Revision NotesExam QuestionsPast PapersMock Exams
A LevelMathsEdexcelPureExam QuestionsProofProof

Proof (Edexcel A Level Maths: Pure): Exam Questions

Exam code: 9MA0

1 hour32 questions
Easy
Medium
Hard
11 mark

A student states

"if x squared is greater than 9 then x must be greater than 3"

Determine whether or not this statement is true, giving a reason for your answer.

How did you do?

22 marks

Use algebra to prove that the sum of two different odd numbers is even.

How did you do?

31 mark

Explain why open parentheses x minus 3 close parentheses open parentheses x minus 3 close parentheses greater or equal than 0 for all real values of x.

How did you do?

42 marks

Use algebra to prove that the product of two different even numbers is a multiple of 4.

How did you do?

52 marks

"If x is a real number, then square root of open parentheses x squared close parentheses end root space equals x is always true."

Disprove this statement by means of a counter example.

How did you do?

6
Sme Calculator2 marks

By dividing by possible factors, use proof by exhaustion to show that 11 is a prime number.

How did you do?

71 mark

Show that 0.6 is a rational number.

How did you do?

82 marks

Use algebra to prove that the square of an even number is a multiple of 4.

How did you do?

92 marks

Let n be a positive integer that satisfies 1 less or equal than n less than 5.

Use proof by exhaustion to show that n cubed less than 100.

How did you do?

102 marks

Use algebra to prove that the sum of any three consecutive integers is always a multiple of 3.

How did you do?

111 mark

"The difference between any two square numbers is always odd."

Disprove this statement by means of a counter example.

How did you do?

1a4 marks

A student is investigating the following statement about natural numbers.

"n cubed minus n is a multiple of 4"

Prove, using algebra, that the statement is true for all odd numbers.

How did you do?

1b1 mark

Use a counterexample to show that the statement is not always true.

How did you do?

24 marks

Prove, using algebra, that

n open parentheses n squared plus 5 close parentheses

is even for all n element of straight natural numbers.

How did you do?

34 marks

Prove, using algebra, that

left parenthesis n plus 1 right parenthesis cubed – n cubed

is odd for all n element of straight natural numbers

How did you do?

4a1 mark

In this question p and q are positive integers with q greater than p

Statement 1: q cubed minus p cubed is never a multiple of 5

Show, by means of a counter example, that Statement 1 is not true.

How did you do?

4b4 marks

Statement 2: When p and q are consecutive even integers q cubed minus p cubed is a multiple of 8

Prove, using algebra, that Statement 2 is true.

How did you do?

52 marks

“If m and n are irrational numbers, where m not equal to n, then m n is also irrational.”

Disprove this statement by means of a counter example.

How did you do?

62 marks

Use proof by exhaustion to show that for n element of straight natural numbers comma space n less or equal than 4

open parentheses n plus 1 close parentheses cubed greater than 3 to the power of n

How did you do?

7a1 mark

Factorise n squared plus 3 n plus 2.

How did you do?

7b3 marks

Determine whether n cubed plus 3 n squared plus 2 n is odd or even, where n is a natural number.

Explain your answer clearly.

How did you do?

83 marks

Use algebra to prove that the sum of any three consecutive even numbers is a multiple of 6.

How did you do?

93 marks

Use algebra to prove that the square of an odd number is always odd.

How did you do?

10
Sme Calculator2 marks

Let m be a natural number in the range 5 less than m less than 10.

Use proof by exhaustion to show that all possible values of m squared differ from a multiple of 5 by 1.

How did you do?

112 marks

"The square of a positive integer is always greater than doubling the positive integer."

Disprove this statement by means of a counter example.

How did you do?

14 marks

Prove that for all n element of straight natural numbers, n squared plus 2 is not divisible by 4.

How did you do?

24 marks

Use algebra to prove that the square of any natural number is either a multiple of 3 or one more than a multiple of 3

How did you do?

33 marks

Prove that for all positive integers n,

n cubed plus 3 n squared plus 2 n

is divisible by 6

How did you do?

42 marks

"All integers of the form 2 to the power of n minus 1, where n is a positive non-square integer less than 10, are prime."

Disprove this statement by means of a counter example.

How did you do?

53 marks

Prove that

  • if n is odd, then n cubed plus 6 n squared plus 8 n is odd,

  • if n is even, then n cubed plus 6 n squared plus 8 n is even.

How did you do?

64 marks

Two non-zero rational numbers, a and b, are given by a equals m over n and b equals p over q where m, n, p and q are non-zero integers with no common factors.

Determine whether

(i) a b is rational

(ii) a over b is rational

How did you do?

72 marks

A function is given by

straight f open parentheses x close parentheses equals fraction numerator 9 x squared plus 12 x plus 4 over denominator 5 end fraction

Show that straight f left parenthesis x right parenthesis greater or equal than 0 for all real values of x.

How did you do?

83 marks

Use algebra to prove that the positive difference between a positive integer and its cube is the product of three consecutive integers.

How did you do?

93 marks

Use algebra to prove that the sum of two rational numbers is rational.

How did you do?

104 marks

The elements, x, of a set of numbers, S, are defined by x element of straight natural numbers where x less than 6.

Use proof by exhaustion to show that every element in the set S can be written in the form 3 n minus 2 m where n comma space m element of straight natural numbers.

How did you do?