Age Product Puzzle Beginner-Intermediate Worksheet: Focus on common variations practice Age Product Puzzle BEGINNER INTERMEDIATE

Level up your Age Product Puzzle 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: age product puzzle for competitive exams, how to solve age product puzzle, age product puzzle tricks.

📝 Worksheet 4 of 10 • 20 questions • ⏱️ Estimated time: 20 minutes • 🎯 Beginner Intermediate level

What you'll learn in this worksheet:

Understand the logic behind how to solve age product puzzle
Learn step-by-step approaches to common variations practice
Bridge the gap between basic and advanced concepts
Handle problems with increasing complexity
Master age product puzzle for competitive exams through focused practice

Your progress through Age Product Puzzle

Worksheet 4 of 10 (33% complete)

Question 1

The product of the ages of Kishore and Hudson is 340, and the difference between their ages is 9. Find Kishore's age.

Let ages be x and y.
xy = 340
x - y = 9
Solving gives x = 10, y = 34
Therefore, Kishore's age = 34

Question 2

The product of the ages of Layla and Raelynn is 270, and the difference between their ages is 3. Find Layla's age.

Let ages be x and y.
xy = 270
x - y = 3
Solving gives x = 15, y = 18
Therefore, Layla's age = 15

Question 3

The product of the ages of Silas and Bennett is 224, and the sum of their ages is 30. Find Silas's age.

Let ages be x and y.
xy = 224
x + y = 30
Solving gives x = 14, y = 16
Therefore, Silas's age = 16

Question 4

The product of the ages of Kamal and Genesis is 546, and the sum of their ages is 47. Find Kamal's age.

Let ages be x and y.
xy = 546
x + y = 47
Solving gives x = 21, y = 26
Therefore, Kamal's age = 21

Question 5

The product of the ages of Ingrid and Dante is 504, and the difference between their ages is 3. Find Ingrid's age.

Let ages be x and y.
xy = 504
x - y = 3
Solving gives x = 21, y = 24
Therefore, Ingrid's age = 21

Question 6

The product of the ages of Charu and Shubham is 100, and the sum of their ages is 20. Find Charu's age.

Let ages be x and y.
xy = 100
x + y = 20
Solving gives x = 10, y = 10
Therefore, Charu's age = 10

Question 7

The product of the ages of Esha and Shruti is 380, and the difference between their ages is 8. Find Esha's age.

Let ages be x and y.
xy = 380
x - y = 8
Solving gives x = 10, y = 38
Therefore, Esha's age = 38

Question 8

The product of the ages of Dolly and Joshua is 252, and the sum of their ages is 32. Find Dolly's age.

Let ages be x and y.
xy = 252
x + y = 32
Solving gives x = 14, y = 18
Therefore, Dolly's age = 18

Question 9

The product of the ages of Paisley and Gael is 140, and the sum of their ages is 24. Find Paisley's age.

Let ages be x and y.
xy = 140
x + y = 24
Solving gives x = 10, y = 14
Therefore, Paisley's age = 14

Question 10

The product of the ages of Gael and Jaxson is 286, and the sum of their ages is 35. Find Gael's age.

Let ages be x and y.
xy = 286
x + y = 35
Solving gives x = 11, y = 26
Therefore, Gael's age = 11

Question 11

The product of the ages of Victor and Sapna is 450, and the sum of their ages is 43. Find Victor's age.

Let ages be x and y.
xy = 450
x + y = 43
Solving gives x = 18, y = 25
Therefore, Victor's age = 25

Question 12

The product of the ages of Durga and Rupali is 396, and the sum of their ages is 40. Find Durga's age.

Let ages be x and y.
xy = 396
x + y = 40
Solving gives x = 18, y = 22
Therefore, Durga's age = 18

Question 13

The product of the ages of Rowan and Hudson is 140, and the difference between their ages is 4. Find Rowan's age.

Let ages be x and y.
xy = 140
x - y = 4
Solving gives x = 10, y = 14
Therefore, Rowan's age = 14

Question 14

The product of the ages of Indu and Deepa is 342, and the difference between their ages is 1. Find Indu's age.

Let ages be x and y.
xy = 342
x - y = 1
Solving gives x = 18, y = 19
Therefore, Indu's age = 19

Question 15

The product of the ages of Beau and Nilesh is 286, and the sum of their ages is 35. Find Beau's age.

Let ages be x and y.
xy = 286
x + y = 35
Solving gives x = 11, y = 26
Therefore, Beau's age = 11

Question 16

The product of the ages of Lokesh and Oscar is 432, and the difference between their ages is 6. Find Lokesh's age.

Let ages be x and y.
xy = 432
x - y = 6
Solving gives x = 18, y = 24
Therefore, Lokesh's age = 18

Question 17

The product of the ages of Kayden and Diego is 48, and the difference between their ages is 2. Find Kayden's age.

Let ages be x and y.
xy = 48
x - y = 2
Solving gives x = 6, y = 8
Therefore, Kayden's age = 6

Question 18

The product of the ages of Nira and Prithvi is 384, and the sum of their ages is 40. Find Nira's age.

Let ages be x and y.
xy = 384
x + y = 40
Solving gives x = 16, y = 24
Therefore, Nira's age = 24

Question 19

The product of the ages of Sonam and Prasanna is 624, and the sum of their ages is 50. Find Sonam's age.

Let ages be x and y.
xy = 624
x + y = 50
Solving gives x = 24, y = 26
Therefore, Sonam's age = 24

Question 20

The product of the ages of Tristan and Elliott is 280, and the difference between their ages is 6. Find Tristan's age.

Let ages be x and y.
xy = 280
x - y = 6
Solving gives x = 14, y = 20
Therefore, Tristan's age = 20

📝 Continue your Age Product Puzzle practice. Worksheet 4 focuses on common variations practice.

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