- Understand the logic behind geometric age product reasoning tricks
- Learn step-by-step approaches to conceptual clarity
- Develop intuition for instant problem recognition
- Achieve mastery with the most difficult problem types
Your progress through Geometric Age Product
Worksheet 9 of 10 (88% complete)
Question 2
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 3
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 4
One person's age is 3 times another. If sum of ages is 72, what are their ages?
Let x: base, 3x: second. x + 3x = 72 → x = 18, 3x = 54
Question 5
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 6
One person's age is 3 times another. If sum of ages is 36, what are their ages?
Let x: base, 3x: second. x + 3x = 36 → x = 9, 3x = 27
Question 7
One person's age is 3 times another. If sum of ages is 64, what are their ages?
Let x: base, 3x: second. x + 3x = 64 → x = 16, 3x = 48
Question 8
One person's age is 3 times another. If sum of ages is 72, what are their ages?
Let x: base, 3x: second. x + 3x = 72 → x = 18, 3x = 54
Question 9
One person's age is 2 times another. If sum of ages is 51, what are their ages?
Let x: base, 2x: second. x + 2x = 51 → x = 17, 2x = 34
Question 10
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 11
One person's age is 3 times another. If sum of ages is 72, what are their ages?
Let x: base, 3x: second. x + 3x = 72 → x = 18, 3x = 54
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 3 times another. If sum of ages is 56, what are their ages?
Let x: base, 3x: second. x + 3x = 56 → x = 14, 3x = 42
Question 15
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 16
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 17
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 18
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 19
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 20
One person's age is 3 times another. If sum of ages is 60, what are their ages?
Let x: base, 3x: second. x + 3x = 60 → x = 15, 3x = 45
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