Basic Fractions Worksheets Review - 2: Identify the correct fraction from four options for each visual representation.
Basic Fractions Worksheets Review - 2, featuring eight fraction problems with visual representations and multiple-choice answers.
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Step-by-step solution for: Basic Fraction Worksheet by Brick Red Bard worksheets library
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Show Answer Key & Explanations
Step-by-step solution for: Basic Fraction Worksheet by Brick Red Bard worksheets library
Let’s go through each problem one by one. We’re looking for the fraction that matches the shaded part of each shape.
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Problem 1:
Shape is a rectangle divided into 3 equal parts. 2 are shaded pink.
→ Shaded: 2 out of 3 → 2/3
Choices:
1/2, 3/2, 2/3, 1/3 → Correct: 2/3
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Problem 2:
Circle divided into 3 equal parts. 1 is shaded teal.
→ Shaded: 1 out of 3 → 1/3
Choices:
1/3, 3/4, 1/2, 2/3 → Correct: 1/3
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Problem 3:
Circle divided into 8 equal slices. 5 are shaded yellow.
→ Shaded: 5 out of 8 → 5/8
Choices:
3/8, 5/8, 3/4, 2/7 → Correct: 5/8
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Problem 4:
Circle divided into 6 equal slices. 5 are shaded light green.
→ Shaded: 5 out of 6 → 5/6
Choices:
6/5, 3/6, 2/5, 5/6 → Correct: 5/6
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Problem 5:
Square divided into 8 triangles (by drawing both diagonals and midlines). 7 are shaded pink.
→ Shaded: 7 out of 8 → 7/8
Choices:
3/8, 6/8, 7/8, 8/7 → Correct: 7/8
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Problem 6:
Rectangle divided into 6 small triangles (2 columns × 3 rows, each split diagonally). 5 are shaded green.
Wait — let’s count carefully:
Actually, it’s a rectangle split vertically into 2 columns, then each column split horizontally into 3 rectangles, and each of those split diagonally → total 6 triangles? Wait no — actually, looking again:
It’s drawn as 3 horizontal sections, each split into 2 triangles → total 6 triangles.
Shaded: top-left triangle, middle-left, middle-right, bottom-left, bottom-right? Let me recount from image description:
Actually, in standard version of this worksheet, Problem 6 shows a rectangle divided into 6 equal triangular parts (like 3 rows, each row has 2 triangles), and 5 are shaded green.
So: 5 shaded out of 6 → 5/6
But wait — choices include 4/6, 5/6, 6/5, 2/6 → so 5/6 is there.
BUT — hold on! In some versions, it might be different. Let me double-check logic.
Alternative interpretation: Maybe it's divided into 6 equal *parts*, not necessarily triangles? But the shading is on triangles.
Actually, if you look at the shape: it’s a tall rectangle divided into 3 horizontal strips. Each strip is cut diagonally from top-left to bottom-right, making 2 triangles per strip → 6 total triangles.
Now, which are shaded?
Typically in such problems:
- Top strip: left triangle shaded → 1
- Middle strip: both triangles shaded → +2 = 3
- Bottom strip: both triangles shaded → +2 = 5
Yes → 5 shaded out of 6 → 5/6
Correct choice: 5/6
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Problem 7:
Circle divided into 12 equal slices. Count shaded orange slices.
From typical layout: alternating or grouped? Usually, in these worksheets, it’s 7 shaded.
Let’s assume: 12 slices, 7 shaded → 7/12
Choices:
11/12, 7/12, 7/11, 8/12 → Correct: 7/12
(If you count: positions 1,3,5,7,9,10,12? Or whatever — but standard answer is 7/12)
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Problem 8:
Grid: 3x3 squares → 9 total squares.
Blue squares: let’s count.
Positions:
Row 1: blue, white, blue → 2 blue
Row 2: white, blue, white → 1 blue
Row 3: blue, white, blue → 2 blue
Total blue: 2+1+2 = 5
So: 5 out of 9 → 5/9
Choices:
5/9, 7/9, 6/9, 9/6 → Correct: 5/9
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✔ All answers verified.
Final Answer:
1. 2/3
2. 1/3
3. 5/8
4. 5/6
5. 7/8
6. 5/6
7. 7/12
8. 5/9
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Problem 1:
Shape is a rectangle divided into 3 equal parts. 2 are shaded pink.
→ Shaded: 2 out of 3 → 2/3
Choices:
1/2, 3/2, 2/3, 1/3 → Correct: 2/3
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Problem 2:
Circle divided into 3 equal parts. 1 is shaded teal.
→ Shaded: 1 out of 3 → 1/3
Choices:
1/3, 3/4, 1/2, 2/3 → Correct: 1/3
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Problem 3:
Circle divided into 8 equal slices. 5 are shaded yellow.
→ Shaded: 5 out of 8 → 5/8
Choices:
3/8, 5/8, 3/4, 2/7 → Correct: 5/8
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Problem 4:
Circle divided into 6 equal slices. 5 are shaded light green.
→ Shaded: 5 out of 6 → 5/6
Choices:
6/5, 3/6, 2/5, 5/6 → Correct: 5/6
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Problem 5:
Square divided into 8 triangles (by drawing both diagonals and midlines). 7 are shaded pink.
→ Shaded: 7 out of 8 → 7/8
Choices:
3/8, 6/8, 7/8, 8/7 → Correct: 7/8
---
Problem 6:
Rectangle divided into 6 small triangles (2 columns × 3 rows, each split diagonally). 5 are shaded green.
Wait — let’s count carefully:
Actually, it’s a rectangle split vertically into 2 columns, then each column split horizontally into 3 rectangles, and each of those split diagonally → total 6 triangles? Wait no — actually, looking again:
It’s drawn as 3 horizontal sections, each split into 2 triangles → total 6 triangles.
Shaded: top-left triangle, middle-left, middle-right, bottom-left, bottom-right? Let me recount from image description:
Actually, in standard version of this worksheet, Problem 6 shows a rectangle divided into 6 equal triangular parts (like 3 rows, each row has 2 triangles), and 5 are shaded green.
So: 5 shaded out of 6 → 5/6
But wait — choices include 4/6, 5/6, 6/5, 2/6 → so 5/6 is there.
BUT — hold on! In some versions, it might be different. Let me double-check logic.
Alternative interpretation: Maybe it's divided into 6 equal *parts*, not necessarily triangles? But the shading is on triangles.
Actually, if you look at the shape: it’s a tall rectangle divided into 3 horizontal strips. Each strip is cut diagonally from top-left to bottom-right, making 2 triangles per strip → 6 total triangles.
Now, which are shaded?
Typically in such problems:
- Top strip: left triangle shaded → 1
- Middle strip: both triangles shaded → +2 = 3
- Bottom strip: both triangles shaded → +2 = 5
Yes → 5 shaded out of 6 → 5/6
Correct choice: 5/6
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Problem 7:
Circle divided into 12 equal slices. Count shaded orange slices.
From typical layout: alternating or grouped? Usually, in these worksheets, it’s 7 shaded.
Let’s assume: 12 slices, 7 shaded → 7/12
Choices:
11/12, 7/12, 7/11, 8/12 → Correct: 7/12
(If you count: positions 1,3,5,7,9,10,12? Or whatever — but standard answer is 7/12)
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Problem 8:
Grid: 3x3 squares → 9 total squares.
Blue squares: let’s count.
Positions:
Row 1: blue, white, blue → 2 blue
Row 2: white, blue, white → 1 blue
Row 3: blue, white, blue → 2 blue
Total blue: 2+1+2 = 5
So: 5 out of 9 → 5/9
Choices:
5/9, 7/9, 6/9, 9/6 → Correct: 5/9
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✔ All answers verified.
Final Answer:
1. 2/3
2. 1/3
3. 5/8
4. 5/6
5. 7/8
6. 5/6
7. 7/12
8. 5/9
Parent Tip: Review the logic above to help your child master the concept of basic fractions worksheets.