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Sharing into a ratio: A ratio compares parts in a fixed order. Scale the answer back to the original or add shares to recover the total. Keep the sharing into a ratio representation visible until the final line.
⚖️ Ratio Province · Ratio foundations
Sharing into a ratio
Use labelled parts and equal scaling to solve sharing into a ratio accurately. In this lesson, focus on a ratio compares parts in a fixed order.
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Understand Sharing into a ratio
Use labelled parts and equal scaling to solve sharing into a ratio accurately. In this lesson, focus on a ratio compares parts in a fixed order.
A ratio compares parts in a fixed order. Simplifying divides every part by the same factor; sharing converts the total into equal-value parts before rebuilding each share. For sharing into a ratio, the final written answer should make that exact relationship visible rather than hiding it inside an unexplained result.
Picture the idea
Build coloured ratio bars, resize equal parts and compare equivalent recipes or treasure shares. Use the model to explain one change you notice while working on sharing into a ratio.
Check as you go
Scale the answer back to the original or add shares to recover the total. Write that check beside the final sharing into a ratio answer.
Key vocabulary
ratiopartsimplifyequivalent ratiosharesharing
Rules and key facts
Given information: Sharing into a ratio — Share £10 in the ratio 3:2. Give the larger share. Method choice: Write each labelled part against its own total before comparing or scaling. Keep ratio parts in the stated order and scale every part by the same factor. Calculation or reasoning: There are 5 parts. Each part is £10 ÷ 5 = £2. The larger share is £6. Final answer: 6. Check: Keep ratio parts in the stated order and scale every part by the same factor.
- Keep the stated order visible.
- Find a common factor or the total number of parts.
- Apply the same scale factor to every part.
- Check that simplified parts or shares preserve the original comparison. Record the check explicitly for sharing into a ratio.
Step-by-step method
- Keep the stated order visible.
- Find a common factor or the total number of parts.
- Apply the same scale factor to every part.
- Check that simplified parts or shares preserve the original comparison. Record the check explicitly for sharing into a ratio.
What you need first
- Recognise the vocabulary: ratio, part, simplify.
- Be able to explain the purpose of sharing into a ratio before calculating.
- Keep the relevant values, units and representation visible while you work.
Real-world use
- Recipes
- Mixing paint and sharing costs
Visual / interactive
See the idea, then move it around
Build coloured ratio bars, resize equal parts and compare equivalent recipes or treasure shares. Use the model to explain one change you notice while working on sharing into a ratio.
Interactive maths model Connected to this topic; move controls, check outputs, then earn XP only from verified actions.
Responsive · validated · topic linked Worked examples
Examples, methods and exam thinking
Level 1 · Foundation
Understand the idea with small numbers, one representation and one clear step.
Level 2 · Secure
Use the standard Year 8 method with mixed examples and normal wording.
Level 3 · Challenge
Handle multi-step or less familiar questions and explain choices.
Level 4 · Exam-style
Solve a worded question, show reasoning, check accuracy and write a final sentence.
Build confidence
Given information: Sharing into a ratio — Share £10 in the ratio 3:2. Give the larger share. Method choice: use the sharing into a ratio method and show each step with the stated values. Calculation or reasoning: There are 5 parts. Each part is £10 ÷ 5 = £2. The larger share is £6. Final answer: 6. Check: substitute or compare with the original information to confirm the result fits the question.
- Keep the stated order visible.
- Find a common factor or the total number of parts.
- Apply the same scale factor to every part.
Use the normal method
Given information: Sharing into a ratio — Share £170 in the ratio 3:14. Give the larger share. Method choice: use the sharing into a ratio method and show each step with the stated values. Calculation or reasoning: There are 17 parts. Each part is £170 ÷ 17 = £10. The larger share is £140. Final answer: 140. Check: substitute or compare with the original information to confirm the result fits the question.
Check: Check the sharing into a ratio result against the original information.
Stretch the idea
Given information: Sharing into a ratio — Share £112 in the ratio 3:13. Give the larger share. Method choice: use the sharing into a ratio method and show each step with the stated values. Calculation or reasoning: There are 16 parts. Each part is £112 ÷ 16 = £7. The larger share is £91. Final answer: 91. Check: substitute or compare with the original information to confirm the result fits the question.
Try explaining why each step works before checking the answer.
Show your reasoning
Given information: Sharing into a ratio — Share £60 in the ratio 3:12. Give the larger share. Method choice: use the sharing into a ratio method and show each step with the stated values. Calculation or reasoning: There are 15 parts. Each part is £60 ÷ 15 = £4. The larger share is £48. Final answer: 48. Check: substitute or compare with the original information to confirm the result fits the question.
Common mistakes
- Swapping the order of the parts. This is a key trap when answering sharing into a ratio questions.
- Dividing only one part of a ratio.
How to check your answer
Scale the answer back to the original or add shares to recover the total. Write that check beside the final sharing into a ratio answer.
Extension challenge
Create a sharing into a ratio problem with a tempting incorrect answer. Solve it, apply the check, and explain exactly where the incorrect method breaks down.
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Sharing into a ratio challenge
Use treasure split controls to solve three checked sharing into a ratio rounds. Solve at least two of three marked rounds and use feedback to correct any error.
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Challenge Sharing into a ratio Guardian
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Sharing into a ratio Guardian
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Study cards
Sharing into a ratio: A ratio compares parts in a fixed order. Scale the answer back to the original or add shares to recover the total. Keep the sharing into a ratio representation visible until the final line.
Tap to mark reviewedratio · part · simplify · equivalent ratio · share · sharing
Tap to mark reviewedKeep the stated order visible. Find a common factor or the total number of parts. Apply the same scale factor to every part. Check that simplified parts or shares preserve the original comparison. Record the check explicitly for sharing into a ratio.
Tap to mark reviewedGiven information: Sharing into a ratio — Share £10 in the ratio 3:2. Give the larger share. Method choice: Write each labelled part against its own total before comparing or scaling. Keep ratio parts in the stated order and scale every part by the same factor. Calculation or reasoning: There are 5 parts. Each part is £10 ÷ 5 = £2. The larger share is £6. Final answer: 6. Check: Keep ratio parts in the stated order and scale every part by the same factor.
Tap to mark reviewedGiven information: Sharing into a ratio — Share £10 in the ratio 3:2. Give the larger share. Method choice: use the sharing into a ratio method and show each step with the stated values. Calculation or reasoning: There are 5 parts. Each part is £10 ÷ 5 = £2. The larger share is £6. Final answer: 6. Check: substitute or compare with the original information to confirm the result fits the question.
Tap to mark reviewedGiven information: Sharing into a ratio — Share £170 in the ratio 3:14. Give the larger share. Method choice: use the sharing into a ratio method and show each step with the stated values. Calculation or reasoning: There are 17 parts. Each part is £170 ÷ 17 = £10. The larger share is £140. Final answer: 140. Check: substitute or compare with the original information to confirm the result fits the question.
Tap to mark reviewedGiven information: Sharing into a ratio — Share £112 in the ratio 3:13. Give the larger share. Method choice: use the sharing into a ratio method and show each step with the stated values. Calculation or reasoning: There are 16 parts. Each part is £112 ÷ 16 = £7. The larger share is £91. Final answer: 91. Check: substitute or compare with the original information to confirm the result fits the question.
Tap to mark reviewedGiven information: Sharing into a ratio — Share £60 in the ratio 3:12. Give the larger share. Method choice: use the sharing into a ratio method and show each step with the stated values. Calculation or reasoning: There are 15 parts. Each part is £60 ÷ 15 = £4. The larger share is £48. Final answer: 48. Check: substitute or compare with the original information to confirm the result fits the question.
Tap to mark reviewedSwapping the order of the parts. This is a key trap when answering sharing into a ratio questions.
Tap to mark reviewedFor sharing into a ratio, show the key representation before the final calculation. Use this final check: Scale the answer back to the original or add shares to recover the total.
Tap to mark reviewedRecipes, Mixing paint and sharing costs
Tap to mark reviewedI can explain sharing into a ratio, use the method, check for mistakes, and answer an exam-style question.
Tap to mark reviewedFlashcards
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Help for Sharing into a ratio
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Simple explanation
Sharing into a ratio: A ratio compares parts in a fixed order. Scale the answer back to the original or add shares to recover the total. Keep the sharing into a ratio representation visible until the final line.
Think of sharing into a ratio as a careful model: make the important values visible, change one thing at a time, and use the check to prove the answer fits.
Step-by-step breakdown
- Keep the stated order visible.
- Find a common factor or the total number of parts.
- Apply the same scale factor to every part.
- Check that simplified parts or shares preserve the original comparison. Record the check explicitly for sharing into a ratio.
Hint 1
Start by naming the given information and the exact result required for sharing into a ratio.
Hint 2
Keep the stated order visible.
Full worked solution
Given information: Sharing into a ratio — Share £10 in the ratio 3:2. Give the larger share. Method choice: use the sharing into a ratio method and show each step with the stated values. Calculation or reasoning: There are 5 parts. Each part is £10 ÷ 5 = £2. The larger share is £6. Final answer: 6. Check: substitute or compare with the original information to confirm the result fits the question.
Method: Keep the stated order visible. → Find a common factor or the total number of parts. → Apply the same scale factor to every part. → Check that simplified parts or shares preserve the original comparison. Record the check explicitly for sharing into a ratio.
Common mistake warning
Swapping the order of the parts. This is a key trap when answering sharing into a ratio questions.
Choose a support button above when you need a nudge.
Mastery milestones
Badges reward learning, not locked clicking
- I can explain sharing into a ratio in my own words.
- I can use these words accurately: ratio, part, simplify.
- I can follow the 4-step method without guessing.
- I can avoid this mistake: Swapping the order of the parts.
- I can apply this check: Scale the answer back to the original or add shares to recover the total.