Fraction Change Over Time: Worksheet 2 - Beginner Practice Fraction Change Over Time BEGINNER

Ready to master Fraction Change Over Time? This entry level practice worksheet (2/10) presents 20 beginner-level challenges. Focus area: pattern recognition. Learn to solve fraction change over time reasoning questions, handle fraction change over time practice, and perfect fraction change over time for competitive exams with our step-by-step solutions.

📝 Worksheet 2 of 10 • 20 questions • ⏱️ Estimated time: 20 minutes • 🎯 Beginner level

What you'll learn in this worksheet:

Understand the logic behind fraction change over time practice
Learn step-by-step approaches to pattern recognition
Practice basic problem types with clear explanations
Develop systematic problem-solving habits
Master fraction change over time reasoning questions through focused practice

Your progress through Fraction Change Over Time

Worksheet 2 of 10 (11% complete)

Question 1

Currently, Aparna is 1/4 of Ganesh's age. After 12 years, Aparna will be 1/3 of Ganesh's age. Find Aparna's present age.

Let Ganesh = x, then Aparna = 1/4x
After 12 years: 1/4x + 12 = 1/3(x + 12)
Solving gives x = 96, so Aparna = 24

Question 2

Currently, Daniel is 1/4 of Jack's age. After 8 years, Daniel will be 1/3 of Jack's age. Find Daniel's present age.

Let Jack = x, then Daniel = 1/4x
After 8 years: 1/4x + 8 = 1/3(x + 8)
Solving gives x = 64, so Daniel = 16

Question 3

Currently, Gautam is 3/5 of Theodore's age. After 5 years, Gautam will be 2/3 of Theodore's age. Find Gautam's present age.

Let Theodore = x, then Gautam = 3/5x
After 5 years: 3/5x + 5 = 2/3(x + 5)
Solving gives x = 25, so Gautam = 15

Question 4

Currently, Laksh is 2/7 of Hannah's age. After 21 years, Laksh will be 1/3 of Hannah's age. Find Laksh's present age.

Let Hannah = x, then Laksh = 2/7x
After 21 years: 2/7x + 21 = 1/3(x + 21)
Solving gives x = 147, so Laksh = 42

Question 5

Currently, Ishan is 2/3 of James's age. After 6 years, Ishan will be 3/4 of James's age. Find Ishan's present age.

Let James = x, then Ishan = 2/3x
After 6 years: 2/3x + 6 = 3/4(x + 6)
Solving gives x = 18, so Ishan = 12

Question 6

Currently, Abhay is 1/2 of Lucas's age. After 7 years, Abhay will be 2/3 of Lucas's age. Find Abhay's present age.

Let Lucas = x, then Abhay = 1/2x
After 7 years: 1/2x + 7 = 2/3(x + 7)
Solving gives x = 28, so Abhay = 14

Question 7

Currently, Shikha is 1/5 of Drishti's age. After 12 years, Shikha will be 1/4 of Drishti's age. Find Shikha's present age.

Let Drishti = x, then Shikha = 1/5x
After 12 years: 1/5x + 12 = 1/4(x + 12)
Solving gives x = 120, so Shikha = 24

Question 8

Currently, Raveena is 2/5 of Indira's age. After 10 years, Raveena will be 1/2 of Indira's age. Find Raveena's present age.

Let Indira = x, then Raveena = 2/5x
After 10 years: 2/5x + 10 = 1/2(x + 10)
Solving gives x = 50, so Raveena = 20

Question 9

Currently, Scarlett is 3/5 of Christian's age. After 8 years, Scarlett will be 2/3 of Christian's age. Find Scarlett's present age.

Let Christian = x, then Scarlett = 3/5x
After 8 years: 3/5x + 8 = 2/3(x + 8)
Solving gives x = 40, so Scarlett = 24

Question 10

Currently, Bharat is 1/5 of Sagar's age. After 10 years, Bharat will be 1/4 of Sagar's age. Find Bharat's present age.

Let Sagar = x, then Bharat = 1/5x
After 10 years: 1/5x + 10 = 1/4(x + 10)
Solving gives x = 100, so Bharat = 20

Question 11

Currently, Grace is 3/4 of Soren's age. After 12 years, Grace will be 4/5 of Soren's age. Find Grace's present age.

Let Soren = x, then Grace = 3/4x
After 12 years: 3/4x + 12 = 4/5(x + 12)
Solving gives x = 48, so Grace = 36

Question 12

Currently, Kush is 2/5 of Prashant's age. After 6 years, Kush will be 1/2 of Prashant's age. Find Kush's present age.

Let Prashant = x, then Kush = 2/5x
After 6 years: 2/5x + 6 = 1/2(x + 6)
Solving gives x = 30, so Kush = 12

Question 13

Currently, Kayden is 3/8 of Ritika's age. After 10 years, Kayden will be 2/5 of Ritika's age. Find Kayden's present age.

Let Ritika = x, then Kayden = 3/8x
After 10 years: 3/8x + 10 = 2/5(x + 10)
Solving gives x = 80, so Kayden = 30

Question 14

Currently, Andre is 2/5 of Ezra's age. After 8 years, Andre will be 1/2 of Ezra's age. Find Andre's present age.

Let Ezra = x, then Andre = 2/5x
After 8 years: 2/5x + 8 = 1/2(x + 8)
Solving gives x = 40, so Andre = 16

Question 15

Currently, Maya is 1/4 of Prateek's age. After 10 years, Maya will be 1/3 of Prateek's age. Find Maya's present age.

Let Prateek = x, then Maya = 1/4x
After 10 years: 1/4x + 10 = 1/3(x + 10)
Solving gives x = 80, so Maya = 20

Question 16

Currently, Hitesh is 3/4 of Shailesh's age. After 8 years, Hitesh will be 4/5 of Shailesh's age. Find Hitesh's present age.

Let Shailesh = x, then Hitesh = 3/4x
After 8 years: 3/4x + 8 = 4/5(x + 8)
Solving gives x = 32, so Hitesh = 24

Question 17

Currently, Bryson is 1/3 of Anthony's age. After 10 years, Bryson will be 1/2 of Anthony's age. Find Bryson's present age.

Let Anthony = x, then Bryson = 1/3x
After 10 years: 1/3x + 10 = 1/2(x + 10)
Solving gives x = 60, so Bryson = 20

Question 18

Currently, Arlo is 2/3 of Ingrid's age. After 4 years, Arlo will be 3/4 of Ingrid's age. Find Arlo's present age.

Let Ingrid = x, then Arlo = 2/3x
After 4 years: 2/3x + 4 = 3/4(x + 4)
Solving gives x = 12, so Arlo = 8

Question 19

Currently, Jaideep is 2/3 of Jaya's age. After 10 years, Jaideep will be 3/4 of Jaya's age. Find Jaideep's present age.

Let Jaya = x, then Jaideep = 2/3x
After 10 years: 2/3x + 10 = 3/4(x + 10)
Solving gives x = 30, so Jaideep = 20

Question 20

Currently, Ritu is 4/9 of Girish's age. After 16 years, Ritu will be 1/2 of Girish's age. Find Ritu's present age.

Let Girish = x, then Ritu = 4/9x
After 16 years: 4/9x + 16 = 1/2(x + 16)
Solving gives x = 108, so Ritu = 48

📝 Continue your Fraction Change Over Time practice. Worksheet 2 focuses on pattern recognition.

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