Mathematics • Year 7 • Unit 1 • Lesson 11

Decimal Operations — Mixed Challenge

Pull everything from Lesson 11 together: add and subtract by lining up dots, multiply by counting decimal places, divide by shifting dots, and spot a classic d.p. mistake. Finish with an open-ended digit puzzle.

Master · Mixed Challenge

1. Mixed problems — choose the right operation

Each question uses a different idea from Lesson 11. Decide which rule applies before you start. Show working. 2 marks each

1.1 Calculate 12.5 − 4.75. Show borrowing.

1.2 Calculate 0.4 × 0.15. Show the ignore-dots multiplication and total decimal places.

1.3 Calculate 3.24 ÷ 0.4. Shift both dots, then divide.

1.4 Calculate 3.45 + 2.8. Then check by estimating with rounding to whole numbers.

1.5 Calculate 2.5 × 0.4. State whether your answer is bigger or smaller than 2.5, and explain why in one sentence.

1.6 A 3.6 m plank is cut into pieces 0.8 m long. How many full pieces can you cut, and how much (in metres) is left over?

Stuck on 1.6? 3.6 ÷ 0.8 = 36 ÷ 8 = 4.5. The whole number part tells you the number of full pieces; the decimal part × 0.8 m tells you the leftover.

2. Find the mistake

Another Year 7 student tried to calculate 0.3 × 0.2. Their working is shown below. Exactly one line contains the mistake. Spot it, explain why it's wrong, then re-do the working correctly. 3 marks

Student's working — calculate 0.3 × 0.2:

Line 1: Ignore the dots. Multiply 3 × 2 = 6.

Line 2: Count decimal places: 0.3 has 1 d.p., 0.2 has 1 d.p.

Line 3: Total decimal places in the answer = 1.

Line 4: Place the dot in the answer: 0.6.

Line 5: Final answer: 0.3 × 0.2 = 0.6.

(a) Which line contains the mistake?

(b) Explain in one or two sentences why that line is wrong.

(c) Write out the corrected working in full, including the corrected final answer.

Stuck? Add the decimal places from both original numbers. Then place the dot. Sanity check: 0.3 × 0.2 should be much smaller than either 0.3 or 0.2 because both are less than 1.

3. Open-ended challenge — make the dots count

This question has more than one correct answer. Show one that works and explain. 4 marks

3.1 Using each of the digits 2, 4, 5 and 8 exactly once, place a decimal point in each of the two numbers below so that their product is as close to 10 as possible.

_ . _ × _ . _

(i) Write down your two numbers and their product.
(ii) Explain in one or two sentences how counting decimal places helped you place the dots.

Bonus: What pair of numbers gives the largest possible product? What pair gives the smallest possible product greater than 1?

Stuck? Try a few pairs: 4.2 × 2.5 = ?, 5.8 × 2.4 = ?, 8.4 × 2.5 = ?, 5.4 × 2.8 = ?. Look for the one closest to 10.

How did this worksheet feel?

Got it Partly Lost

What I'll revisit before next class:

Answers — Do not peek before attempting

1.1 — 12.5 − 4.75

Add trailing zero: 12.50 − 4.75. Hundredths: 0−5 borrow, 10−5 = 5. Tenths: 4−7 borrow, 14−7 = 7. Ones: 11−4 = 7. Answer: 7.75.

1.2 — 0.4 × 0.15

Ignore dots: 4 × 15 = 60. Total d.p. = 1 + 2 = 3. So 0.060 = 0.06.

1.3 — 3.24 ÷ 0.4

Shift both 1 place: 32.4 ÷ 4. 4 into 32 = 8. 4 into 4 = 1. Answer: 8.1.

1.4 — 3.45 + 2.8

Add trailing zero: 3.45 + 2.80. Hundredths: 5+0 = 5. Tenths: 4+8 = 12, write 2 carry 1. Ones: 3+2+1 = 6. Answer: 6.25. Estimate: 3 + 3 = 6 ✓.

1.5 — 2.5 × 0.4

Ignore dots: 25 × 4 = 100. Total d.p. = 1 + 1 = 2. So 1.00 = 1. Answer is smaller than 2.5 because multiplying by 0.4 (a number less than 1) shrinks the original.

1.6 — 3.6 m plank in 0.8 m pieces

3.6 ÷ 0.8: shift both 1 place → 36 ÷ 8 = 4.5. So 4 full pieces. Leftover = 0.5 × 0.8 m = 0.4 m. Check: 4 × 0.8 = 3.2, and 3.6 − 3.2 = 0.4 m ✓.

2 — Find the mistake

(a) The mistake is on Line 3.
(b) The student forgot to add the decimal places. 0.3 has 1 d.p. and 0.2 has 1 d.p., so the total in the answer must be 2, not 1.
(c) Corrected working:
Line 1 (kept): 3 × 2 = 6.
Line 2 (kept): 0.3 has 1 d.p., 0.2 has 1 d.p.
Line 3 (fixed): total decimal places = 1 + 1 = 2.
Line 4 (fixed): place the dot → 6 becomes 0.06.
Line 5: 0.3 × 0.2 = 0.06.
Sanity check: 0.3 × 0.2 must be smaller than 0.3 (because we're multiplying by 0.2 < 1). 0.06 < 0.3 ✓; 0.6 was not.

3 — Decimal placement puzzle (sample solution)

Targeting product close to 10 with digits {2, 4, 5, 8}.
Try 5.2 × 4.8: 52 × 48 = 2496, 2 d.p. → 24.96 (too big).
Try 4.2 × 2.5 — wait, must use 2,4,5,8 each once. Reset.
Try 4.8 × 2.5: 48 × 25 = 1200, 2 d.p. → 12.00 (close).
Try 5.2 × 2.8: but 2 used twice. Reset to one-each constraint.
Valid pairings (each digit once across the two two-digit numbers): 2.4 × 5.8 = 13.92; 2.5 × 4.8 = 12.00; 2.8 × 4.5 = 12.60; 4.2 × 5.8 = 24.36; 4.5 × 2.8 = 12.60; 5.2 × 4.8 = 24.96; 8.4 × 2.5 = 21.00; 8.5 × 2.4 = 20.40; 8.2 × 4.5 = 36.90.
Closest to 10: 2.5 × 4.8 = 12.00 (distance 2) — or 2.4 × 5.8 = 13.92 (distance 3.92), 2.8 × 4.5 = 12.60 (distance 2.6). Best is 2.5 × 4.8 = 12.00.
Counting d.p. helped: 25 × 48 = 1200, 2 d.p. → 12.00. The choice of where to place each dot decided the size of each number, which decided how close to 10 the product landed.
Bonus: Largest product: 8.5 × 4.2 = 35.70 or 8.4 × 5.2 = 43.68; recompute properly: 84 × 52 = 4368 → 43.68. Smallest product > 1: pairs with smaller leading digits and decimals close together — 2.4 × 5.8 ≈ 13.92 isn't smallest; 2.8 × 4.5 = 12.60 is smaller than 12.00? No — 12.00 < 12.60. So smallest valid: 2.5 × 4.8 = 12.00.

Marking: 2 marks for any valid pair with correct product; 1 mark for an explanation referencing counting d.p.; 1 mark for the bonus (largest or smallest product identified correctly).