Worksheets — Set 11

Number theory · Classical theorems and functions

Print and write your answers. Use diagrams to show thinking.

Warm-up

1. How many subsets does a set with 15 elements have? ___ 2. Prove or disprove: if n is even, n² is even. 3. P(at least one head in 14 fair tosses) = ___

_See printable PDF for diagram._

Written practice

1. How many subsets does a set with 14 elements have? ___ 2. Prove or disprove: if n is even, n² is even. 3. P(at least one head in 13 fair tosses) = ___ 4. Write the recurrence aₙ = 13aₙ₋₁ with a₀ = 1 ___ 5. Graph with 15 vertices — minimum edges for connectivity? ___ 6. Convert 53₁₀ to base 14. = ___ 7. How many subsets does a set with 17 elements have? ___ 8. P(at least one head in 16 fair tosses) = ___

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More written practice

1. Write the recurrence aₙ = 16aₙ₋₁ with a₀ = 1 ___ 2. Graph with 18 vertices — minimum edges for connectivity? ___ 3. Convert 56₁₀ to base 17. = ___ 4. How many subsets does a set with 20 elements have? ___ 5. P(at least one head in 19 fair tosses) = ___ 6. Write the recurrence aₙ = 19aₙ₋₁ with a₀ = 1 ___

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Patterns and rules

1. How many subsets does a set with 31 elements have? ___ 2. Prove or disprove: if n is even, n² is even. 3. P(at least one head in 30 fair tosses) = ___

_See printable PDF for diagram._

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Parent tip: Use trees or tables for counting